<?xml version="1.0" encoding="UTF-8"?><!DOCTYPE article PUBLIC "-//NLM//DTD Journal Publishing DTD v3.0 20080202//EN" "http://dtd.nlm.nih.gov/publishing/3.0/journalpublishing3.dtd">
<article xmlns:mml="http://www.w3.org/1998/Math/MathML" xmlns:xlink="http://www.w3.org/1999/xlink" dtd-version="3.0" xml:lang="en" article-type="research article">
 <front>
  <journal-meta>
   <journal-id journal-id-type="publisher-id">
    ojapps
   </journal-id>
   <journal-title-group>
    <journal-title>
     Open Journal of Applied Sciences
    </journal-title>
   </journal-title-group>
   <issn pub-type="epub">
    2165-3917
   </issn>
   <issn publication-format="print">
    2165-3925
   </issn>
   <publisher>
    <publisher-name>
     Scientific Research Publishing
    </publisher-name>
   </publisher>
  </journal-meta>
  <article-meta>
   <article-id pub-id-type="doi">
    10.4236/ojapps.2025.155083
   </article-id>
   <article-id pub-id-type="publisher-id">
    ojapps-142639
   </article-id>
   <article-categories>
    <subj-group subj-group-type="heading">
     <subject>
      Articles
     </subject>
    </subj-group>
    <subj-group subj-group-type="Discipline-v2">
     <subject>
      Biomedical 
     </subject>
     <subject>
       Life Sciences, Chemistry 
     </subject>
     <subject>
       Materials Science, Computer Science 
     </subject>
     <subject>
       Communications, Engineering, Physics 
     </subject>
     <subject>
       Mathematics
     </subject>
    </subj-group>
   </article-categories>
   <title-group>
    Decision-Making during Control Pollutant Emissions from Pellet Burning with Tube Gas Heaters
   </title-group>
   <contrib-group>
    <contrib contrib-type="author" xlink:type="simple">
     <name name-style="western">
      <surname>
       Kostiantyn
      </surname>
      <given-names>
       Dudkin
      </given-names>
     </name> 
     <xref ref-type="aff" rid="aff1"> 
      <sup>1</sup>
     </xref>
    </contrib>
    <contrib contrib-type="author" xlink:type="simple">
     <name name-style="western">
      <surname>
       Oksana
      </surname>
      <given-names>
       Yaroshevska
      </given-names>
     </name> 
     <xref ref-type="aff" rid="aff2"> 
      <sup>2</sup>
     </xref>
    </contrib>
    <contrib contrib-type="author" xlink:type="simple">
     <name name-style="western">
      <surname>
       Vyacheslav
      </surname>
      <given-names>
       Irodov
      </given-names>
     </name> 
     <xref ref-type="aff" rid="aff2"> 
      <sup>2</sup>
     </xref>
    </contrib>
    <contrib contrib-type="author" xlink:type="simple">
     <name name-style="western">
      <surname>
       Halyna
      </surname>
      <given-names>
       Prokofieva
      </given-names>
     </name> 
     <xref ref-type="aff" rid="aff3"> 
      <sup>3</sup>
     </xref>
    </contrib>
    <contrib contrib-type="author" xlink:type="simple">
     <name name-style="western">
      <surname>
       Leontina
      </surname>
      <given-names>
       Solod
      </given-names>
     </name> 
     <xref ref-type="aff" rid="aff3"> 
      <sup>3</sup>
     </xref>
    </contrib>
    <contrib contrib-type="author" xlink:type="simple">
     <name name-style="western">
      <surname>
       Valeria
      </surname>
      <given-names>
       Tkachova
      </given-names>
     </name> 
     <xref ref-type="aff" rid="aff3"> 
      <sup>3</sup>
     </xref>
    </contrib>
   </contrib-group> 
   <aff id="aff1">
    <addr-line>
     aCollective Research and Production Enterprise “Energocomplex”, Dnipro, Ukraine
    </addr-line> 
   </aff> 
   <aff id="aff2">
    <addr-line>
     aDepartment of Information Technologies, Dnipro Technological University “Step”, Dnipro, Ukraine
    </addr-line> 
   </aff> 
   <aff id="aff3">
    <addr-line>
     aDepartment of Heating, Ventilation, Air Conditioning, Heat and Gas Supply, Prydniprovska State Academy of Civil Engineering and Architecture, Dnipro, Ukraine
    </addr-line> 
   </aff> 
   <pub-date pub-type="epub">
    <day>
     09
    </day> 
    <month>
     05
    </month>
    <year>
     2025
    </year>
   </pub-date> 
   <volume>
    15
   </volume> 
   <issue>
    05
   </issue>
   <fpage>
    1196
   </fpage>
   <lpage>
    1213
   </lpage>
   <history>
    <date date-type="received">
     <day>
      1,
     </day>
     <month>
      April
     </month>
     <year>
      2025
     </year>
    </date>
    <date date-type="published">
     <day>
      16,
     </day>
     <month>
      April
     </month>
     <year>
      2025
     </year> 
    </date> 
    <date date-type="accepted">
     <day>
      16,
     </day>
     <month>
      May
     </month>
     <year>
      2025
     </year> 
    </date>
   </history>
   <permissions>
    <copyright-statement>
     © Copyright 2014 by authors and Scientific Research Publishing Inc. 
    </copyright-statement>
    <copyright-year>
     2014
    </copyright-year>
    <license>
     <license-p>
      This work is licensed under the Creative Commons Attribution International License (CC BY). http://creativecommons.org/licenses/by/4.0/
     </license-p>
    </license>
   </permissions>
   <abstract>
    The article is devoted to decision making regarding controlling the operation of tubular gas heaters (TGH) on wood pellets. Experimental results of the study of the operation of TGH on pellets are used for decision making. Experiments have shown the dependence of undesirable gas emissions, carbon oxides and nitrogen oxides in combustion products, on the parameters of the heater operation. The nature of the dependence is contradictory, it is not possible to simultaneously minimise emissions of carbon oxides and nitrogen, it is necessary to look for compromise solutions. The task was set to find such operating modes of pellet heaters that provide acceptable values of gas emissions at different power levels during heater operation. To solve the problem, we used expert judgements in the form of matrices of fuzzy pairwise comparison of separate results of heater operation with each other. The fuzzy decision selection functions were constructed, which extend not only to the set of experimental results, but also to the whole set of possible variation of the TGN operation parameters. For each selection function, their maxima are found, which provide the operation of TGN at different power modes with acceptable gas emissions values. These results can serve for three-stage control of the TGN.
   </abstract>
   <kwd-group> 
    <kwd>
     Green Energy Engineering
    </kwd> 
    <kwd>
      Wood Pellets
    </kwd> 
    <kwd>
      Tube Gas Heaters
    </kwd> 
    <kwd>
      Evolutionary Search
    </kwd> 
    <kwd>
      Stochastic Optimization
    </kwd> 
    <kwd>
      Binary Choice Relations
    </kwd>
   </kwd-group>
  </article-meta>
 </front>
 <body>
  <sec id="s1">
   <title>1. Introduction</title>
   <p>Tube gas heaters (TGH) can be seen as the development of infrared gas tube heaters (IGTH). IGTHs have a long history of development and use. You can specify these articles <xref ref-type="bibr" rid="scirp.142639-1">
     [1]
    </xref>-<xref ref-type="bibr" rid="scirp.142639-3">
     [3]
    </xref> and this comprehensive scientific report <xref ref-type="bibr" rid="scirp.142639-3">
     [3]
    </xref>. These heaters are serially produced by a number of manufacturers in different countries, for example—ROBERTS GORDON <xref ref-type="bibr" rid="scirp.142639-4">
     [4]
    </xref>. The main components of such heaters are: automatic gas burner, tube emitter, infrared reflector and exhaust or supply fan. Technical solutions appeared, and due to the change in the heat exchange part, the field of application of gas tube heaters expanded, as reflected in <xref ref-type="bibr" rid="scirp.142639-5">
     [5]
    </xref>. Finally, pellet tube heaters appeared, and the gas burner was replaced by a pellet <xref ref-type="bibr" rid="scirp.142639-6">
     [6]
    </xref> <xref ref-type="bibr" rid="scirp.142639-7">
     [7]
    </xref>. The external view of a pellet burner unit with pellet bunker and control unit in an operating heat supply system and view of the experimental setup for testing pellet burner with tubular gas heater are shown in <xref ref-type="fig" rid="fig1">
     Figure 1
    </xref> and <xref ref-type="fig" rid="fig2">
     Figure 2
    </xref>. Experimental studies have shown that gas emissions from pellet gas burners depend significantly on the operating modes of tubular gas heaters. <xref ref-type="fig" rid="fig3">
     Figure 3
    </xref> and <xref ref-type="fig" rid="fig4">
     Figure 4
    </xref> show the operation of gas burners on pellets for two modes of operation. It is of interest to find such operating modes of tube heaters that would ensure minimum gas emissions.</p>
   <p>In this paper, evolutionary search methods considering fuzzy experimental data and binary choice relations are used to solve the control problem of tube heaters. Evolutionary search methods have been successfully applied to find solutions to various optimisation problems in the presence of one or more criteria, for example, <xref ref-type="bibr" rid="scirp.142639-8">
     [8]
    </xref> discusses the use of evolutionary search to solve a multi-criteria problem. Evolutionary algorithms play a dominant role in solving problems with multiple conflicting objective functions. They aim at finding multiple Pareto-optimal solutions, thus in <xref ref-type="bibr" rid="scirp.142639-9">
     [9]
    </xref> a hybrid constrained evolutionary algorithm (HCEA) is proposed which uses two penalty functions simultaneously. Particle swarm optimisation (PSO) algorithms have been successfully used to solve various complex optimisation problems. However, the balance between diversity and convergence is still a problem that requires continuous study, so evolutionary particle swarm optimisation with dynamic search (EEDSPSO) has been proposed <xref ref-type="bibr" rid="scirp.142639-10">
     [10]
    </xref>. In <xref ref-type="bibr" rid="scirp.142639-11">
     [11]
    </xref>, a decision-making approach for fuzzy Fermathean soft set based on a score matrix was proposed. A numerical example has been given to demonstrate the validity of the proposed approach. In <xref ref-type="bibr" rid="scirp.142639-12">
     [12]
    </xref>, the proposed method is used to predict the output value in empirical applications where the observed value is a range or average of several values rather than a real fixed number. Stochastic optimisation plays an important role in the analysis, design and operation of modern systems <xref ref-type="bibr" rid="scirp.142639-13">
     [13]
    </xref>. A considerable number of papers have been devoted to stochastic optimisation, most notably <xref ref-type="bibr" rid="scirp.142639-14">
     [14]
    </xref> <xref ref-type="bibr" rid="scirp.142639-15">
     [15]
    </xref>. Evolutionary fuzzy systems are one of the greatest advances in the field of computational intelligence. They consist of evolutionary algorithms used to design fuzzy systems <xref ref-type="bibr" rid="scirp.142639-16">
     [16]
    </xref>. Modelling methods for fuzzy systems have received considerable development in the works <xref ref-type="bibr" rid="scirp.142639-17">
     [17]
    </xref> <xref ref-type="bibr" rid="scirp.142639-18">
     [18]
    </xref>. The work <xref ref-type="bibr" rid="scirp.142639-19">
     [19]
    </xref> uses the developed modification of genetic algorithm to optimise the performance of neural network. In <xref ref-type="bibr" rid="scirp.142639-20">
     [20]
    </xref>, the concept of trigonometric similarity measure (SM) for spherical fuzzy sets (SFS) is used, which has become very important in solving various pattern recognition and medical diagnosis problems. The approach to solve fuzzy nonlinear programming problems was presented in <xref ref-type="bibr" rid="scirp.142639-21">
     [21]
    </xref> <xref ref-type="bibr" rid="scirp.142639-22">
     [22]
    </xref>. In <xref ref-type="bibr" rid="scirp.142639-23">
     [23]
    </xref> proposed a multi-objective nonlinear programming problem to be solved as a linear programming problem. In <xref ref-type="bibr" rid="scirp.142639-24">
     [24]
    </xref> used evolutionary algorithm for multi-objective optimisation. In <xref ref-type="bibr" rid="scirp.142639-25">
     [25]
    </xref>, binary choice relations were used for decision making . This direction was further developed, for example, in <xref ref-type="bibr" rid="scirp.142639-26">
     [26]
    </xref>-<xref ref-type="bibr" rid="scirp.142639-28">
     [28]
    </xref>. Decision making in complex systems by methods of self-organisation was developed in the works of Ivakhnenko O. G. <xref ref-type="bibr" rid="scirp.142639-29">
     [29]
    </xref> and his followers. In the works of Yudin D. Б. <xref ref-type="bibr" rid="scirp.142639-30">
     [30]
    </xref> <xref ref-type="bibr" rid="scirp.142639-31">
     [31]
    </xref>, as well as in <xref ref-type="bibr" rid="scirp.142639-32">
     [32]
    </xref>, computational methods of decision-making theory were considered, in which decision search problems are formulated in terms of binary relations, and the problems of nonlinear mathematical programming are transformed into generalised mathematical programming problems. Methods of evolutionary decision search in problems with binary choice relations were first developed in <xref ref-type="bibr" rid="scirp.142639-33">
     [33]
    </xref>, then developed in <xref ref-type="bibr" rid="scirp.142639-34">
     [34]
    </xref> <xref ref-type="bibr" rid="scirp.142639-35">
     [35]
    </xref>. Finally, in <xref ref-type="bibr" rid="scirp.142639-36">
     [36]
    </xref> <xref ref-type="bibr" rid="scirp.142639-37">
     [37]
    </xref> a scheme for constructing an evolutionary selection mechanism for decision making in multi-criteria systems with a sample of fuzzy experimental results was proposed. It is of interest to use evolutionary search methods for decision making with several criteria to control the operation of a tubular gas heater on pellets, which determined the content of this work.</p>
   <fig id="fig1" position="float">
    <label>Figure 1</label>
    <caption>
     <title>Figure 1. External view of a pellet burner unit with pellet bunker and control unit in an operating heat supply system.</title>
    </caption>
    <graphic mimetype="image" position="float" xlink:type="simple" xlink:href="https://html.scirp.org/file/2313115-rId16.jpeg?20250519023725" />
   </fig>
   <fig id="fig2" position="float">
    <label>Figure 2</label>
    <caption>
     <title>Figure 2. External view of the experimental setup for testing pellet burner with tubular gas heater.</title>
    </caption>
    <graphic mimetype="image" position="float" xlink:type="simple" xlink:href="https://html.scirp.org/file/2313115-rId17.jpeg?20250519023725" />
   </fig>
   <fig id="fig3" position="float">
    <label>Figure 3</label>
    <caption>
     <title>Figure 3. View of operating pellet gas burner at minimum output.</title>
    </caption>
    <graphic mimetype="image" position="float" xlink:type="simple" xlink:href="https://html.scirp.org/file/2313115-rId18.jpeg?20250519023725" />
   </fig>
   <fig id="fig4" position="float">
    <label>Figure 4</label>
    <caption>
     <title>Figure 4. View of operating pellet gas burner at maximum output.</title>
    </caption>
    <graphic mimetype="image" position="float" xlink:type="simple" xlink:href="https://html.scirp.org/file/2313115-rId19.jpeg?20250519023725" />
   </fig>
  </sec><sec id="s2">
   <title>2. The Problem of Fuzzy Modeling of Pellet Burner</title>
   <p>
    <xref ref-type="bibr" rid="scirp.142639-"></xref>Mathematical modeling of a pellet burner for tube gas heater is considered. The basis for this mathematical modeling is the results of an experimental study of the operation of the pellet burner. The results of the study of the work of the pellet burner <xref ref-type="bibr" rid="scirp.142639-33">
     [33]
    </xref> are presented in the form <xref ref-type="table" rid="tableTables 1-6">
     Tables 1-6
    </xref>. There are 5 dimensional parameters and 3 dimensionless parameters (complexes) that characterize the operating pellet burner. Dimensional parameters are: burner area, S; useful area for primary air passage, S<sub>p</sub>; primary air flow, L<sub>p</sub>; total air flow, L; burner power, W. Outlet system functions of the heater: ash transfer by the time, Y<sub>A</sub>; concentration CO at exhaust gases, Y<sub>CO</sub>; concentration NO<sub>x</sub> at exhaust gases, Y<sub>NOx</sub>. A relationship was established between dimensionless complexes and parameters in the form</p>
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   <p>
    <xref ref-type="bibr" rid="scirp.142639-"></xref>where</p>
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   <p>where parameters 
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  </sec><sec id="s3">
   <title>3. Materials and Methods</title>
   <p>We will assume that the system is characterized by a set of parameters 
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        </mo> 
        <msup> 
         <mi>
           v 
         </mi> 
         <mn>
           2 
         </mn> 
        </msup> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msup> 
         <mi>
           v 
         </mi> 
         <mrow> 
          <msub> 
           <mi>
             N 
           </mi> 
           <mi>
             v 
           </mi> 
          </msub> 
         </mrow> 
        </msup> 
       </mrow> 
       <mo>
         } 
       </mo> 
      </mrow> 
      <mo>
        , 
      </mo> 
      <mi>
        v 
      </mi> 
      <mo>
        ∈ 
      </mo> 
      <msub> 
       <mi>
         Ω 
       </mi> 
       <mi>
         v 
       </mi> 
      </msub> 
     </mrow> 
    </math> and there are also initial parameters (functions, criteria) 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <mi>
        w 
      </mi> 
      <mo>
        = 
      </mo> 
      <mrow> 
       <mo>
         { 
       </mo> 
       <mrow> 
        <msup> 
         <mi>
           w 
         </mi> 
         <mn>
           1 
         </mn> 
        </msup> 
        <mo>
          , 
        </mo> 
        <msup> 
         <mi>
           w 
         </mi> 
         <mn>
           2 
         </mn> 
        </msup> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msup> 
         <mi>
           w 
         </mi> 
         <mrow> 
          <msub> 
           <mi>
             N 
           </mi> 
           <mi>
             w 
           </mi> 
          </msub> 
         </mrow> 
        </msup> 
       </mrow> 
       <mo>
         } 
       </mo> 
      </mrow> 
      <mo>
        , 
      </mo> 
      <mi>
        w 
      </mi> 
      <mo>
        ∈ 
      </mo> 
      <msub> 
       <mi>
         Ω 
       </mi> 
       <mi>
         w 
       </mi> 
      </msub> 
     </mrow> 
    </math>. We will assume that there is the set of experimental results in the form 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <mi>
        u 
      </mi> 
      <mo>
        = 
      </mo> 
      <mrow> 
       <mo>
         ‖ 
       </mo> 
       <mrow> 
        <msubsup> 
         <mi>
           v 
         </mi> 
         <mi>
           j 
         </mi> 
         <mrow> 
          <msub> 
           <mi>
             i 
           </mi> 
           <mi>
             v 
           </mi> 
          </msub> 
         </mrow> 
        </msubsup> 
        <mo>
          , 
        </mo> 
        <msubsup> 
         <mi>
           w 
         </mi> 
         <mi>
           j 
         </mi> 
         <mrow> 
          <msub> 
           <mi>
             i 
           </mi> 
           <mi>
             w 
           </mi> 
          </msub> 
         </mrow> 
        </msubsup> 
       </mrow> 
       <mo>
         ‖ 
       </mo> 
      </mrow> 
      <mo>
        , 
      </mo> 
      <msub> 
       <mi>
         i 
       </mi> 
       <mi>
         v 
       </mi> 
      </msub> 
      <mo>
        = 
      </mo> 
      <mn>
        1 
      </mn> 
      <mo>
        , 
      </mo> 
      <mo>
        ⋯ 
      </mo> 
      <mo>
        , 
      </mo> 
      <msub> 
       <mi>
         N 
       </mi> 
       <mi>
         v 
       </mi> 
      </msub> 
      <mo>
        ; 
      </mo> 
      <msub> 
       <mi>
         i 
       </mi> 
       <mi>
         w 
       </mi> 
      </msub> 
      <mo>
        = 
      </mo> 
      <mn>
        1 
      </mn> 
      <mo>
        , 
      </mo> 
      <mo>
        ⋯ 
      </mo> 
      <mo>
        , 
      </mo> 
      <msub> 
       <mi>
         N 
       </mi> 
       <mi>
         w 
       </mi> 
      </msub> 
      <mo>
        ; 
      </mo> 
      <mi>
        j 
      </mi> 
      <mo>
        = 
      </mo> 
      <mn>
        1 
      </mn> 
      <mo>
        , 
      </mo> 
      <mo>
        ⋯ 
      </mo> 
      <mo>
        , 
      </mo> 
      <msub> 
       <mi>
         N 
       </mi> 
       <mi>
         f 
       </mi> 
      </msub> 
     </mrow> 
    </math>, where 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         N 
       </mi> 
       <mi>
         f 
       </mi> 
      </msub> 
     </mrow> 
    </math> the number of experiments. The total number of experiments 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         N 
       </mi> 
       <mi>
         f 
       </mi> 
      </msub> 
     </mrow> 
    </math> was divided into three subgroups 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         u 
       </mi> 
       <mn>
         1 
       </mn> 
      </msub> 
      <mo>
        , 
      </mo> 
      <msub> 
       <mi>
         u 
       </mi> 
       <mn>
         2 
       </mn> 
      </msub> 
      <mo>
        , 
      </mo> 
      <msub> 
       <mi>
         u 
       </mi> 
       <mn>
         3 
       </mn> 
      </msub> 
     </mrow> 
    </math>, so that 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         u 
       </mi> 
       <mn>
         1 
       </mn> 
      </msub> 
     </mrow> 
    </math> is the subgroup of the minimal heater power 
    <math display="inline" xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <mi>
        W 
      </mi> 
      <mo>
        ∈ 
      </mo> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <mn>
          1 
        </mn> 
        <mtext>
            
