<?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">AM</journal-id><journal-title-group><journal-title>Applied Mathematics</journal-title></journal-title-group><issn pub-type="epub">2152-7385</issn><publisher><publisher-name>Scientific Research Publishing</publisher-name></publisher></journal-meta><article-meta><article-id pub-id-type="doi">10.4236/am.2016.75037</article-id><article-id pub-id-type="publisher-id">AM-64733</article-id><article-categories><subj-group subj-group-type="heading"><subject>Articles</subject></subj-group><subj-group subj-group-type="Discipline-v2"><subject>Physics&amp;Mathematics</subject></subj-group></article-categories><title-group><article-title>
 
 
  Study of Fixed Point Theorems for Higher Dimension in Partially Ordered Metric Spaces
 
</article-title></title-group><contrib-group><contrib contrib-type="author" xlink:type="simple"><name name-style="western"><surname>btisam</surname><given-names>Masmali</given-names></name><xref ref-type="aff" rid="aff1"><sup>1</sup></xref><xref ref-type="corresp" rid="cor1"><sup>*</sup></xref></contrib><contrib contrib-type="author" xlink:type="simple"><name name-style="western"><surname>Sumitra</surname><given-names>Dalal</given-names></name><xref ref-type="aff" rid="aff1"><sup>1</sup></xref><xref ref-type="corresp" rid="cor1"><sup>*</sup></xref></contrib></contrib-group><aff id="aff1"><addr-line>College of Science, Jazan University, Jazan, K.S.A</addr-line></aff><author-notes><corresp id="cor1">* E-mail:<email>ibtisam234@hotmail.com(BM)</email>;<email>mathssqueen_d@yahoo.com(SD)</email>;</corresp></author-notes><pub-date pub-type="epub"><day>18</day><month>03</month><year>2016</year></pub-date><volume>07</volume><issue>05</issue><fpage>399</fpage><lpage>412</lpage><history><date date-type="received"><day>5</day>	<month>January</month>	<year>2016</year></date><date date-type="rev-recd"><day>accepted</day>	<month>15</month>	<year>March</year>	</date><date date-type="accepted"><day>18</day>	<month>March</month>	<year>2016</year></date></history><permissions><copyright-statement>&#169; 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><p><html>
 <head></head>
 
  In this paper, we establish the existence and uniqueness of fixed points of operator 
  <img src="Edit_94429925-97db-4223-9844-9e85178af511.jpg" alt="" />, when n is an arbitrary positive integer and X is a partially ordered complete metric space. We have shown examples to verify our work. Our results generalize the recent fixed point theorems cited in [1]-[4] etc. and include several recent developments.
 
</html></p></abstract><kwd-group><kwd>n-Tupled Coincidence Points</kwd><kwd> n-Tupled Coincidence Fixed Points</kwd><kwd> Compatible Maps</kwd><kwd> Fixed Points and Partially Ordered Metric Spaces</kwd></kwd-group></article-meta></front><body><sec id="s1"><title>1. Introduction</title><p>The metric fixed point theory plays a vital role to solve the problems related to variational inequalities, optimization, approximation theory, etc. Many authors (for detail, see [<xref ref-type="bibr" rid="scirp.64733-ref1">1</xref>] - [<xref ref-type="bibr" rid="scirp.64733-ref10">10</xref>] ) have discussed fixed point results in partially ordered metric spaces. In particular, Bhaskar and Lakshmikantham [<xref ref-type="bibr" rid="scirp.64733-ref3">3</xref>] , Nieto and Rodriguez-Lopez [<xref ref-type="bibr" rid="scirp.64733-ref11">11</xref>] , Agarwal et al. [<xref ref-type="bibr" rid="scirp.64733-ref12">12</xref>] and Ran and Recuring [<xref ref-type="bibr" rid="scirp.64733-ref13">13</xref>] proved some new results for contractions in partially ordered metric spaces.</p><p>Bhaskar and Lakshmikantham [<xref ref-type="bibr" rid="scirp.64733-ref3">3</xref>] proposed the study of a coupled fixed point in ordered metric spaces and as an application they proved the existence and uniqueness of solutions for a periodic boundary value problem. Nguyen et al. [<xref ref-type="bibr" rid="scirp.64733-ref14">14</xref>] , Berinde and Borcut [<xref ref-type="bibr" rid="scirp.64733-ref15">15</xref>] and Karpinar [<xref ref-type="bibr" rid="scirp.64733-ref8">8</xref>] introduced tripled and quadruple fixed point theorems as a generalization and extension of the coupled fixed point theorem. For comprehensive description of such work, we refer to [<xref ref-type="bibr" rid="scirp.64733-ref16">16</xref>] - [<xref ref-type="bibr" rid="scirp.64733-ref21">21</xref>] . Very recently, Imdad et al. [<xref ref-type="bibr" rid="scirp.64733-ref22">22</xref>] have introduced the concept of n-tupled coincidence point and proved n-tupled coincidence point results for commuting maps in metric spaces. Motivated by the work of M. Imdad, we introduce the notion of compatibility for n-tupled coincidence points and prove n-tupled coincidence point and n-tupled fixed point for compatible maps satisfying different contractive conditions in partially ordered metric spaces.</p><p>Jungck [<xref ref-type="bibr" rid="scirp.64733-ref1">1</xref>] obtained common fixed point results for commuting maps in metric spaces. The concept of commuting maps has been generalized in various directions over the years. One such generalization which is weaker than commuting is the concept of compatibility introduced by Jungck [<xref ref-type="bibr" rid="scirp.64733-ref23">23</xref>] .