        </mtext> 
        <mtext>
          - 
        </mtext> 
        <mtext>
            
        </mtext> 
        <mn>
          6 
        </mn> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <mtext>
        kW 
      </mtext> 
     </mrow> 
    </math>, 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         u 
       </mi> 
       <mn>
         2 
       </mn> 
      </msub> 
     </mrow> 
    </math> is the average heater power 
    <math display="inline" xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <mi>
        W 
      </mi> 
      <mo>
        ∈ 
      </mo> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <mn>
          6 
        </mn> 
        <mtext>
            
        </mtext> 
        <mtext>
          - 
        </mtext> 
        <mtext>
            
        </mtext> 
        <mn>
          18 
        </mn> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <mtext>
        kW 
      </mtext> 
     </mrow> 
    </math>, and 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         u 
       </mi> 
       <mn>
         3 
       </mn> 
      </msub> 
     </mrow> 
    </math> is the maximal heater power 
    <math display="inline" xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <mi>
        W 
      </mi> 
      <mo>
        ∈ 
      </mo> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <mn>
          18 
        </mn> 
        <mtext>
            
        </mtext> 
        <mtext>
          - 
        </mtext> 
        <mtext>
            
        </mtext> 
        <mn>
          50 
        </mn> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <mtext>
        kW 
      </mtext> 
     </mrow> 
    </math>, so it may be represent in form:</p>
   <p>
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mtable columnalign="left"> 
      <mtr> 
       <mtd> 
        <msub> 
         <mi>
           u 
         </mi> 
         <mn>
           1 
         </mn> 
        </msub> 
        <mo>
          = 
        </mo> 
        <mrow> 
         <mo>
           ‖ 
         </mo> 
         <mrow> 
          <msubsup> 
           <mi>
             v 
           </mi> 
           <mi>
             j 
           </mi> 
           <mrow> 
            <msub> 
             <mi>
               i 
             </mi> 
             <mi>
               v 
             </mi> 
            </msub> 
           </mrow> 
          </msubsup> 
          <mo>
            , 
          </mo> 
          <msubsup> 
           <mi>
             w 
           </mi> 
           <mi>
             j 
           </mi> 
           <mrow> 
            <msub> 
             <mi>
               i 
             </mi> 
             <mi>
               v 
             </mi> 
            </msub> 
           </mrow> 
          </msubsup> 
         </mrow> 
         <mo>
           ‖ 
         </mo> 
        </mrow> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           i 
         </mi> 
         <mi>
           v 
         </mi> 
        </msub> 
        <mo>
          = 
        </mo> 
        <mn>
          1 
        </mn> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           N 
         </mi> 
         <mi>
           v 
         </mi> 
        </msub> 
        <mo>
          ; 
        </mo> 
        <msub> 
         <mi>
           i 
         </mi> 
         <mi>
           w 
         </mi> 
        </msub> 
        <mo>
          = 
        </mo> 
        <mn>
          1 
        </mn> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           N 
         </mi> 
         <mi>
           w 
         </mi> 
        </msub> 
        <mo>
          ; 
        </mo> 
        <mi>
          j 
        </mi> 
        <mo>
          = 
        </mo> 
        <msub> 
         <mi>
           j 
         </mi> 
         <mn>
           1 
         </mn> 
        </msub> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           N 
         </mi> 
         <mrow> 
          <msub> 
           <mi>
             f 
           </mi> 
           <mn>
             1 
           </mn> 
          </msub> 
         </mrow> 
        </msub> 
       </mtd> 
      </mtr> 
      <mtr> 
       <mtd> 
        <msub> 
         <mi>
           u 
         </mi> 
         <mn>
           2 
         </mn> 
        </msub> 
        <mo>
          = 
        </mo> 
        <mrow> 
         <mo>
           ‖ 
         </mo> 
         <mrow> 
          <msubsup> 
           <mi>
             v 
           </mi> 
           <mi>
             j 
           </mi> 
           <mrow> 
            <msub> 
             <mi>
               i 
             </mi> 
             <mi>
               v 
             </mi> 
            </msub> 
           </mrow> 
          </msubsup> 
          <mo>
            , 
          </mo> 
          <msubsup> 
           <mi>
             w 
           </mi> 
           <mi>
             j 
           </mi> 
           <mrow> 
            <msub> 
             <mi>
               i 
             </mi> 
             <mi>
               v 
             </mi> 
            </msub> 
           </mrow> 
          </msubsup> 
         </mrow> 
         <mo>
           ‖ 
         </mo> 
        </mrow> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           i 
         </mi> 
         <mi>
           v 
         </mi> 
        </msub> 
        <mo>
          = 
        </mo> 
        <mn>
          1 
        </mn> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           N 
         </mi> 
         <mi>
           v 
         </mi> 
        </msub> 
        <mo>
          ; 
        </mo> 
        <msub> 
         <mi>
           i 
         </mi> 
         <mi>
           w 
         </mi> 
        </msub> 
        <mo>
          = 
        </mo> 
        <mn>
          1 
        </mn> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           N 
         </mi> 
         <mi>
           w 
         </mi> 
        </msub> 
        <mo>
          ; 
        </mo> 
        <mi>
          j 
        </mi> 
        <mo>
          = 
        </mo> 
        <msub> 
         <mi>
           j 
         </mi> 
         <mn>
           2 
         </mn> 
        </msub> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           N 
         </mi> 
         <mrow> 
          <msub> 
           <mi>
             f 
           </mi> 
           <mn>
             2 
           </mn> 
          </msub> 
         </mrow> 
        </msub> 
       </mtd> 
      </mtr> 
      <mtr> 
       <mtd> 
        <msub> 
         <mi>
           u 
         </mi> 
         <mn>
           3 
         </mn> 
        </msub> 
        <mo>
          = 
        </mo> 
        <mrow> 
         <mo>
           ‖ 
         </mo> 
         <mrow> 
          <msubsup> 
           <mi>
             v 
           </mi> 
           <mi>
             j 
           </mi> 
           <mrow> 
            <msub> 
             <mi>
               i 
             </mi> 
             <mi>
               v 
             </mi> 
            </msub> 
           </mrow> 
          </msubsup> 
          <mo>
            , 
          </mo> 
          <msubsup> 
           <mi>
             w 
           </mi> 
           <mi>
             j 
           </mi> 
           <mrow> 
            <msub> 
             <mi>
               i 
             </mi> 
             <mi>
               v 
             </mi> 
            </msub> 
           </mrow> 
          </msubsup> 
         </mrow> 
         <mo>
           ‖ 
         </mo> 
        </mrow> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           i 
         </mi> 
         <mi>
           v 
         </mi> 
        </msub> 
        <mo>
          = 
        </mo> 
        <mn>
          1 
        </mn> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           N 
         </mi> 
         <mi>
           v 
         </mi> 
        </msub> 
        <mo>
          ; 
        </mo> 
        <msub> 
         <mi>
           i 
         </mi> 
         <mi>
           w 
         </mi> 
        </msub> 
        <mo>
          = 
        </mo> 
        <mn>
          1 
        </mn> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           N 
         </mi> 
         <mi>
           w 
         </mi> 
        </msub> 
        <mo>
          ; 
        </mo> 
        <mi>
          j 
        </mi> 
        <mo>
          = 
        </mo> 
        <msub> 
         <mi>
           j 
         </mi> 
         <mn>
           3 
         </mn> 
        </msub> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           N 
         </mi> 
         <mrow> 
          <msub> 
           <mi>
             f 
           </mi> 
           <mn>
             3 
           </mn> 
          </msub> 
         </mrow> 
        </msub> 
       </mtd> 
      </mtr> 
     </mtable> 
    </math> (3)</p>
   <p>If we give the experimental results an expert assessment using fuzzy comparisons of the results with each other, then we will obtain a fuzzy correspondence matrix of experiments, which can be represented in the form</p>
   <p>
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mtable columnalign="left"> 
      <mtr> 
       <mtd> 
        <msub> 
         <mi>
           Z 
         </mi> 
         <mn>
           1 
         </mn> 
        </msub> 
        <mo>
          = 
        </mo> 
        <mrow> 
         <mo>
           ‖ 
         </mo> 
         <mrow> 
          <msub> 
           <mi>
             z 
           </mi> 
           <mrow> 
            <mi>
              i 
            </mi> 
            <mi>
              j 
            </mi> 
           </mrow> 
          </msub> 
         </mrow> 
         <mo>
           ‖ 
         </mo> 
        </mrow> 
        <mo>
          , 
        </mo> 
        <mi>
          i 
        </mi> 
        <mo>
          = 
        </mo> 
        <mn>
          1 
        </mn> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           N 
         </mi> 
         <mrow> 
          <msub> 
           <mi>
             f 
           </mi> 
           <mn>
             1 
           </mn> 
          </msub> 
         </mrow> 
        </msub> 
        <mo>
          ; 
        </mo> 
        <mi>
          j 
        </mi> 
        <mo>
          = 
        </mo> 
        <mn>
          1 
        </mn> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           N 
         </mi> 
         <mrow> 
          <msub> 
           <mi>
             f 
           </mi> 
           <mn>
             1 
           </mn> 
          </msub> 
         </mrow> 
        </msub> 
       </mtd> 
      </mtr> 
      <mtr> 
       <mtd> 
        <msub> 
         <mi>
           Z 
         </mi> 
         <mn>
           2 
         </mn> 
        </msub> 
        <mo>
          = 
        </mo> 
        <mrow> 
         <mo>
           ‖ 
         </mo> 
         <mrow> 
          <msub> 
           <mi>
             z 
           </mi> 
           <mrow> 
            <mi>
              i 
            </mi> 
            <mi>
              j 
            </mi> 
           </mrow> 
          </msub> 
         </mrow> 
         <mo>
           ‖ 
         </mo> 
        </mrow> 
        <mo>
          , 
        </mo> 
        <mi>
          i 
        </mi> 
        <mo>
          = 
        </mo> 
        <mn>
          1 
        </mn> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           N 
         </mi> 
         <mrow> 
          <msub> 
           <mi>
             f 
           </mi> 
           <mn>
             2 
           </mn> 
          </msub> 
         </mrow> 
        </msub> 
        <mo>
          ; 
        </mo> 
        <mi>
          j 
        </mi> 
        <mo>
          = 
        </mo> 
        <mn>
          1 
        </mn> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           N 
         </mi> 
         <mrow> 
          <msub> 
           <mi>
             f 
           </mi> 
           <mn>
             2 
           </mn> 
          </msub> 
         </mrow> 
        </msub> 
       </mtd> 
      </mtr> 
      <mtr> 
       <mtd> 
        <msub> 
         <mi>
           Z 
         </mi> 
         <mn>
           3 
         </mn> 
        </msub> 
        <mo>
          = 
        </mo> 
        <mrow> 
         <mo>
           ‖ 
         </mo> 
         <mrow> 
          <msub> 
           <mi>
             z 
           </mi> 
           <mrow> 
            <mi>
              i 
            </mi> 
            <mi>
              j 
            </mi> 
           </mrow> 
          </msub> 
         </mrow> 
         <mo>
           ‖ 
         </mo> 
        </mrow> 
        <mo>
          , 
        </mo> 
        <mi>
          i 
        </mi> 
        <mo>
          = 
        </mo> 
        <mn>
          1 
        </mn> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           N 
         </mi> 
         <mrow> 
          <msub> 
           <mi>
             f 
           </mi> 
           <mn>
             3 
           </mn> 
          </msub> 
         </mrow> 
        </msub> 
        <mo>
          ; 
        </mo> 
        <mi>
          j 
        </mi> 
        <mo>
          = 
        </mo> 
        <mn>
          1 
        </mn> 
        <mo>
          , 
        </mo> 
        <mo>
          ⋯ 
        </mo> 
        <mo>
          , 
        </mo> 
        <msub> 
         <mi>
           N 
         </mi> 
         <mrow> 
          <msub> 
           <mi>
             f 
           </mi> 
           <mn>
             3 
           </mn> 
          </msub> 
         </mrow> 
        </msub> 
       </mtd> 
      </mtr> 
     </mtable> 
    </math> (4)</p>
   <p>For expert evaluation the rating scale was used 
    <math display="inline" xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         z 
       </mi> 
       <mrow> 
        <mi>
          i 
        </mi> 
        <mi>
          j 
        </mi> 
       </mrow> 
      </msub> 
      <mo>
        ∈ 
      </mo> 
      <mrow> 
       <mo>
         { 
       </mo> 
       <mrow> 
        <mn>
          0 
        </mn> 
        <mo>
          ; 
        </mo> 
        <mn>
          0.3 
        </mn> 
        <mo>
          ; 
        </mo> 
        <mn>
          0.4 
        </mn> 
        <mo>
          ; 
        </mo> 
        <mn>
          0.5 
        </mn> 
        <mo>
          ; 
        </mo> 
        <mn>
          0.6 
        </mn> 
        <mo>
          ; 
        </mo> 
        <mn>
          0.8 
        </mn> 
        <mo>
          ; 
        </mo> 
        <mn>
          1.0 
        </mn> 
       </mrow> 
       <mo>
         } 
       </mo> 
      </mrow> 
     </mrow> 
    </math>, which make sense: {much worse; worse; slightly worse; comparable; slightly better; better; much better}. We also assume that the fuzzy binary relation 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mover accent="true"> 
        <mi>
          R 
        </mi> 
        <mo>
          ˜ 
        </mo> 
       </mover> 
       <mrow> 
        <mi>
          S 
        </mi> 
        <mn>
          1 
        </mn> 
       </mrow> 
      </msub> 
     </mrow> 
    </math> with the membership function 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         μ 
       </mi> 
       <mrow> 
        <msub> 
         <mi>
           R 
         </mi> 
         <mrow> 
          <mi>
            S 
          </mi> 
          <mn>
            1 
          </mn> 
         </mrow> 
        </msub> 
       </mrow> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <mi>
          z 
        </mi> 
        <mo>
          , 
        </mo> 
        <mi>
          z 
        </mi> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
     </mrow> 
    </math>is known. We assume that the known selection function 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         Γ 
       </mi> 
       <mn>
         1 
       </mn> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mi>
         z 
       </mi> 
       <mo>
         ) 
       </mo> 
      </mrow> 
     </mrow> 
    </math> is such that 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         Γ 
       </mi> 
       <mn>
         1 
       </mn> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <mi>
          z 
        </mi> 
        <mrow> 
         <mo>
           ( 
         </mo> 
         <mrow> 
          <msub> 
           <mi>
             x 
           </mi> 
           <mn>
             1 
           </mn> 
          </msub> 
         </mrow> 
         <mo>
           ) 
         </mo> 
        </mrow> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <mo>
        ≥ 
      </mo> 
      <msub> 
       <mi>
         Γ 
       </mi> 
       <mn>
         1 
       </mn> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <mi>
          z 
        </mi> 
        <mrow> 
         <mo>
           ( 
         </mo> 
         <mrow> 
          <msub> 
           <mi>
             x 
           </mi> 
           <mn>
             2 
           </mn> 
          </msub> 
         </mrow> 
         <mo>
           ) 
         </mo> 
        </mrow> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <mo>
        ≡ 
      </mo> 
      <mi>
        z 
      </mi> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <msub> 
         <mi>
           x 
         </mi> 
         <mn>
           1 
         </mn> 
        </msub> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <msub> 
       <mover accent="true"> 
        <mi>
          R 
        </mi> 
        <mo>
          ˜ 
        </mo> 
       </mover> 
       <mrow> 
        <mi>
          S 
        </mi> 
        <mn>
          1 
        </mn> 
       </mrow> 
      </msub> 
      <mi>
        z 
      </mi> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <msub> 
         <mi>
           x 
         </mi> 
         <mn>
           2 
         </mn> 
        </msub> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <mo>
        , 
      </mo> 
      <mo>
        ∀ 
      </mo> 
      <msub> 
       <mi>
         x 
       </mi> 
       <mn>
         1 
       </mn> 
      </msub> 
      <mo>
        , 
      </mo> 
      <msub> 
       <mi>
         x 
       </mi> 
       <mn>
         2 
       </mn> 
      </msub> 
      <mo>
        ∈ 
      </mo> 
      <msub> 
       <mi>
         Ω 
       </mi> 
       <mn>
         1 
       </mn> 
      </msub> 
     </mrow> 
    </math>.</p>
   <p>And we assume that the known selection function 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         Γ 
       </mi> 
       <mn>
         2 
       </mn> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mi>
         z 
       </mi> 
       <mo>
         ) 
       </mo> 
      </mrow> 
     </mrow> 
    </math> with fuzzy binary relation 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mover accent="true"> 
        <mi>
          R 
        </mi> 
        <mo>
          ˜ 
        </mo> 
       </mover> 
       <mrow> 
        <mi>
          S 
        </mi> 
        <mn>
          2 
        </mn> 
       </mrow> 
      </msub> 
     </mrow> 
    </math> with the membership function 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         μ 
       </mi> 
       <mrow> 
        <msub> 
         <mi>
           R 
         </mi> 
         <mrow> 
          <mi>
            S 
          </mi> 
          <mn>
            2 
          </mn> 
         </mrow> 
        </msub> 
       </mrow> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <mi>
          z 
        </mi> 
        <mo>
          , 
        </mo> 
        <mi>
          z 
        </mi> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
     </mrow> 
    </math> is known, so that 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         Γ 
       </mi> 
       <mn>
         2 
       </mn> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <mi>
          z 
        </mi> 
        <mrow> 
         <mo>
           ( 
         </mo> 
         <mrow> 
          <msub> 
           <mi>
             x 
           </mi> 
           <mn>
             1 
           </mn> 
          </msub> 
         </mrow> 
         <mo>
           ) 
         </mo> 
        </mrow> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <mo>
        ≥ 
      </mo> 
      <msub> 
       <mi>
         Γ 
       </mi> 
       <mn>
         2 
       </mn> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <mi>
          z 
        </mi> 
        <mrow> 
         <mo>
           ( 
         </mo> 
         <mrow> 
          <msub> 
           <mi>
             x 
           </mi> 
           <mn>
             2 
           </mn> 
          </msub> 
         </mrow> 
         <mo>
           ) 
         </mo> 
        </mrow> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <mo>
        ≡ 
      </mo> 
      <mi>
        z 
      </mi> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <msub> 
         <mi>
           x 
         </mi> 
         <mn>
           1 
         </mn> 
        </msub> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <msub> 
       <mover accent="true"> 
        <mi>
          R 
        </mi> 
        <mo>
          ˜ 
        </mo> 
       </mover> 
       <mrow> 
        <mi>
          S 
        </mi> 
        <mn>
          2 
        </mn> 
       </mrow> 
      </msub> 
      <mi>
        z 
      </mi> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <msub> 
         <mi>
           x 
         </mi> 
         <mn>
           2 
         </mn> 
        </msub> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <mo>
        , 
      </mo> 
      <mo>
        ∀ 
      </mo> 
      <msub> 
       <mi>
         x 
       </mi> 
       <mn>
         1 
       </mn> 
      </msub> 
      <mo>
        , 
      </mo> 
      <msub> 
       <mi>
         x 
       </mi> 
       <mn>
         2 
       </mn> 
      </msub> 
      <mo>
        ∈ 
      </mo> 
      <msub> 
       <mi>
         Ω 
       </mi> 
       <mn>
         2 
       </mn> 
      </msub> 
     </mrow> 
    </math>.</p>
   <p>And we assume that the known selection function 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         Γ 
       </mi> 
       <mn>
         3 
       </mn> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mi>
         z 
       </mi> 
       <mo>
         ) 
       </mo> 
      </mrow> 
     </mrow> 
    </math> with fuzzy binary relation 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mover accent="true"> 
        <mi>
          R 
        </mi> 
        <mo>
          ˜ 
        </mo> 
       </mover> 
       <mrow> 
        <mi>
          S 
        </mi> 
        <mn>
          3 
        </mn> 
       </mrow> 
      </msub> 
     </mrow> 
    </math> with the membership function 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         μ 
       </mi> 
       <mrow> 
        <msub> 
         <mover accent="true"> 
          <mi>
            R 
          </mi> 
          <mo>
            ˜ 
          </mo> 
         </mover> 
         <mrow> 
          <mi>
            S 
          </mi> 
          <mn>
            3 
          </mn> 
         </mrow> 
        </msub> 
       </mrow> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <mi>
          z 
        </mi> 
        <mo>
          , 
        </mo> 
        <mi>
          z 
        </mi> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
     </mrow> 
    </math> is known, so that 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         Γ 
       </mi> 
       <mn>
         3 
       </mn> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <mi>
          z 
        </mi> 
        <mrow> 
         <mo>
           ( 
         </mo> 
         <mrow> 
          <msub> 
           <mi>
             x 
           </mi> 
           <mn>
             1 
           </mn> 
          </msub> 
         </mrow> 
         <mo>
           ) 
         </mo> 
        </mrow> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <mo>
        ≥ 
      </mo> 
      <msub> 
       <mi>
         Γ 
       </mi> 
       <mn>
         3 
       </mn> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <mi>
          z 
        </mi> 
        <mrow> 
         <mo>
           ( 
         </mo> 
         <mrow> 
          <msub> 
           <mi>
             x 
           </mi> 
           <mn>
             2 
           </mn> 
          </msub> 
         </mrow> 
         <mo>
           ) 
         </mo> 
        </mrow> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <mo>
        ≡ 
      </mo> 
      <mi>
        z 
      </mi> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <msub> 
         <mi>
           x 
         </mi> 
         <mn>
           1 
         </mn> 
        </msub> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <msub> 
       <mover accent="true"> 
        <mi>
          R 
        </mi> 
        <mo>
          ˜ 
        </mo> 
       </mover> 
       <mrow> 
        <mi>
          S 
        </mi> 
        <mn>
          3 
        </mn> 
       </mrow> 
      </msub> 
      <mi>
        z 
      </mi> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mrow> 
        <msub> 
         <mi>
           x 
         </mi> 
         <mn>
           2 
         </mn> 
        </msub> 
       </mrow> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <mo>
        , 
      </mo> 
      <mo>
        ∀ 
      </mo> 
      <msub> 
       <mi>
         x 
       </mi> 
       <mn>
         1 
       </mn> 
      </msub> 
      <mo>
        , 
      </mo> 
      <msub> 
       <mi>
         x 
       </mi> 
       <mn>
         2 
       </mn> 
      </msub> 
      <mo>
        ∈ 
      </mo> 
      <msub> 
       <mi>
         Ω 
       </mi> 
       <mn>
         3 
       </mn> 
      </msub> 
     </mrow> 
    </math>.</p>
   <p>It is necessary to find a solution 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <mi>
        x 
      </mi> 
      <mo>
        ∈ 
      </mo> 
      <msub> 
       <mi>
         Ω 
       </mi> 
       <mn>
         1 
       </mn> 
      </msub> 
     </mrow> 
    </math> and for all 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <mi>
        y 
      </mi> 
      <mo>
        ∈ 
      </mo> 
      <msub> 
       <mi>
         Ω 
       </mi> 
       <mn>
         1 
       </mn> 
      </msub> 
     </mrow> 
    </math> so that</p>
   <p>
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         Γ 
       </mi> 
       <mn>
         1 
       </mn> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mi>
         x 
       </mi> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <mo>
        ≥ 
      </mo> 
      <msub> 
       <mi>
         Γ 
       </mi> 
       <mn>
         1 
       </mn> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mi>
         y 
       </mi> 
       <mo>
         ) 
       </mo> 
      </mrow> 
     </mrow> 
    </math>. (5)</p>
   <p>And it is necessary to find a solution 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <mi>
        x 
      </mi> 
      <mo>
        ∈ 
      </mo> 
      <msub> 
       <mi>
         Ω 
       </mi> 
       <mn>
         2 
       </mn> 
      </msub> 
     </mrow> 
    </math> and for all 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <mi>
        y 
      </mi> 
      <mo>
        ∈ 
      </mo> 
      <msub> 
       <mi>
         Ω 
       </mi> 
       <mn>
         2 
       </mn> 
      </msub> 
     </mrow> 
    </math> so that</p>
   <p>
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         Γ 
       </mi> 
       <mn>
         2 
       </mn> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mi>
         x 
       </mi> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <mo>
        ≥ 
      </mo> 
      <msub> 
       <mi>
         Γ 
       </mi> 
       <mn>
         2 
       </mn> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mi>
         y 
       </mi> 
       <mo>
         ) 
       </mo> 
      </mrow> 
     </mrow> 
    </math>. (6)</p>
   <p>And it is necessary to find a solution 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <mi>
        x 
      </mi> 
      <mo>
        ∈ 
      </mo> 
      <msub> 
       <mi>
         Ω 
       </mi> 
       <mn>
         3 
       </mn> 
      </msub> 
     </mrow> 
    </math> and for all 
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <mi>
        y 
      </mi> 
      <mo>
        ∈ 
      </mo> 
      <msub> 
       <mi>
         Ω 
       </mi> 
       <mn>
         3 
       </mn> 
      </msub> 
     </mrow> 
    </math> so that</p>
   <p>
    <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
      <msub> 
       <mi>
         Γ 
       </mi> 
       <mn>
         3 
       </mn> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mi>
         x 
       </mi> 
       <mo>
         ) 
       </mo> 
      </mrow> 
      <mo>
        ≥ 
      </mo> 
      <msub> 
       <mi>
         Γ 
       </mi> 
       <mn>
         3 
       </mn> 
      </msub> 
      <mrow> 
       <mo>
         ( 
       </mo> 
       <mi>
         y 
       </mi> 
       <mo>
         ) 
       </mo> 
      </mrow> 
     </mrow> 
    </math>. (7)</p>
   <sec id="s3_1">
    <title>Algorithm with Mathematical Expectations</title>
    <p>In the binary relations (5)-(7) we replace selection function 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          Γ 
        </mi> 
        <mn>
          1 
        </mn> 
       </msub> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mi>
          z 
        </mi> 
        <mo>
          ) 
        </mo> 
       </mrow> 
      </mrow> 
     </math>, 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          Γ 
        </mi> 
        <mn>
          2 
        </mn> 
       </msub> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mi>
          z 
        </mi> 
        <mo>
          ) 
        </mo> 
       </mrow> 
      </mrow> 
     </math>, 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          Γ 
        </mi> 
        <mn>
          3 
        </mn> 
       </msub> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mi>
          z 
        </mi> 
        <mo>
          ) 
        </mo> 
       </mrow> 
      </mrow> 
     </math> the sample mean values, which is calculated in the form</p>
    <p>
     <math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"> <mtable columnalign="left"> 
       <mtr> 
        <mtd> 
         <msub> 
          <mover accent="true"> 
           <mi>
             Γ 
           </mi> 
           <mo>
             ¯ 
           </mo> 
          </mover> 
          <mn>
            1 
          </mn> 
         </msub> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <mi>
             x 
           </mi> 
           <mo>
             , 
           </mo> 
           <mi>
             θ 
           </mi> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
         <mo>
           = 
         </mo> 
         <mrow> 
          <mn>
            1 
          </mn> 
          <mo>
            / 
          </mo> 
          <mrow> 
           <msub> 
            <mi>
              n 
            </mi> 
            <mi>
              i 
            </mi> 
           </msub> 
          </mrow> 
         </mrow> 
         <mstyle displaystyle="true"> 
          <munderover> 
           <mo>
             ∑ 
           </mo> 
           <mi>
             i 
           </mi> 
           <mrow> 
            <msub> 
             <mi>
               n 
             </mi> 
             <mi>
               i 
             </mi> 
            </msub> 
           </mrow> 
          </munderover> 
          <mrow> 
           <msub> 
            <mi>
              Γ 
            </mi> 
            <mn>
              1 
            </mn> 
           </msub> 
           <mrow> 
            <mo>
              ( 
            </mo> 
            <mrow> 
             <mi>
               x 
             </mi> 
             <mo>
               , 
             </mo> 
             <msub> 
              <mi>
                θ 
              </mi> 
              <mi>
                i 
              </mi> 
             </msub> 
            </mrow> 
            <mo>
              ) 
            </mo> 
           </mrow> 
          </mrow> 
         </mstyle> 
         <mo>
           , 
         </mo> 
         <mtext>
             