</p></sec><sec id="s2"><title>2. Prilimaries</title><p>Definition 2.1 [<xref ref-type="bibr" rid="scirp.64733-ref4">4</xref>] Let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x7.png" xlink:type="simple"/></inline-formula> be a partially ordered set equipped with a metric d such that <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x8.png" xlink:type="simple"/></inline-formula> is a metric space. Further, equip the product space <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x9.png" xlink:type="simple"/></inline-formula> with the following partial ordering:</p><p>For<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x10.png" xlink:type="simple"/></inline-formula>, define <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x11.png" xlink:type="simple"/></inline-formula></p><p>Definition 2.2 [<xref ref-type="bibr" rid="scirp.64733-ref4">4</xref>] Let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x12.png" xlink:type="simple"/></inline-formula> be a partially ordered set and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x13.png" xlink:type="simple"/></inline-formula> then F enjoys the mixed monotone property if <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x14.png" xlink:type="simple"/></inline-formula> is monotonically non-decreasing in x and monotonically non-increasing in y, that is, for any<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x15.png" xlink:type="simple"/></inline-formula>,</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x16.png" xlink:type="simple"/></inline-formula>and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x17.png" xlink:type="simple"/></inline-formula></p><p>Definition 2.3 [<xref ref-type="bibr" rid="scirp.64733-ref4">4</xref>] Let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x18.png" xlink:type="simple"/></inline-formula> be a partially ordered set and<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x19.png" xlink:type="simple"/></inline-formula>, then <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x20.png" xlink:type="simple"/></inline-formula> is called a coupled fixed point of the mapping F if <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x20.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x21.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x20.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x21.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x22.png" xlink:type="simple"/></inline-formula></p><p>Definition 2.4 [<xref ref-type="bibr" rid="scirp.64733-ref4">4</xref>] Let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x23.png" xlink:type="simple"/></inline-formula> be a partially ordered set and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x23.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x24.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x23.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x24.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x25.png" xlink:type="simple"/></inline-formula> then F enjoys the mixed g-monotone property if <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x23.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x24.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x25.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x26.png" xlink:type="simple"/></inline-formula> is monotonically g-non-decreasing in x and monotonically g- non-increasing in y, that is, for any<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x23.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x24.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x25.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x26.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x27.png" xlink:type="simple"/></inline-formula>,</p><disp-formula id="scirp.64733-formula127"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x28.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula128"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x29.png"  xlink:type="simple"/></disp-formula><p>Definition 2.5 [<xref ref-type="bibr" rid="scirp.64733-ref4">4</xref>] Let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x30.png" xlink:type="simple"/></inline-formula> be a partially ordered set and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x30.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x31.png" xlink:type="simple"/></inline-formula> and<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x30.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x31.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x32.png" xlink:type="simple"/></inline-formula>, then <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x30.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x31.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x32.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x33.png" xlink:type="simple"/></inline-formula> is called a coupled coincidence point of the maps F and g if <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x30.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x31.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x32.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x33.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x34.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x30.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x31.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x32.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x33.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x34.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x35.png" xlink:type="simple"/></inline-formula></p><p>Definition 2.6 [<xref ref-type="bibr" rid="scirp.64733-ref4">4</xref>] Let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x36.png" xlink:type="simple"/></inline-formula> be a partially ordered set, then <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x36.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x37.png" xlink:type="simple"/></inline-formula> is called a coupled fixed point of the maps <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x36.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x37.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x38.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x36.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x37.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x38.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x39.png" xlink:type="simple"/></inline-formula> if <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x36.