         </mtext> 
         <msub> 
          <mover accent="true"> 
           <mi>
             Γ 
           </mi> 
           <mo>
             ¯ 
           </mo> 
          </mover> 
          <mn>
            2 
          </mn> 
         </msub> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <mi>
             x 
           </mi> 
           <mo>
             , 
           </mo> 
           <mi>
             θ 
           </mi> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
         <mo>
           = 
         </mo> 
         <mrow> 
          <mn>
            1 
          </mn> 
          <mo>
            / 
          </mo> 
          <mrow> 
           <msub> 
            <mi>
              n 
            </mi> 
            <mi>
              i 
            </mi> 
           </msub> 
          </mrow> 
         </mrow> 
         <mstyle displaystyle="true"> 
          <munderover> 
           <mo>
             ∑ 
           </mo> 
           <mi>
             i 
           </mi> 
           <mrow> 
            <msub> 
             <mi>
               n 
             </mi> 
             <mi>
               i 
             </mi> 
            </msub> 
           </mrow> 
          </munderover> 
          <mrow> 
           <msub> 
            <mi>
              Γ 
            </mi> 
            <mn>
              2 
            </mn> 
           </msub> 
           <mrow> 
            <mo>
              ( 
            </mo> 
            <mrow> 
             <mi>
               x 
             </mi> 
             <mo>
               , 
             </mo> 
             <msub> 
              <mi>
                θ 
              </mi> 
              <mi>
                i 
              </mi> 
             </msub> 
            </mrow> 
            <mo>
              ) 
            </mo> 
           </mrow> 
          </mrow> 
         </mstyle> 
         <mo>
           , 
         </mo> 
        </mtd> 
       </mtr> 
       <mtr> 
        <mtd> 
         <msub> 
          <mover accent="true"> 
           <mi>
             Γ 
           </mi> 
           <mo>
             ¯ 
           </mo> 
          </mover> 
          <mn>
            3 
          </mn> 
         </msub> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <mi>
             x 
           </mi> 
           <mo>
             , 
           </mo> 
           <mi>
             θ 
           </mi> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
         <mo>
           = 
         </mo> 
         <mrow> 
          <mn>
            1 
          </mn> 
          <mo>
            / 
          </mo> 
          <mrow> 
           <msub> 
            <mi>
              n 
            </mi> 
            <mi>
              i 
            </mi> 
           </msub> 
          </mrow> 
         </mrow> 
         <mstyle displaystyle="true"> 
          <munderover> 
           <mo>
             ∑ 
           </mo> 
           <mi>
             i 
           </mi> 
           <mrow> 
            <msub> 
             <mi>
               n 
             </mi> 
             <mi>
               i 
             </mi> 
            </msub> 
           </mrow> 
          </munderover> 
          <mrow> 
           <msub> 
            <mi>
              Γ 
            </mi> 
            <mn>
              3 
            </mn> 
           </msub> 
           <mrow> 
            <mo>
              ( 
            </mo> 
            <mrow> 
             <mi>
               x 
             </mi> 
             <mo>
               , 
             </mo> 
             <msub> 
              <mi>
                θ 
              </mi> 
              <mi>
                i 
              </mi> 
             </msub> 
            </mrow> 
            <mo>
              ) 
            </mo> 
           </mrow> 
          </mrow> 
         </mstyle> 
         <mo>
           . 
         </mo> 
        </mtd> 
       </mtr> 
      </mtable> 
     </math> (8)</p>
    <p>where 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          θ 
        </mi> 
        <mi>
          i 
        </mi> 
       </msub> 
      </mrow> 
     </math>-implementation of a random process, 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          n 
        </mi> 
        <mi>
          r 
        </mi> 
       </msub> 
      </mrow> 
     </math>-total number of realizations of a random process. We replace binary relation (5)-(7) with</p>
    <p>
     <math xmlns="http://www.w3.org/1998/Math/MathML" display="inline"> <mtable columnalign="left"> 
       <mtr> 
        <mtd> 
         <mi>
           x 
         </mi> 
         <msub> 
          <mover accent="true"> 
           <mi>
             R 
           </mi> 
           <mo>
             ˜ 
           </mo> 
          </mover> 
          <mrow> 
           <mover accent="true"> 
            <mi>
              S 
            </mi> 
            <mo>
              ¯ 
            </mo> 
           </mover> 
           <mn>
             1 
           </mn> 
          </mrow> 
         </msub> 
         <mi>
           y 
         </mi> 
         <mo>
           ≡ 
         </mo> 
         <msub> 
          <mover accent="true"> 
           <mi>
             Γ 
           </mi> 
           <mo>
             ¯ 
           </mo> 
          </mover> 
          <mn>
            1 
          </mn> 
         </msub> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <mi>
             x 
           </mi> 
           <mo>
             , 
           </mo> 
           <mi>
             θ 
           </mi> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
         <mo>
           ≥ 
         </mo> 
         <msub> 
          <mover accent="true"> 
           <mi>
             Γ 
           </mi> 
           <mo>
             ¯ 
           </mo> 
          </mover> 
          <mn>
            1 
          </mn> 
         </msub> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <mi>
             y 
           </mi> 
           <mo>
             , 
           </mo> 
           <mi>
             θ 
           </mi> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
         <mo>
           , 
         </mo> 
         <mtext>
             