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x37.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x38.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x39.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x40.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x36.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x37.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x38.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x39.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x40.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x41.png" xlink:type="simple"/></inline-formula></p></sec><sec id="s3"><title>3. Main Results</title><p>Imdad et al. [<xref ref-type="bibr" rid="scirp.64733-ref22">22</xref>] introduced the concept of n-tupled fixed point and n-tupled coincidence point given by considering n to be an even integer but throughout, we will consider n, a positive integer, in this paper.</p><p>Definition 2.7 Let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x42.png" xlink:type="simple"/></inline-formula> be a partially ordered set and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x42.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x43.png" xlink:type="simple"/></inline-formula> then F is said to have the mixed</p><p>monotone property if F is non-decreasing in its odd position arguments and non-increasing in its even positions arguments, that is, if,</p><p>1) For all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x44.png" xlink:type="simple"/></inline-formula></p><p>2) For all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x45.png" xlink:type="simple"/></inline-formula></p><p>3) For all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x46.png" xlink:type="simple"/></inline-formula></p><disp-formula id="scirp.64733-formula129"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x47.png"  xlink:type="simple"/></disp-formula><p>For all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x48.png" xlink:type="simple"/></inline-formula> (if r is odd),</p><p>For all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x49.png" xlink:type="simple"/></inline-formula> (if r is even).</p><p>Definition 2.8 Let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x50.png" xlink:type="simple"/></inline-formula> be a partially ordered set and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x50.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x51.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x50.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x51.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x52.png" xlink:type="simple"/></inline-formula> be two maps.</p><p>Then F is said to have the mixed g-monotone property if F is g-non-decreasing in its odd position arguments and g-non-increasing in its even positions arguments, that is, if,</p><p>1) For all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x53.png" xlink:type="simple"/></inline-formula></p><p>2) For all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x54.png" xlink:type="simple"/></inline-formula></p><p>3) For all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x55.png" xlink:type="simple"/></inline-formula></p><disp-formula id="scirp.64733-formula130"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x56.png"  xlink:type="simple"/></disp-formula><p>For all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x57.png" xlink:type="simple"/></inline-formula> (if r is odd),</p><p>For all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x58.png" xlink:type="simple"/></inline-formula> (if r is even).</p><p>Definition 2.9 [<xref ref-type="bibr" rid="scirp.64733-ref22">22</xref>] Let X be a nonempty set. An element <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x59.png" xlink:type="simple"/></inline-formula> is called an r-tupled fixed point of the mapping <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x59.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x60.png" xlink:type="simple"/></inline-formula> if</p><disp-formula id="scirp.64733-formula131"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x61.png"  xlink:type="simple"/></disp-formula><p>Example 1. Let (R, d) be a partial ordered metric space under natural setting and let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x62.png" xlink:type="simple"/></inline-formula> be mapping defined by</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x63.png" xlink:type="simple"/></inline-formula>, for any<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x63.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x64.png" xlink:type="simple"/></inline-formula>,</p><p>then <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x65.png" xlink:type="simple"/></inline-formula> is an r-tupled fixed point of F.</p><p>Definition 2.10 [<xref ref-type="bibr" rid="scirp.64733-ref22">22</xref>] Let X be a nonempty set. An element <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x66.png" xlink:type="simple"/></inline-formula> is called an r-tupled coincidence point of the maps <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x66.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x67.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x66.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x67.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x68.png" xlink:type="simple"/></inline-formula> if</p><disp-formula id="scirp.64733-formula132"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x69.png"  xlink:type="simple"/></disp-formula><p>Example 2. Let (R, d) be a partial ordered metric space under natural setting and let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x70.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x70.