         </mtext> 
         <mi>
           x 
         </mi> 
         <msub> 
          <mover accent="true"> 
           <mi>
             R 
           </mi> 
           <mo>
             ˜ 
           </mo> 
          </mover> 
          <mrow> 
           <mover accent="true"> 
            <mi>
              S 
            </mi> 
            <mo>
              ¯ 
            </mo> 
           </mover> 
           <mn>
             2 
           </mn> 
          </mrow> 
         </msub> 
         <mi>
           y 
         </mi> 
         <mo>
           ≡ 
         </mo> 
         <msub> 
          <mover accent="true"> 
           <mi>
             Γ 
           </mi> 
           <mo>
             ¯ 
           </mo> 
          </mover> 
          <mn>
            2 
          </mn> 
         </msub> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <mi>
             x 
           </mi> 
           <mo>
             , 
           </mo> 
           <mi>
             θ 
           </mi> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
         <mo>
           ≥ 
         </mo> 
         <msub> 
          <mover accent="true"> 
           <mi>
             Γ 
           </mi> 
           <mo>
             ¯ 
           </mo> 
          </mover> 
          <mn>
            2 
          </mn> 
         </msub> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <mi>
             y 
           </mi> 
           <mo>
             , 
           </mo> 
           <mi>
             θ 
           </mi> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
         <mo>
           , 
         </mo> 
        </mtd> 
       </mtr> 
       <mtr> 
        <mtd> 
         <mi>
           x 
         </mi> 
         <msub> 
          <mover accent="true"> 
           <mi>
             R 
           </mi> 
           <mo>
             ˜ 
           </mo> 
          </mover> 
          <mrow> 
           <mover accent="true"> 
            <mi>
              S 
            </mi> 
            <mo>
              ¯ 
            </mo> 
           </mover> 
           <mn>
             3 
           </mn> 
          </mrow> 
         </msub> 
         <mi>
           y 
         </mi> 
         <mo>
           ≡ 
         </mo> 
         <msub> 
          <mover accent="true"> 
           <mi>
             Γ 
           </mi> 
           <mo>
             ¯ 
           </mo> 
          </mover> 
          <mn>
            3 
          </mn> 
         </msub> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <mi>
             x 
           </mi> 
           <mo>
             , 
           </mo> 
           <mi>
             θ 
           </mi> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
         <mo>
           ≥ 
         </mo> 
         <msub> 
          <mover accent="true"> 
           <mi>
             Γ 
           </mi> 
           <mo>
             ¯ 
           </mo> 
          </mover> 
          <mn>
            3 
          </mn> 
         </msub> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <mi>
             y 
           </mi> 
           <mo>
             , 
           </mo> 
           <mi>
             θ 
           </mi> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
         <mo>
           . 
         </mo> 
        </mtd> 
       </mtr> 
      </mtable> 
     </math> (9)</p>
    <p>The methods for solving the problems are based on the approach to the evolutionary search for 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mover accent="true"> 
         <mi>
           R 
         </mi> 
         <mo>
           ˜ 
         </mo> 
        </mover> 
        <mi>
          S 
        </mi> 
       </msub> 
      </mrow> 
     </math>-optimal solutions. For subset 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mi>
        X 
      </mi> 
     </math>, 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <mi>
         X 
       </mi> 
       <mo>
         ⊂ 
       </mo> 
       <mi>
         Ω 
       </mi> 
      </mrow> 
     </math> we denote the function of choice in the form</p>
    <p>
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <mi>
         S 
       </mi> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mi>
          X 
        </mi> 
        <mo>
          ) 
        </mo> 
       </mrow> 
       <mo>
         = 
       </mo> 
       <mrow> 
        <mo>
          { 
        </mo> 
        <mrow> 
         <mi>
           x 
         </mi> 
         <mo>
           ∈ 
         </mo> 
         <mi>
           X 
         </mi> 
         <mo>
           | 
         </mo> 
         <mo>
           ∀ 
         </mo> 
         <mi>
           y 
         </mi> 
         <mo>
           ∈ 
         </mo> 
         <mrow> 
          <mo>
            [ 
          </mo> 
          <mrow> 
           <mi>
             X 
           </mi> 
           <mo>
             \ 
           </mo> 
           <mi>
             S 
           </mi> 
           <mrow> 
            <mo>
              ( 
            </mo> 
            <mi>
              X 
            </mi> 
            <mo>
              ) 
            </mo> 
           </mrow> 
          </mrow> 
          <mo>
            ] 
          </mo> 
         </mrow> 
         <mo>
           , 
         </mo> 
         <mi>
           x 
         </mi> 
         <msub> 
          <mover accent="true"> 
           <mi>
             R 
           </mi> 
           <mo>
             ˜ 
           </mo> 
          </mover> 
          <mi>
            S 
          </mi> 
         </msub> 
         <mi>
           y 
         </mi> 
        </mrow> 
        <mo>
          } 
        </mo> 
       </mrow> 
      </mrow> 
     </math> (10)</p>
    <p>We shall assume that set 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <mi>
         S 
       </mi> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mi>
          X 
        </mi> 
        <mo>
          ) 
        </mo> 
       </mrow> 
      </mrow> 
     </math> contains the concrete number of elements— 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          N 
        </mi> 
        <mrow> 
         <mi>
           o 
         </mi> 
         <mi>
           p 
         </mi> 
        </mrow> 
       </msub> 
      </mrow> 
     </math>.</p>
    <p>We shall that for the set Ω it was determined relation 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mover accent="true"> 
         <mi>
           R 
         </mi> 
         <mo>
           ˜ 
         </mo> 
        </mover> 
        <mi>
          G 
        </mi> 
       </msub> 
      </mrow> 
     </math> with membership function 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          μ 
        </mi> 
        <mrow> 
         <msub> 
          <mover accent="true"> 
           <mi>
             R 
           </mi> 
           <mo>
             ˜ 
           </mo> 
          </mover> 
          <mi>
            G 
          </mi> 
         </msub> 
        </mrow> 
       </msub> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mrow> 
         <mi>
           x 
         </mi> 
         <mo>
           , 
         </mo> 
         <mi>
           y 
         </mi> 
        </mrow> 
        <mo>
          ) 
        </mo> 
       </mrow> 
      </mrow> 
     </math>: 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <mi>
         Ω 
       </mi> 
       <mo>
         × 
       </mo> 
       <mi>
         Ω 
       </mi> 
       <mo>
         → 
       </mo> 
       <mrow> 
        <mo>
          [ 
        </mo> 
        <mrow> 
         <mn>
           0 
         </mn> 
         <mo>
           , 
         </mo> 
         <mn>
           1 
         </mn> 
        </mrow> 
        <mo>
          ] 
        </mo> 
       </mrow> 
      </mrow> 
     </math>. Relation 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mover accent="true"> 
         <mi>
           R 
         </mi> 
         <mo>
           ˜ 
         </mo> 
        </mover> 
        <mi>
          G 
        </mi> 
       </msub> 
      </mrow> 
     </math> will be termed generation relation. For subset 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mi>
        X 
      </mi> 
     </math>, 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <mi>
         X 
       </mi> 
       <mo>
         ⊂ 
       </mo> 
       <mi>
         Ω 
       </mi> 
      </mrow> 
     </math> we denote the function of generation in the form</p>
    <p>
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <mi>
         G 
       </mi> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mi>
          X 
        </mi> 
        <mo>
          ) 
        </mo> 
       </mrow> 
       <mo>
         = 
       </mo> 
       <mi>
         X 
       </mi> 
       <mo>
         ∪ 
       </mo> 
       <msub> 
        <mi>
          G 
        </mi> 
        <mi>
          H 
        </mi> 
       </msub> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mi>
          X 
        </mi> 
        <mo>
          ) 
        </mo> 
       </mrow> 
      </mrow> 
     </math> (11)</p>
    <p>
     <math display="inline" xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          G 
        </mi> 
        <mi>
          H 
        </mi> 
       </msub> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mi>
          X 
        </mi> 
        <mo>
          ) 
        </mo> 
       </mrow> 
       <mo>
         = 
       </mo> 
       <mrow> 
        <mo>
          { 
        </mo> 
        <mrow> 
         <mi>
           y 
         </mi> 
         <mo>
           ∈ 
         </mo> 
         <mi>
           Ω 
         </mi> 
         <mo>
           | 
         </mo> 
         <mo>
           ∃ 
         </mo> 
         <mi>
           x 
         </mi> 
         <mo>
           ∈ 
         </mo> 
         <mi>
           X 
         </mi> 
         <mo>
           , 
         </mo> 
         <mi>
           y 
         </mi> 
         <msub> 
          <mover accent="true"> 
           <mi>
             R 
           </mi> 
           <mo>
             ˜ 
           </mo> 
          </mover> 
          <mi>
            G 
          </mi> 
         </msub> 
         <mi>
           x 
         </mi> 
         <mo>
           , 
         </mo> 
         <msub> 
          <mi>
            μ 
          </mi> 
          <mrow> 
           <msub> 
            <mover accent="true"> 
             <mi>
               R 
             </mi> 
             <mo>
               ˜ 
             </mo> 
            </mover> 
            <mi>
              G 
            </mi> 
           </msub> 
          </mrow> 
         </msub> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <mi>
             x 
           </mi> 
           <mo>
             , 
           </mo> 
           <mi>
             y 
           </mi> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
         <mo>
           &gt; 
         </mo> 
         <mn>
           0 
         </mn> 
        </mrow> 
        <mo>
          } 
        </mo> 
       </mrow> 
      </mrow> 
     </math> (12)</p>
    <p>We shall assume that set 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <mi>
         G 
       </mi> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mi>
          X 
        </mi> 
        <mo>
          ) 
        </mo> 
       </mrow> 
      </mrow> 
     </math> contains the concrete number of elements—N<sub>E</sub>.</p>
    <p>The algorithm to search 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mover accent="true"> 
         <mi>
           R 
         </mi> 
         <mo>
           ˜ 
         </mo> 
        </mover> 
        <mi>
          S 
        </mi> 
       </msub> 
      </mrow> 
     </math>-optimal solution can be represented as</p>
    <p>
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          X 
        </mi> 
        <mi>
          k 
        </mi> 
       </msub> 
       <mo>
         = 
       </mo> 
       <mi>
         S 
       </mi> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mrow> 
         <mi>
           G 
         </mi> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <msub> 
            <mi>
              X 
            </mi> 
            <mrow> 
             <mi>
               k 
             </mi> 
             <mo>
               − 
             </mo> 
             <mn>
               1 
             </mn> 
            </mrow> 
           </msub> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
        </mrow> 
        <mo>
          ) 
        </mo> 
       </mrow> 
       <mo>
         , 
       </mo> 
       <mi>
         k 
       </mi> 
       <mo>
         = 
       </mo> 
       <mn>
         1 
       </mn> 
       <mo>
         , 
       </mo> 
       <mn>
         2 
       </mn> 
       <mo>
         , 
       </mo> 
       <mo>
         ⋯ 
       </mo> 
      </mrow> 
     </math> (13)</p>
    <p>The iterate algorithm (13) is the general form of evolutionary search.</p>
    <p>According to <xref ref-type="bibr" rid="scirp.142639-34">
      [34]
     </xref> <xref ref-type="bibr" rid="scirp.142639-35">
      [35]
     </xref> we will consider the decomposition</p>
    <p>
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          X 
        </mi> 
        <mi>
          k 
        </mi> 
       </msub> 
       <mo>
         = 
       </mo> 
       <mstyle displaystyle="true"> 
        <munderover> 
         <mo>
           ∪ 
         </mo> 
         <mrow> 
          <mi>
            j 
          </mi> 
          <mo>
            = 
          </mo> 
          <mn>
            1 
          </mn> 
         </mrow> 
         <mrow> 
          <msub> 
           <mi>
             N 
           </mi> 
           <mi>
             B 
           </mi> 
          </msub> 
         </mrow> 
        </munderover> 
        <mrow> 
         <msub> 
          <mi>
            X 
          </mi> 
          <mrow> 
           <mi>
             j 
           </mi> 
           <mi>
             k 
           </mi> 
          </mrow> 
         </msub> 
        </mrow> 
       </mstyle> 
       <mo>
         , 
       </mo> 
       <msub> 
        <mi>
          X 
        </mi> 
        <mrow> 
         <mi>
           i 
         </mi> 
         <mi>
           k 
         </mi> 
        </mrow> 
       </msub> 
       <mo>
         ∩ 
       </mo> 
       <msub> 
        <mi>
          X 
        </mi> 
        <mrow> 
         <mi>
           j 
         </mi> 
         <mi>
           k 
         </mi> 
        </mrow> 
       </msub> 
       <mo>
         = 
       </mo> 
       <mo>
         ∅ 
       </mo> 
      </mrow> 
     </math> (14)</p>
    <p>The algorithm (13) takes the form</p>
    <p>
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          X 
        </mi> 
        <mrow> 
         <mi>
           j 
         </mi> 
         <mi>
           k 
         </mi> 
        </mrow> 
       </msub> 
       <mo>
         = 
       </mo> 
       <mi>
         S 
       </mi> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mrow> 
         <mi>
           G 
         </mi> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <msub> 
            <mi>
              X 
            </mi> 
            <mrow> 
             <mi>
               j 
             </mi> 
             <mi>
               k 
             </mi> 
             <mo>
               − 
             </mo> 
             <mn>
               1 
             </mn> 
            </mrow> 
           </msub> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
        </mrow> 
        <mo>
          ) 
        </mo> 
       </mrow> 
       <mo>
         , 
       </mo> 
       <mi>
         k 
       </mi> 
       <mo>
         = 
       </mo> 
       <mn>
         1 
       </mn> 
       <mo>
         , 
       </mo> 
       <mn>
         2 
       </mn> 
       <mo>
         , 
       </mo> 
       <mo>
         ⋯ 
       </mo> 
       <mo>
         ; 
       </mo> 
       <mi>
         j 
       </mi> 
       <mo>
         = 
       </mo> 
       <mn>
         1 
       </mn> 
       <mo>
         , 
       </mo> 
       <mn>
         2 
       </mn> 
       <mo>
         , 
       </mo> 
       <mo>
         ⋯ 
       </mo> 
       <mo>
         , 
       </mo> 
       <msub> 
        <mi>
          N 
        </mi> 
        <mi>
          B 
        </mi> 
       </msub> 
      </mrow> 
     </math> (15)</p>
    <p>These iterate algorithms (13), (15) are the general form of evolutionary search.</p>
    <p>The evolutionary search algorithm converges to the most preferred solution of choice relation. This position has been theoretically and experimentally proven for clear choice relationships. For a fuzzy choice, this position is based on experimental results. Suppose that the solutions that passed the selection at some step of the iteration for all branches of the evolutionary search have the form 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <mrow> 
        <mo>
          { 
        </mo> 
        <mrow> 
         <msubsup> 
          <mi>
            x 
          </mi> 
          <mrow> 
           <mi>
             l 
           </mi> 
           <mi>
             j 
           </mi> 
          </mrow> 
          <mi>
            i 
          </mi> 
         </msubsup> 
        </mrow> 
        <mo>
          } 
        </mo> 
       </mrow> 
      </mrow> 
     </math>, where i is the number of the variable value, for the selected l-th solution 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <mi>
         l 
       </mi> 
       <mo>
         = 
       </mo> 
       <mn>
         1 
       </mn> 
       <mo>
         , 
       </mo> 
       <mo>
         ⋯ 
       </mo> 
       <mo>
         , 
       </mo> 
       <msub> 
        <mi>
          N 
        </mi> 
        <mi>
          l 
        </mi> 
       </msub> 
      </mrow> 
     </math> in the j-th branch of the search 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <mi>
         j 
       </mi> 
       <mo>
         = 
       </mo> 
       <mn>
         1 
       </mn> 
       <mo>
         , 
       </mo> 
       <mo>
         ⋯ 
       </mo> 
       <mo>
         , 
       </mo> 
       <msub> 
        <mi>
          N 
        </mi> 
        <mi>
          B 
        </mi> 
       </msub> 
      </mrow> 
     </math>. Average values for all selected solutions can be calculated as follows:</p>
    <p>
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msubsup> 
        <mi>
          x 
        </mi> 
        <mn>
          0 
        </mn> 
        <mi>
          i 
        </mi> 
       </msubsup> 
       <mo>
         = 
       </mo> 
       <mfrac> 
        <mn>
          1 
        </mn> 
        <mrow> 
         <msub> 
          <mi>
            N 
          </mi> 
          <mi>
            B 
          </mi> 
         </msub> 
         <msub> 
          <mi>
            N 
          </mi> 
          <mi>
            l 
          </mi> 
         </msub> 
        </mrow> 
       </mfrac> 
       <mstyle displaystyle="true"> 
        <munderover> 
         <mo>
           ∑ 
         </mo> 
         <mrow> 
          <mi>
            j 
          </mi> 
          <mo>
            = 
          </mo> 
          <mn>
            1 
          </mn> 
         </mrow> 
         <mrow> 
          <msub> 
           <mi>
             N 
           </mi> 
           <mi>
             B 
           </mi> 
          </msub> 
         </mrow> 
        </munderover> 
        <mrow> 
         <mstyle displaystyle="true"> 
          <munderover> 
           <mo>
             ∑ 
           </mo> 
           <mrow> 
            <mi>
              l 
            </mi> 
            <mo>
              = 
            </mo> 
            <mn>
              1 
            </mn> 
           </mrow> 
           <mrow> 
            <msub> 
             <mi>
               N 
             </mi> 
             <mi>
               l 
             </mi> 
            </msub> 
           </mrow> 
          </munderover> 
          <mrow> 
           <msubsup> 
            <mi>
              x 
            </mi> 
            <mrow> 
             <mi>
               l 
             </mi> 
             <mi>
               j 
             </mi> 
            </mrow> 
            <mi>
              i 
            </mi> 
           </msubsup> 
          </mrow> 
         </mstyle> 
        </mrow> 
       </mstyle> 
      </mrow> 
     </math> (16)</p>
    <p>At the same time, the values of the empirical dispersion will be</p>
    <p>
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msubsup> 
        <mi>
          σ 
        </mi> 
        <mi>
          і 
        </mi> 
        <mn>
          2 
        </mn> 
       </msubsup> 
       <mo>
         = 
       </mo> 
       <mfrac> 
        <mn>
          1 
        </mn> 
        <mrow> 
         <msub> 
          <mi>
            N 
          </mi> 
          <mi>
            В 
          </mi> 
         </msub> 
         <msub> 
          <mi>
            N 
          </mi> 
          <mi>
            l 
          </mi> 
         </msub> 
         <mo>
           − 
         </mo> 
         <mn>
           1 
         </mn> 
        </mrow> 
       </mfrac> 
       <mstyle displaystyle="true"> 
        <munderover> 
         <mo>
           ∑ 
         </mo> 
         <mrow> 
          <mi>
            j 
          </mi> 
          <mo>
            = 
          </mo> 
          <mn>
            1 
          </mn> 
         </mrow> 
         <mrow> 
          <msub> 
           <mi>
             N 
           </mi> 
           <mi>
             В 
           </mi> 
          </msub> 
         </mrow> 
        </munderover> 
        <mrow> 
         <mstyle displaystyle="true"> 
          <munderover> 
           <mo>
             ∑ 
           </mo> 
           <mrow> 
            <mi>
              l 
            </mi> 
            <mo>
              = 
            </mo> 
            <mn>
              1 
            </mn> 
           </mrow> 
           <mrow> 
            <msub> 
             <mi>
               N 
             </mi> 
             <mi>
               l 
             </mi> 
            </msub> 
           </mrow> 
          </munderover> 
          <mrow> 
           <msup> 
            <mrow> 
             <mrow> 
              <mo>
                ( 
              </mo> 
              <mrow> 
               <msubsup> 
                <mi>
                  x 
                </mi> 
                <mrow> 
                 <mi>
                   l 
                 </mi> 
                 <mi>
                   j 
                 </mi> 
                </mrow> 
                <mi>
                  i 
                </mi> 
               </msubsup> 
               <mo>
                 − 
               </mo> 
               <msubsup> 
                <mi>
                  x 
                </mi> 
                <mn>
                  0 
                </mn> 
                <mi>
                  i 
                </mi> 
               </msubsup> 
              </mrow> 
              <mo>
                ) 
              </mo> 
             </mrow> 
            </mrow> 
            <mn>
              2 
            </mn> 
           </msup> 
          </mrow> 
         </mstyle> 
        </mrow> 
       </mstyle> 
      </mrow> 
     </math> (17)</p>
    <p>The generation of new solutions at the next step of the iteration is performed with a normal distribution for each.</p>
    <p>Parameter 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msup> 
        <mi>
          x 
        </mi> 
        <mi>
          i 
        </mi> 
       </msup> 
      </mrow> 
     </math> and centers in 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msubsup> 
        <mi>
          x 
        </mi> 
        <mrow> 
         <mi>
           l 
         </mi> 
         <mi>
           j 
         </mi> 
        </mrow> 
        <mi>
          i 
        </mi> 
       </msubsup> 
       <mo>
         , 
       </mo> 
       <mi>
         j 
       </mi> 
       <mo>
         = 
       </mo> 
       <mn>
         1 
       </mn> 
       <mo>
         , 
       </mo> 
       <mo>
         ⋯ 
       </mo> 
       <mo>
         , 
       </mo> 
       <msub> 
        <mi>
          N 
        </mi> 
        <mi>
          B 
        </mi> 
       </msub> 
      </mrow> 
     </math>, and variance 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msubsup> 
        <mi>
          σ 
        </mi> 
        <mi>
          i 
        </mi> 
        <mn>
          2 
        </mn> 
       </msubsup> 
      </mrow> 
     </math>. That is, the membership function 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          μ 
        </mi> 
        <mrow> 
         <msub> 
          <mi>
            R 
          </mi> 
          <mi>
            G 
          </mi> 
         </msub> 
        </mrow> 
       </msub> 
      </mrow> 
     </math> for the fuzzy generation relation is the density function of the normal distribution:</p>
    <p>
     <math display="inline" xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          μ 
        </mi> 
        <mrow> 
         <msub> 
          <mi>
            R 
          </mi> 
          <mi>
            G 
          </mi> 
         </msub> 
        </mrow> 
       </msub> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mrow> 
         <msup> 
          <mi>
            y 
          </mi> 
          <mi>
            i 
          </mi> 
         </msup> 
         <mo>
           , 
         </mo> 
         <msup> 
          <mi>
            x 
          </mi> 
          <mi>
            i 
          </mi> 
         </msup> 
        </mrow> 
        <mo>
          ) 
        </mo> 
       </mrow> 
       <mo>
         = 
       </mo> 
       <mfrac> 
        <mn>
          1 
        </mn> 
        <mrow> 
         <msub> 
          <mi>
            σ 
          </mi> 
          <mi>
            i 
          </mi> 
         </msub> 
         <msqrt> 
          <mrow> 
           <mn>
             2 
           </mn> 
           <mi>
             π 
           </mi> 
          </mrow> 
         </msqrt> 
        </mrow> 
       </mfrac> 
       <mi>
         exp 
       </mi> 
       <mrow> 
        <mo>
          [ 
        </mo> 
        <mrow> 
         <mo>
           − 
         </mo> 
         <mfrac> 
          <mn>
            1 
          </mn> 
          <mn>
            2 
          </mn> 
         </mfrac> 
         <msup> 
          <mrow> 
           <mrow> 
            <mo>
              ( 
            </mo> 
            <mrow> 
             <mfrac> 
              <mrow> 
               <msup> 
                <mi>
                  y 
                </mi> 
                <mi>
                  i 
                </mi> 
               </msup> 
               <mo>
                 − 
               </mo> 
               <msup> 
                <mi>
                  x 
                </mi> 
                <mi>
                  i 
                </mi> 
               </msup> 
              </mrow> 
              <mrow> 
               <msub> 
                <mi>
                  σ 
                </mi> 
                <mi>
                  i 
                </mi> 
               </msub> 
              </mrow> 
             </mfrac> 
            </mrow> 
            <mo>
              ) 
            </mo> 
           </mrow> 
          </mrow> 
          <mn>
            2 
          </mn> 
         </msup> 
        </mrow> 
        <mo>
          ] 
        </mo> 
       </mrow> 
      </mrow> 
     </math> (18)</p>
   </sec>
  </sec><sec id="s4">
   <title>4. Results</title>
   <sec id="s4_1">
    <title>4.1. Isolation of Experimental Data for the Minimum Power of a Tubular Heater</title>
    <p>The experimental data for the minimum power of a tubular heater was presented in <xref ref-type="table" rid="table1">
      Table 1
     </xref>.</p>
    <table-wrap id="table1">
     <label>
      <xref ref-type="table" rid="table1">
       Table 1
      </xref></label>
     <caption>
      <title>
       <xref ref-type="bibr" rid="scirp.142639-"></xref>Table 1. Experimental data for the minimum power of a tubular heater.</title>
     </caption>
     <table class="MsoTableGrid custom-table" border="0" cellspacing="0" cellpadding="0"> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">№</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">W</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>A</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>CO</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>NOx</sub></p></td> 
      </tr> 
      <tr> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center"></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">kW</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">g/min</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
      </tr> 
      <tr> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">1</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">201</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">2.7</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">6.4</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">3.57</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">2765</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">89</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">168</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4.1</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">9</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">7</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2902</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">134</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">215</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.2</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4.7</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1.6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1429</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">146</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">178</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5.3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1.8</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">812</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">201</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">167</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.8</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.7</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2148</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">160</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">155</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1.7</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">722</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">265</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">7</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">127</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">8.2</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1.9</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1099</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">134</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">8</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">123</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">9</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">450</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">188</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">9</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">210</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.75</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3.9</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1.3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2926</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">161</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">10</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">175</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4.1</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">9</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3.4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">6663</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">56</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">11</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">172</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4.3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">7.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5.6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2845</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">148</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">12</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">152</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.2</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1826</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">116</p></td> 
      </tr> 
     </table>
    </table-wrap>
    <p>All experimental data of <xref ref-type="table" rid="table1">
      Table 1
     </xref> are divided into two arrays—training and test data, <xref ref-type="table" rid="table2">
      Table 2
     </xref> and <xref ref-type="table" rid="table3">
      Table 3
     </xref>.</p>
    <table-wrap id="table2">
     <label>
      <xref ref-type="table" rid="table2">
       Table 2
      </xref></label>
     <caption>
      <title>
       <xref ref-type="bibr" rid="scirp.142639-"></xref>Table 2. The experimental data for the minimum power of a tubular heater—training sequence.</title>
     </caption>
     <table class="MsoTableGrid custom-table" border="0" cellspacing="0" cellpadding="0"> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">№</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">W</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>A</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>CO</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>NOx</sub></p></td> 
      </tr> 
      <tr> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center"></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">kW</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">g/min</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
      </tr> 
      <tr> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">1</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">201</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">2.7</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">6.4</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">3.57</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">2765</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">89</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">215</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.2</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4.7</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1.6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1429</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">146</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">178</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5.3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1.8</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">812</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">201</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">123</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">9</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">450</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">188</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">210</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.75</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3.9</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1.3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2926</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">161</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">175</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4.1</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">9</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3.4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">6663</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">56</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">7</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">172</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4.3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">7.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5.6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2845</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">148</p></td> 
      </tr> 
     </table>
    </table-wrap>
    <table-wrap id="table3">
     <label>
      <xref ref-type="table" rid="table3">
       Table 3
      </xref></label>
     <caption>
      <title>
       <xref ref-type="bibr" rid="scirp.142639-"></xref>Table 3. The experimental data for the minimum power of a tubular heater—test sequence.</title>
     </caption>
     <table class="MsoTableGrid custom-table" border="0" cellspacing="0" cellpadding="0"> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">№</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">W</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>A</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>CO</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>NOx</sub></p></td> 
      </tr> 
      <tr> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center"></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">kW</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">g/min</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
      </tr> 
      <tr> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">1</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">168</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">4.1</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">9</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">7</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">2902</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">134</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">167</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.8</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.7</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2148</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">160</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">155</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1.7</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">722</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">265</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">127</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">8.2</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1.9</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1099</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">134</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">152</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.2</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1826</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">116</p></td> 
      </tr> 
     </table>
    </table-wrap>
   </sec>
   <sec id="s4_2">
    <title>4.2. Isolation of Experimental Data for the Average Power of a Tubular Heater</title>
    <p>The experimental data for the average power of a tubular heater is presented in <xref ref-type="table" rid="table4">
      Table 4
     </xref>.</p>
    <table-wrap id="table4">
     <label>
      <xref ref-type="table" rid="table4">
       Table 4
      </xref></label>
     <caption>
      <title>
       <xref ref-type="bibr" rid="scirp.142639-"></xref>Table 4. Experimental data for the average power of a tubular heater.</title>
     </caption>
     <table class="MsoTableGrid custom-table" border="0" cellspacing="0" cellpadding="0"> 
      <tr> 
       <td class="acenter" width="11.11%"><p style="text-align:center">№</p></td> 
       <td class="custom-bottom-td acenter" width="11.11%"><p style="text-align:center">S</p></td> 
       <td class="custom-bottom-td acenter" width="11.11%"><p style="text-align:center">S<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.11%"><p style="text-align:center">L</p></td> 
       <td class="custom-bottom-td acenter" width="11.11%"><p style="text-align:center">L<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.11%"><p style="text-align:center">W</p></td> 
       <td class="custom-bottom-td acenter" width="11.11%"><p style="text-align:center">Y<sub>A</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.11%"><p style="text-align:center">Y<sub>CO</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.11%"><p style="text-align:center">Y<sub>NOx</sub></p></td> 
      </tr> 
      <tr> 
       <td class="custom-bottom-td acenter" width="11.11%"><p style="text-align:center"></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.11%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.11%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.11%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.11%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.11%"><p style="text-align:center">kW</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.11%"><p style="text-align:center">g/min</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.11%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.11%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
      </tr> 
      <tr> 
       <td class="custom-top-td acenter" width="11.11%"><p style="text-align:center">1</p></td> 
       <td class="custom-top-td acenter" width="11.11%"><p style="text-align:center">0.01</p></td> 
       <td class="custom-top-td acenter" width="11.11%"><p style="text-align:center">0.00643</p></td> 
       <td class="custom-top-td acenter" width="11.11%"><p style="text-align:center">633.6</p></td> 
       <td class="custom-top-td acenter" width="11.11%"><p style="text-align:center">46.8</p></td> 
       <td class="custom-top-td acenter" width="11.11%"><p style="text-align:center">18</p></td> 
       <td class="custom-top-td acenter" width="11.11%"><p style="text-align:center">0.21</p></td> 
       <td class="custom-top-td acenter" width="11.11%"><p style="text-align:center">4500</p></td> 
       <td class="custom-top-td acenter" width="11.11%"><p style="text-align:center">257</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.11%"><p style="text-align:center">2</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">165</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">4.3</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">18</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">10</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">7214</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">109</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.11%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">151</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">5.1</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">18</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">7</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">7844</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">125</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.11%"><p style="text-align:center">4</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">201</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">2.8</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">11.3</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">4.9</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">1311</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">193</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.11%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">182</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">3.9</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">12.8</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">3.6</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">779</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">212</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.11%"><p style="text-align:center">6</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">150</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">3.5</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">11.2</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">2.8</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">617</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">259</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.11%"><p style="text-align:center">7</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">140</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">4</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">18</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">5.4</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">1144</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">240</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.11%"><p style="text-align:center">8</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">111</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">3.4</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">11.3</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">1.9</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">246</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">151</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.11%"><p style="text-align:center">9</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">105</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">3.8</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">15</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">438</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">190</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.11%"><p style="text-align:center">10</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">97</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">4.1</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">15</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">4.8</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">1225</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">238</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.11%"><p style="text-align:center">11</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">80</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">6.5</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">18</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">10.8</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">945</p></td> 
       <td class="acenter" width="11.11%"><p style="text-align:center">217</p></td> 
      </tr> 
     </table>
    </table-wrap>
    <p>All experimental data in <xref ref-type="table" rid="table4">
      Table 4
     </xref> was divided into two arrays—training and test data, <xref ref-type="table" rid="table5">
      Table 5
     </xref> and <xref ref-type="table" rid="table6">
      Table 6
     </xref>.</p>
    <table-wrap id="table5">
     <label>
      <xref ref-type="table" rid="table5">
       Table 5
      </xref></label>
     <caption>
      <title>
       <xref ref-type="bibr" rid="scirp.142639-"></xref>Table 5. Experimental data for the average power of a tubular heater—the training sequence.</title>
     </caption>
     <table class="MsoTableGrid custom-table" border="0" cellspacing="0" cellpadding="0"> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">№</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">W</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>A</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>CO</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>NOx</sub></p></td> 
      </tr> 
      <tr> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center"></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">kW</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">g/min</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
      </tr> 
      <tr> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">1</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.01</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.00643</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">633.6</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">46.8</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">18</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.21</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">4500</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">257</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">151</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5.1</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">18</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">7</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">7844</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">125</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">201</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.8</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">11.3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4.9</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1311</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">193</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">182</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3.9</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">12.8</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3.6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">779</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">212</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">111</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3.4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">11.3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1.9</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">246</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">151</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">80</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">6.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">18</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">10.8</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">945</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">217</p></td> 
      </tr> 
     </table>
    </table-wrap>
    <table-wrap id="table6">
     <label>
      <xref ref-type="table" rid="table6">
       Table 6
      </xref></label>
     <caption>
      <title>
       <xref ref-type="bibr" rid="scirp.142639-"></xref>Table 6. Experimental data for the average power of a tubular heater—the test sequence.</title>
     </caption>
     <table class="MsoTableGrid custom-table" border="0" cellspacing="0" cellpadding="0"> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">№</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">W</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>A</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>CO</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>NOx</sub></p></td> 
      </tr> 
      <tr> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center"></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">kW</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">g/min</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
      </tr> 
      <tr> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">1</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">165</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">4.3</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">18</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">10</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">7214</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">109</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">150</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">11.2</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.8</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">617</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">259</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">140</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">18</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5.4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1144</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">240</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">105</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3.8</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">15</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">438</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">190</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">97</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4.1</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">15</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4.8</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1225</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">238</p></td> 
      </tr> 
     </table>
    </table-wrap>
   </sec>
   <sec id="s4_3">
    <title>4.3. Isolation of Experimental Data for the Maximum Power of a Tubular Heater</title>
    <p>The experimental data for the maximum power of a tubular heater was presented in <xref ref-type="table" rid="table7">
      Table 7
     </xref>.</p>
    <table-wrap id="table7">
     <label>
      <xref ref-type="table" rid="table7">
       Table 7
      </xref></label>
     <caption>
      <title>
       <xref ref-type="bibr" rid="scirp.142639-"></xref>Table 7. Experimental data for the maximum power of a tubular heater.</title>
     </caption>
     <table class="MsoTableGrid custom-table" border="0" cellspacing="0" cellpadding="0"> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">№</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">W</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>A</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>CO</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>NOx</sub></p></td> 
      </tr> 
      <tr> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center"></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">kW</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">g/min</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
      </tr> 
      <tr> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">1</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.005</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.00286</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">572.4</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">25.2</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">33.5</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">2.1</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">510</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">293</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.005</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00286</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">543.6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">23.4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">31.3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.88</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">6734</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">207</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.005</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00286</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">543.6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">21.6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">54.7</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.77</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">43</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">259</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.01</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00643</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">651.6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">54</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">32</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.47</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">694</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">205</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.01</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00643</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">684</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">50.4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">35.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">110</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">230</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">196</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">10</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1019</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">210</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">7</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">136</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">22.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">10.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">853</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">257</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">8</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">128</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">7</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">22.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">11.3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">783</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">261</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">9</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">85</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">22.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">10.3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">830</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">203</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">10</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">168</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5.1</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">18</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">35</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1986</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">131</p></td> 
      </tr> 
     </table>
    </table-wrap>
    <p>All experimental data in <xref ref-type="table" rid="table7">
      Table 7
     </xref> was divided into two arrays—training and test data, <xref ref-type="table" rid="table8">
      Table 8
     </xref> and <xref ref-type="table" rid="table9">
      Table 9
     </xref>.</p>
    <table-wrap id="table8">
     <label>
      <xref ref-type="table" rid="table8">
       Table 8
      </xref></label>
     <caption>
      <title>
       <xref ref-type="bibr" rid="scirp.142639-"></xref>Table 8. Experimental data for the maximum power of a tubular heater—the training sequence.</title>
     </caption>
     <table class="MsoTableGrid custom-table" border="0" cellspacing="0" cellpadding="0"> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">№</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">W</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>A</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>CO</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>NOx</sub></p></td> 
      </tr> 
      <tr> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center"></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">kW</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">g/min</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
      </tr> 
      <tr> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">1</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.005</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.00286</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">572.4</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">25.2</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">33.5</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">2.1</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">510</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">293</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.005</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00286</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">543.6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">23.4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">31.3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.88</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">6734</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">207</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.005</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00286</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">543.6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">21.6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">54.7</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2.77</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">43</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">259</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">196</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">10</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1019</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">210</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">136</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">22.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">10.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">853</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">257</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">6</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">128</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">7</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">22.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">11.3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">783</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">261</p></td> 
      </tr> 
     </table>
    </table-wrap>
    <table-wrap id="table9">
     <label>
      <xref ref-type="table" rid="table9">
       Table 9
      </xref></label>
     <caption>
      <title>
       <xref ref-type="bibr" rid="scirp.142639-"></xref>Table 9. Experimental data for the maximum power of a tubular heater—the test sequence.</title>
     </caption>
     <table class="MsoTableGrid custom-table" border="0" cellspacing="0" cellpadding="0"> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">№</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">S<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">L<sub>P</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">W</p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>A</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>CO</sub></p></td> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center">Y<sub>NOx</sub></p></td> 
      </tr> 
      <tr> 
       <td class="custom-bottom-td acenter" width="11.76%"><p style="text-align:center"></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>2</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">m<sup>3</sup>/h</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">kW</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">g/min</p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
       <td class="custom-bottom-td custom-top-td acenter" width="11.76%"><p style="text-align:center">mg/m<sup>3</sup></p></td> 
      </tr> 
      <tr> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">1</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.01</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.00643</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">651.6</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">54</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">32</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">0.47</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">694</p></td> 
       <td class="custom-top-td acenter" width="11.76%"><p style="text-align:center">205</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">2</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.01</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00643</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">684</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">50.4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">35.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">110</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">230</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">85</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">22.5</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">10.3</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">830</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">203</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="11.76%"><p style="text-align:center">4</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.0025</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">0.00021</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">168</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">5.1</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">18</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">35</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">1986</p></td> 
       <td class="acenter" width="11.76%"><p style="text-align:center">131</p></td> 
      </tr> 
     </table>
    </table-wrap>
   </sec>
   <sec id="s4_4">
    <title>4.4. Expert Evaluation the Rating Scale</title>
    <p>For expert evaluation the rating scale was used 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          b 
        </mi> 
        <mrow> 
         <mi>
           i 
         </mi> 
         <mi>
           j 
         </mi> 
        </mrow> 
       </msub> 
       <mo>
         = 
       </mo> 
       <mrow> 
        <mo>
          { 
        </mo> 
        <mrow> 
         <mn>
           0 
         </mn> 
         <mo>
           ; 
         </mo> 
         <mn>
           0.3 
         </mn> 
         <mo>
           ; 
         </mo> 
         <mn>
           0.4 
         </mn> 
         <mo>
           ; 
         </mo> 
         <mn>
           0.5 
         </mn> 
         <mo>
           ; 
         </mo> 
         <mn>
           0.6 
         </mn> 
         <mo>
           ; 
         </mo> 
         <mn>
           0.7 
         </mn> 
         <mo>
           ; 
         </mo> 
         <mn>
           1.0 
         </mn> 
        </mrow> 
        <mo>
          } 
        </mo> 
       </mrow> 
      </mrow> 
     </math>; which make sense: {much worse; worse; slightly worse; comparable; slightly better; better; much better}. Two sets were identified for expert evaluation: 1) training sequence array, 2) testing sequence array. These heater comparison matrices are presented below</p>
    <p>Comparison matrix for minimum power heaters training sequence array</p>
    <p>0.5, 0.4, 0.2, 0.1, 0.5, 0.8, 0.5</p>
    <p>0.6, 0.5, 0.3, 0.1, 0.7, 0.8, 0.6</p>
    <p>0.8, 0.7, 0.5, 0.3, 0.7, 0.8, 0.7</p>
    <p>0.9, 0.9, 0.7, 0.5, 0.9, 1.0, 0.9</p>
    <p>0.5, 0.3, 0.3, 0.1, 0.5, 0.8, 0.5</p>
    <p>0.2, 0.2, 0.2, 0.0, 0.2, 0.5, 0.2</p>
    <p>0.5, 0.4, 0.3, 0.1, 0.5, 0.8, 0.5</p>
    <p>Comparison matrix for minimum power heaters testing sequence array</p>
    <p>0.5, 0.6, 0.3, 0.3, 0.4</p>
    <p>0.4, 0.5, 0.3, 0.3, 0.4</p>
    <p>0.7, 0.7, 0.5, 0.4, 0.5</p>
    <p>0.7, 0.7, 0.6, 0.5, 0.6</p>
    <p>0.6, 0.6, 0.5, 0.4, 0.5</p>
    <p>Comparison matrix for average power heaters training sequence array</p>
    <p>0.5, 0.7, 0.4, 0.3, 0.2, 0.3</p>
    <p>0.3, 0.5, 0.3, 0.2, 0.1, 0.2</p>
    <p>0.6, 0.7, 0.5, 0.4, 0.2, 0.4</p>
    <p>0.7, 0.8, 0.6, 0.5, 0.3, 0.6</p>
    <p>0.8, 0.9, 0.8, 0.7, 0.5, 0.7</p>
    <p>0.7, 0.8, 0.6, 0.4, 0.3, 0.5</p>
    <p>Comparison matrix for average power heaters testing sequence array</p>
    <p>0.5, 0.3, 0.4, 0.3, 0.4</p>
    <p>0.7, 0.5, 0.6, 0.3, 0.6</p>
    <p>0.6, 0.4, 0.5, 0.3, 0.5</p>
    <p>0.7, 0.7, 0.7, 0.5, 0.7</p>
    <p>0.6, 0.4, 0.5, 0.3, 0.5</p>
    <p>Comparison matrix for maximum power heaters training sequence array</p>
    <p>0.5, 0.7, 0.2, 0.5, 0.5, 0.5</p>
    <p>0.3, 0.5, 0.1, 0.3, 0.3, 0.3</p>
    <p>0.8, 0.9, 0.5, 0.8, 0.8, 0.8</p>
    <p>0.5, 0.7, 0.2, 0.5, 0.5, 0.5</p>
    <p>0.5, 0.7, 0.2, 0.5, 0.5, 0.5</p>
    <p>0.5, 0.7, 0.2, 0.5, 0.5, 0.5</p>
    <p>Comparison matrix for maximum power heaters testing sequence array</p>
    <p>0.5, 0.1, 0.5, 0.6</p>
    <p>0.9, 0.5, 0.9, 0.9</p>
    <p>0.5, 0.1, 0.5, 0.6</p>
    <p>0.4, 0.1, 0.4, 0.5</p>
   </sec>
   <sec id="s4_5">
    <title>4.5. Results for Choice Functions</title>
    <p>There are presented results with choice function in the form (19)-(21).</p>
    <p>
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
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         Γ 
       </mi> 
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          <mn>
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         </mrow> 
         <mn>
           5 
         </mn> 
        </msubsup> 
        <mrow> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <mn>
             1 
           </mn> 
           <mo>
             + 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <msup> 
            <mrow> 
             <mrow> 
              <mo>
                ( 
              </mo> 
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                <mrow> 
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                 </mn> 
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                 − 
               </mo> 
               <msub> 
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                </mi> 
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              </mrow> 
              <mo>
                ) 
              </mo> 
             </mrow> 
            </mrow> 
            <mn>
              2 
            </mn> 
           </msup> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
        </mrow> 
       </mstyle> 
      </mrow> 
     </math> (19)</p>
    <p>
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
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      </mrow> 
     </math> (20)</p>
    <p>
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       <mi>
         Γ 
       </mi> 
       <mrow> 
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          ) 
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       <mo>
         ≥ 
       </mo> 
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          ) 
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       </mrow> 
       <mo>
         ≡ 
       </mo> 
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         </mi> 
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           ˜ 
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     </math> (21)</p>
    <p>Parameters 
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       </msub> 
       <mo>
         , 
       </mo> 
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     </math> were obtained after evolutionary search the choice function for array 1 of experimental data and for array 2 of experimental data. The results of evolutionary search the choice function is presented in <xref ref-type="table" rid="tableTables 10-12">
      Tables 10-12
     </xref>.</p>
    <table-wrap id="table10">
     <label>
      <xref ref-type="table" rid="table10">
       Table 10
      </xref></label>
     <caption>
      <title>
       <xref ref-type="bibr" rid="scirp.142639-"></xref>Table 10. Parameters of the fuzzy choice function for the minimum power heater.</title>
     </caption>
     <table class="MsoTableGrid custom-table" border="0" cellspacing="0" cellpadding="0"> 
      <tr> 
       <td class="custom-bottom-td acenter" width="17.09%"><p style="text-align:center"></p></td> 
       <td class="custom-bottom-td acenter" width="17.09%"><p style="text-align:center">i</p></td> 
       <td class="custom-bottom-td acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="custom-bottom-td acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
      </tr> 
      <tr> 
       <td class="custom-top-td acenter" width="17.09%"><p style="text-align:center"> 
         <math display="inline" xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             , 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
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             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="custom-top-td acenter" width="17.09%"><p style="text-align:center">1</p></td> 
       <td class="custom-top-td acenter" width="17.09%"><p style="text-align:center">−0.3071252</p></td> 
       <td class="custom-top-td acenter" width="17.09%"><p style="text-align:center">0.8014811</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             , 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">2</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">0.1532593</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.3323147</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             , 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">0.4978446</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.6202395</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             , 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">4</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.4215357</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.01208718</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             , 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">0.003904735</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">0.3095479</p></td> 
      </tr> 
     </table>
    </table-wrap>
    <table-wrap id="table11">
     <label>
      <xref ref-type="table" rid="table11">
       Table 11
      </xref></label>
     <caption>
      <title>
       <xref ref-type="bibr" rid="scirp.142639-"></xref>Table 11. Parameters of the fuzzy choice function for the average power heater.</title>
     </caption>
     <table class="MsoTableGrid custom-table" border="0" cellspacing="0" cellpadding="0"> 
      <tr> 
       <td class="custom-bottom-td acenter" width="17.09%"><p style="text-align:center"></p></td> 
       <td class="custom-bottom-td acenter" width="17.09%"><p style="text-align:center">i</p></td> 
       <td class="custom-bottom-td acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="custom-bottom-td acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
      </tr> 
      <tr> 
       <td class="custom-top-td acenter" width="17.09%"><p style="text-align:center"> 
         <math display="inline" xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             , 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="custom-top-td acenter" width="17.09%"><p style="text-align:center">1</p></td> 
       <td class="custom-top-td acenter" width="17.09%"><p style="text-align:center">−0.3627225</p></td> 
       <td class="custom-top-td acenter" width="17.09%"><p style="text-align:center">0.2329837</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             , 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">2</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.05706916</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.3366217</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             , 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">0.3229559</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.273395</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             , 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">4</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.1807748</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.1512893</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             , 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.0007113587</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.8040671</p></td> 
      </tr> 
     </table>
    </table-wrap>
    <table-wrap id="table12">
     <label>
      <xref ref-type="table" rid="table12">
       Table 12
      </xref></label>
     <caption>
      <title>
       <xref ref-type="bibr" rid="scirp.142639-"></xref>Table 12. Parameters of the fuzzy choice function for the maximum power heater.</title>
     </caption>
     <table class="MsoTableGrid custom-table" border="0" cellspacing="0" cellpadding="0"> 
      <tr> 
       <td class="custom-bottom-td acenter" width="17.09%"><p style="text-align:center"></p></td> 
       <td class="custom-bottom-td acenter" width="17.09%"><p style="text-align:center">i</p></td> 
       <td class="custom-bottom-td acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="custom-bottom-td acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
      </tr> 
      <tr> 
       <td class="custom-top-td acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             , 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="custom-top-td acenter" width="17.09%"><p style="text-align:center">1</p></td> 
       <td class="custom-top-td acenter" width="17.09%"><p style="text-align:center">−0.4144383</p></td> 
       <td class="custom-top-td acenter" width="17.09%"><p style="text-align:center">0.1412199</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             , 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">2</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.1136156</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.1227887</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             , 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">3</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">0.2455468</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.07456189</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             , 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">4</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.07079072</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.08849594</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math display="inline" xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               1 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             , 
           </mo> 
           <msub> 
            <mi>
              a 
            </mi> 
            <mrow> 
             <mn>
               2 
             </mn> 
             <mi>
               i 
             </mi> 
            </mrow> 
           </msub> 
          </mrow> 
         </math> </p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">5</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">0.06467061</p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">−0.443341</p></td> 
      </tr> 
     </table>
    </table-wrap>
    <p>The choice function in the form (19)-(21) with specific values of parameters 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          a 
        </mi> 
        <mrow> 
         <mn>
           1 
         </mn> 
         <mi>
           i 
         </mi> 
        </mrow> 
       </msub> 
       <mo>
         , 
       </mo> 
       <msub> 
        <mi>
          a 
        </mi> 
        <mrow> 
         <mn>
           2 
         </mn> 
         <mi>
           i 
         </mi> 
        </mrow> 
       </msub> 
      </mrow> 
     </math>, 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <mi>
         i 
       </mi> 
       <mo>
         = 
       </mo> 
       <mn>
         1 
       </mn> 
       <mo>
         , 
       </mo> 
       <mo>
         ⋯ 
       </mo> 
       <mo>
         , 
       </mo> 
       <mn>
         5 
       </mn> 
      </mrow> 
     </math> was used to solve the problem of generalized mathematical programming: to find maximum of choice function</p>
    <p>
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <mi>
         max 
       </mi> 
       <mi>
         Γ 
       </mi> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mi>
          x 
        </mi> 
        <mo>
          ) 
        </mo> 
       </mrow> 
      </mrow> 
     </math> with restrictions: 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <mn>
         0.08 
       </mn> 
       <mo>
         ≤ 
       </mo> 
       <msub> 
        <mi>
          Π 
        </mi> 
        <mn>
          1 
        </mn> 
       </msub> 
       <mo>
         ≤ 
       </mo> 
       <mn>
         0.7 
       </mn> 
       <mo>
         ; 
       </mo> 
       <mn>
         0.01 
       </mn> 
       <mo>
         ≤ 
       </mo> 
       <msub> 
        <mi>
          Π 
        </mi> 
        <mn>
          2 
        </mn> 
       </msub> 
       <mo>
         ≤ 
       </mo> 
       <mn>
         0.1 
       </mn> 
       <mo>
         ; 
       </mo> 
       <mn>
         0.001 
       </mn> 
       <mo>
         ≤ 
       </mo> 
       <msub> 
        <mi>
          Π 
        </mi> 
        <mn>
          3 
        </mn> 
       </msub> 
       <mo>
         ≤ 
       </mo> 
       <mn>
         0.8 
       </mn> 
      </mrow> 
     </math>.</p>
    <p>The results of determining the maxima of the selection functions for the three heater powers are shown below (<xref ref-type="table" rid="table13">
      Table 13
     </xref>).</p>
    <table-wrap id="table13">
     <label>
      <xref ref-type="table" rid="table13">
       Table 13
      </xref></label>
     <caption>
      <title>
       <xref ref-type="bibr" rid="scirp.142639-"></xref>Table 13. Values of parameters 

       <math display="inline" xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
  
         <msub> 
   
          <mi>
           
    a
   
          </mi> 
   
          <mrow> 
    
           <mn>
            
     1
    
           </mn>
    
           <mi>
            
     i
    
           </mi>
   
          </mrow> 
  
         </msub> 
  
         <mo>
          
   ,
  
         </mo>
  
         <msub> 
   
          <mi>
           
    a
   
          </mi> 
   
          <mrow> 
    
           <mn>
            
     2
    
           </mn>
    
           <mi>
            
     i
    
           </mi>
   
          </mrow> 
  
         </msub> 
 
        </mrow>

       </math>, 

       <math display="inline" xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
  
         <mi>
          
   i
  
         </mi>
  
         <mo>
          
   =
  
         </mo>
  
         <mn>
          
   1
  
         </mn>
  
         <mo>
          
   ,
  
         </mo>
  
         <mo>
          
   ⋯
  
         </mo>
  
         <mo>
          
   ,
  
         </mo>
  
         <mn>
          
   5
  
         </mn>
 
        </mrow>

       </math> as the result of solving mathematical programming problem.</title>
     </caption>
     <table class="MsoTableGrid custom-table" border="0" cellspacing="0" cellpadding="0"> 
      <tr> 
       <td class="custom-bottom-td acenter" width="35.33%"><p style="text-align:center"></p></td> 
       <td class="custom-bottom-td acenter" width="21.56%"><p style="text-align:center">Dimensionless complex 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              Π 
            </mi> 
            <mn>
              1 
            </mn> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="custom-bottom-td acenter" width="21.56%"><p style="text-align:center">Dimensionless complex 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              Π 
            </mi> 
            <mn>
              2 
            </mn> 
           </msub> 
          </mrow> 
         </math></p></td> 
       <td class="custom-bottom-td acenter" width="21.56%"><p style="text-align:center">Dimensionless complex 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              Π 
            </mi> 
            <mn>
              3 
            </mn> 
           </msub> 
          </mrow> 
         </math></p></td> 
      </tr> 
      <tr> 
       <td class="custom-top-td acenter" width="35.33%"><p style="text-align:center">minimum power heaters</p></td> 
       <td class="custom-top-td acenter" width="21.56%"><p style="text-align:center">0.4420147</p></td> 
       <td class="custom-top-td acenter" width="21.56%"><p style="text-align:center">0.03648748</p></td> 
       <td class="custom-top-td acenter" width="21.56%"><p style="text-align:center">0.02673138</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="35.33%"><p style="text-align:center">average power heaters</p></td> 
       <td class="acenter" width="21.56%"><p style="text-align:center">0.4619097</p></td> 
       <td class="acenter" width="21.56%"><p style="text-align:center">0.04038155</p></td> 
       <td class="acenter" width="21.56%"><p style="text-align:center">0.02226561</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="35.33%"><p style="text-align:center">maximum power heaters</p></td> 
       <td class="acenter" width="21.56%"><p style="text-align:center">0.5120847</p></td> 
       <td class="acenter" width="21.56%"><p style="text-align:center">0.04504298</p></td> 
       <td class="acenter" width="21.56%"><p style="text-align:center">0.01542043</p></td> 
      </tr> 
     </table>
    </table-wrap>
    <p>For gas emission concentrations there are experimental dependencies <xref ref-type="bibr" rid="scirp.142639-6">
      [6]
     </xref> in the form (22):</p>
    <p>For CO:</p>
    <p>
     <math display="inline" xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mtext>
          П 
        </mtext> 
        <mtext>
          4 
        </mtext> 
       </msub> 
       <mo>
         = 
       </mo> 
       <msub> 
        <mi>
          b 
        </mi> 
        <mn>
          1 
        </mn> 
       </msub> 
       <mo>
         ⋅ 
       </mo> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mrow> 
         <mrow> 
          <mrow> 
           <msup> 
            <mrow> 
             <mrow> 
              <mo>
                ( 
              </mo> 
              <mrow> 
               <mn>
                 1 
               </mn> 
               <mo>
                 − 
               </mo> 
               <msubsup> 
                <mtext>
                  П 
                </mtext> 
                <mn>
                  1 
                </mn> 
                <mn>
                  2 
                </mn> 
               </msubsup> 
              </mrow> 
              <mo>
                ) 
              </mo> 
             </mrow> 
            </mrow> 
            <mrow> 
             <msub> 
              <mi>
                b 
              </mi> 
              <mn>
                2 
              </mn> 
             </msub> 
            </mrow> 
           </msup> 
          </mrow> 
          <mo>
            / 
          </mo> 
          <mrow> 
           <msup> 
            <mrow> 
             <mrow> 
              <mo>
                ( 
              </mo> 
              <mrow> 
               <mn>
                 1 
               </mn> 
               <mo>
                 − 
               </mo> 
               <msub> 
                <mtext>
                  П 
                </mtext> 
                <mtext>
                  1 
                </mtext> 
               </msub> 
               <mo>
                 ⋅ 
               </mo> 
               <msub> 
                <mtext>
                  П 
                </mtext> 
                <mtext>
                  2 
                </mtext> 
               </msub> 
              </mrow> 
              <mo>
                ) 
              </mo> 
             </mrow> 
            </mrow> 
            <mrow> 
             <msub> 
              <mi>
                b 
              </mi> 
              <mn>
                3 
              </mn> 
             </msub> 
            </mrow> 
           </msup> 
          </mrow> 
         </mrow> 
        </mrow> 
        <mo>
          ) 
        </mo> 
       </mrow> 
       <mo>
         ⋅ 
       </mo> 
       <mrow> 
        <mo>
          ( 
        </mo> 
        <mrow> 
         <msub> 
          <mi>
            b 
          </mi> 
          <mn>
            4 
          </mn> 
         </msub> 
         <mo>
           + 
         </mo> 
         <msup> 
          <mrow> 
           <mrow> 
            <mo>
              ( 
            </mo> 
            <mrow> 
             <mrow> 
              <mrow> 
               <msub> 
                <mtext>
                  П 
                </mtext> 
                <mtext>
                  3 
                </mtext> 
               </msub> 
              </mrow> 
              <mo>
                / 
              </mo> 
              <mrow> 
               <msub> 
                <mtext>
                  П 
                </mtext> 
                <mtext>
                  2 
                </mtext> 
               </msub> 
              </mrow> 
             </mrow> 
            </mrow> 
            <mo>
              ) 
            </mo> 
           </mrow> 
          </mrow> 
          <mrow> 
           <msub> 
            <mi>
              b 
            </mi> 
            <mn>
              5 
            </mn> 
           </msub> 
          </mrow> 
         </msup> 
        </mrow> 
        <mo>
          ) 
        </mo> 
       </mrow> 
      </mrow> 
     </math> (22)</p>
    <p>where: b<sub>1</sub> = 0.0256, b<sub>2</sub> = 5.945, b<sub>3</sub> = 63.4, b<sub>4</sub> =1.95, b<sub>5</sub> = 0.48.</p>
    <p>For NOx:</p>
    <p>
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mtext>
          П 
        </mtext> 
        <mtext>
          5 
        </mtext> 
       </msub> 
       <mo>
         = 
       </mo> 
       <msub> 
        <mi>
          а 
        </mi> 
        <mn>
          1 
        </mn> 
       </msub> 
       <mo>
         + 
       </mo> 
       <msub> 
        <mi>
          а 
        </mi> 
        <mn>
          2 
        </mn> 
       </msub> 
       <mo>
         ⋅ 
       </mo> 
       <msup> 
        <mrow> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <msub> 
            <mtext>
              П 
            </mtext> 
            <mtext>
              1 
            </mtext> 
           </msub> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
        </mrow> 
        <mrow> 
         <msub> 
          <mi>
            а 
          </mi> 
          <mn>
            3 
          </mn> 
         </msub> 
        </mrow> 
       </msup> 
       <mo>
         ⋅ 
       </mo> 
       <msup> 
        <mrow> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <msub> 
            <mtext>
              П 
            </mtext> 
            <mtext>
              2 
            </mtext> 
           </msub> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
        </mrow> 
        <mrow> 
         <msub> 
          <mi>
            а 
          </mi> 
          <mn>
            4 
          </mn> 
         </msub> 
        </mrow> 
       </msup> 
       <mo>
         ⋅ 
       </mo> 
       <msup> 
        <mrow> 
         <mrow> 
          <mo>
            ( 
          </mo> 
          <mrow> 
           <msub> 
            <mtext>
              П 
            </mtext> 
            <mtext>
              3 
            </mtext> 
           </msub> 
          </mrow> 
          <mo>
            ) 
          </mo> 
         </mrow> 
        </mrow> 
        <mrow> 
         <msub> 
          <mi>
            а 
          </mi> 
          <mn>
            5 
          </mn> 
         </msub> 
        </mrow> 
       </msup> 
      </mrow> 
     </math> (23)</p>
    <p>where: а<sub>1</sub> = 1.096; а<sub>2</sub> = 31.33; а<sub>3</sub> = 3.2155; а<sub>4</sub> = −01776; а<sub>5</sub> = 0.7470.</p>
    <p>Using dimensionless dependencies for harmful gases, the corresponding concentrations of harmful gases at different tube heater powers can be calculated in the form of a <xref ref-type="table" rid="table14">
      Table 14
     </xref>.</p>
    <table-wrap id="table14">
     <label>
      <xref ref-type="table" rid="table14">
       Table 14
      </xref></label>
     <caption>
      <title>
       <xref ref-type="bibr" rid="scirp.142639-"></xref>Table 14. Concentrations of gas emissions at optimum operation modes of heaters.</title>
     </caption>
     <table class="MsoTableGrid custom-table" border="0" cellspacing="0" cellpadding="0"> 
      <tr> 
       <td class="custom-bottom-td acenter" width="17.09%"><p style="text-align:center">minimum power heaters</p><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <mn>
             5 
           </mn> 
           <mtext>
               
           </mtext> 
           <mtext>
             kW 
           </mtext> 
           <mo>
             &lt; 
           </mo> 
           <mi>
             W 
           </mi> 
           <mo>
             &lt; 
           </mo> 
           <mn>
             9 
           </mn> 
           <mtext>
               
           </mtext> 
           <mtext>
             kW 
           </mtext> 
          </mrow> 
         </math></p></td> 
       <td class="custom-bottom-td acenter" width="17.09%"><p style="text-align:center">average power heaters</p><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <mn>
             9 
           </mn> 
           <mtext>
               
           </mtext> 
           <mtext>
             kW 
           </mtext> 
           <mo>
             ≤ 
           </mo> 
           <mi>
             W 
           </mi> 
           <mo>
             &lt; 
           </mo> 
           <mn>
             18 
           </mn> 
           <mtext>
               
           </mtext> 
           <mtext>
             kW 
           </mtext> 
          </mrow> 
         </math></p></td> 
       <td class="custom-bottom-td acenter" width="17.09%"><p style="text-align:center">maximum power heaters</p><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <mn>
             18 
           </mn> 
           <mtext>
               
           </mtext> 
           <mtext>
             kW 
           </mtext> 
           <mo>
             ≤ 
           </mo> 
           <mi>
             W 
           </mi> 
           <mo>
             &lt; 
           </mo> 
           <mn>
             55 
           </mn> 
           <mtext>
               
           </mtext> 
           <mtext>
             kW 
           </mtext> 
          </mrow> 
         </math></p></td> 
      </tr> 
      <tr> 
       <td class="custom-top-td acenter" width="17.09%" colspan="3"><p style="text-align:center">Optimum concentrations CO</p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              α 
            </mi> 
            <mrow> 
             <mi>
               C 
             </mi> 
             <mi>
               O 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             = 
           </mo> 
           <mn>
             0.00307 
           </mn> 
          </mrow> 
         </math></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              α 
            </mi> 
            <mrow> 
             <mi>
               C 
             </mi> 
             <mi>
               O 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             = 
           </mo> 
           <mn>
             0.003001 
           </mn> 
          </mrow> 
         </math></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              α 
            </mi> 
            <mrow> 
             <mi>
               C 
             </mi> 
             <mi>
               O 
             </mi> 
            </mrow> 
           </msub> 
           <mo>
             = 
           </mo> 
           <mn>
             0.002205 
           </mn> 
          </mrow> 
         </math></p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center">20.3 mg/m<sup>3</sup></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">20.04 mg/m<sup>3</sup></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">17.18 mg/m<sup>3</sup></p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%" colspan="3"><p style="text-align:center">Optimum concentrations NO<sub>X</sub></p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              α 
            </mi> 
            <mrow> 
             <mi>
               N 
             </mi> 
             <msub> 
              <mi>
                O 
              </mi> 
              <mi>
                X 
              </mi> 
             </msub> 
            </mrow> 
           </msub> 
           <mo>
             = 
           </mo> 
           <mn>
             1.579 
           </mn> 
          </mrow> 
         </math></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              α 
            </mi> 
            <mrow> 
             <mi>
               N 
             </mi> 
             <msub> 
              <mi>
                O 
              </mi> 
              <mi>
                X 
              </mi> 
             </msub> 
            </mrow> 
           </msub> 
           <mo>
             = 
           </mo> 
           <mn>
             1.5809 
           </mn> 
          </mrow> 
         </math></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center"> 
         <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
           <msub> 
            <mi>
              α 
            </mi> 
            <mrow> 
             <mi>
               N 
             </mi> 
             <msub> 
              <mi>
                O 
              </mi> 
              <mi>
                X 
              </mi> 
             </msub> 
            </mrow> 
           </msub> 
           <mo>
             = 
           </mo> 
           <mn>
             1.604 
           </mn> 
          </mrow> 
         </math></p></td> 
      </tr> 
      <tr> 
       <td class="acenter" width="17.09%"><p style="text-align:center">242.1 mg/m<sup>3</sup></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">242.15 mg/m<sup>3</sup></p></td> 
       <td class="acenter" width="17.09%"><p style="text-align:center">243.9 mg/m<sup>3</sup></p></td> 
      </tr> 
     </table>
    </table-wrap>
    <p>As it can be seen from the table of gas emission concentrations, at operation of heaters on all three modes of operation at selection of modes from the table of the most preferable modes the conditions for gas emissions are provided in the form of</p>
    <p>
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          α 
        </mi> 
        <mrow> 
         <mi>
           C 
         </mi> 
         <mi>
           O 
         </mi> 
        </mrow> 
       </msub> 
       <mo>
         ≤ 
       </mo> 
       <mn>
         130 
       </mn> 
       <mtext>
           
       </mtext> 
       <mrow> 
        <mrow> 
         <mtext>
           mg 
         </mtext> 
        </mrow> 
        <mo>
          / 
        </mo> 
        <mrow> 
         <msup> 
          <mtext>
            m 
          </mtext> 
          <mtext>
            3 
          </mtext> 
         </msup> 
        </mrow> 
       </mrow> 
      </mrow> 
     </math> and 
     <math xmlns="http://www.w3.org/1998/Math/MathML"> <mrow> 
       <msub> 
        <mi>
          α 
        </mi> 
        <mrow> 
         <mi>
           N 
         </mi> 
         <msub> 
          <mi>
            O 
          </mi> 
          <mi>
            X 
          </mi> 
         </msub> 
        </mrow> 
       </msub> 
       <mo>
         ≤ 
       </mo> 
       <mn>
         250 
       </mn> 
       <mtext>
           
       </mtext> 
       <mrow> 
        <mrow> 
         <mtext>
           mg 
         </mtext> 
        </mrow> 
        <mo>
          / 
        </mo> 
        <mrow> 
         <msup> 
          <mtext>
            m 
          </mtext> 
          <mtext>
            3 
          </mtext> 
         </msup> 
        </mrow> 
       </mrow> 
      </mrow> 
     </math> (24)</p>
    <p>Such conditions correspond, in particular, to the current Ukrainian requirements for natural gas combustion. Therefore, providing such conditions for combustion of wood pellets in tubular gas heaters should be considered quite acceptable.</p>
   </sec>
  </sec><sec id="s5">
   <title>5. Discussion and Conclusions</title>
   <p>Three power modes of wood pellet fired tubular gas heaters (minimum power, medium power and maximum power) were determined based on the results of the experiments. The experiments showed that significant gas emission values were observed in each of the modes and it was not possible to minimise CO and NOx emissions simultaneously. The challenge was to find compromise solutions for all modes of heater operation that would provide the most preferred favourable gas emission values. Using fuzzy expert judgements of heater performance, the experimental modes were compared with each other in the form of a matching matrix. Using evolutionary search, fuzzy choice functions were obtained for the three modes of heater operation. For each fuzzy choice function, maxima were found on the entire set of possible parameters, not only on the set of experiments. The obtained dimensionless criteria at the points of maxima give the most favourable values for decision making in all three modes. At the same time, as shown by the final analysis, these modes ensure the operation of tubular gas heaters on pellets at quite acceptable gas emissions. The obtained results can be used to construct a three-stage control of the heater operation mode. To use the fuzzy selection procedure, which takes into account various aspects of the decisions to be made, it is advisable to construct several fuzzy selection functions and then solve a multi-criteria optimisation problem. For its formulation it is also convenient to use binary choice relations.</p>
   <p>The use of matrices for pairwise comparisons of objects is a rather cumbersome procedure, and it should be further improved.</p>
   <p>Indeed, the results presented in this article primarily pertain to the specific tubе heater under investigation, as they are based on concrete experimental data. As a scientific contribution, the article proposes a decision-making methodology grounded in experimental results, which are interpreted through fuzzy modeling. The methodology involves constructing a choice function and employing expert assessments to establish preferences under multi-criteria conditions. The maxima of the choice function are then identified to support final decision-making. For other types of tube heaters, this methodology can certainly be applied, provided that all necessary research procedures are followed, to determine their own recommended control parameters.</p>
   <p>The reliability of the obtained results is ensured as follows. All experimental data are divided into two sequences (sets): a training set and a validation set. The choice functions and their maxima are determined exclusively based on information from the training set, while the validation set is used to assess the reliability of the findings.</p>
   <p>The application of evolutionary search methods for decision-making is based on our prior theoretical and experimental results, where the convergence of the developed evolutionary algorithms to the optimal solution, in terms of the binary preference relation, has been proven with probability one.</p>
  </sec>
 </body><back>
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