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x71.png" xlink:type="simple"/></inline-formula> be maps defined by</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x72.png" xlink:type="simple"/></inline-formula>, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x72.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x73.png" xlink:type="simple"/></inline-formula>,</p><p>for any<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x74.png" xlink:type="simple"/></inline-formula>, then <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x74.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x75.png" xlink:type="simple"/></inline-formula> is an r-tupled coincidence point of F and g.</p><p>Definition 2.11 [<xref ref-type="bibr" rid="scirp.64733-ref22">22</xref>] Let X be a nonempty set. An element <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x76.png" xlink:type="simple"/></inline-formula> is called an r-tupled fixed point of the maps <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x76.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x77.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x76.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x77.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x78.png" xlink:type="simple"/></inline-formula> if</p><disp-formula id="scirp.64733-formula133"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x79.png"  xlink:type="simple"/></disp-formula><p>Now, we define the concept of compatible maps for r-tupled maps.</p><p>Definition 2.12 Let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x80.png" xlink:type="simple"/></inline-formula> be a partially ordered set, then the maps <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x80.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x81.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x80.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x81.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x82.png" xlink:type="simple"/></inline-formula> are called compatible if</p><disp-formula id="scirp.64733-formula134"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x83.png"  xlink:type="simple"/></disp-formula><p>whenever, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x84.png" xlink:type="simple"/></inline-formula>are sequences in X such that</p><disp-formula id="scirp.64733-formula135"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x85.png"  xlink:type="simple"/></disp-formula><p>For some <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x86.png" xlink:type="simple"/></inline-formula></p><p>Imdad et al. [<xref ref-type="bibr" rid="scirp.64733-ref22">22</xref>] proved the following theorem:</p><p>Theorem 3.1 Let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x87.png" xlink:type="simple"/></inline-formula> be a partially ordered set equipped with a metric d such that (X, d) is a complete metric space. Assume that there is a function <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x87.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x88.png" xlink:type="simple"/></inline-formula> with <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x87.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x88.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x89.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x87.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x88.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x89.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x90.png" xlink:type="simple"/></inline-formula> for each t &gt; 0. Further, let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x87.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x88.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x89.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x90.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x91.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x87.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x88.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x89.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x90.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x91.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x92.png" xlink:type="simple"/></inline-formula> be two maps such that F has the mixed g-monotone property satisfying the following conditions:</p><p>(i)<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x93.png" xlink:type="simple"/></inline-formula>,</p><p>(ii) g is continuous and monotonically increasing,</p><p>(iii) the pair (g, F) is commuting,</p><p>(iv) <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x94.png" xlink:type="simple"/></inline-formula>for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x94.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x95.png" xlink:type="simple"/></inline-formula>, with<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x94.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x95.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x96.png" xlink:type="simple"/></inline-formula>, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x94.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x95.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x96.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x97.png" xlink:type="simple"/></inline-formula>, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x94.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x95.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x96.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x97.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x98.png" xlink:type="simple"/></inline-formula>if r is even and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x94.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x95.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x96.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x97.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x98.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x99.png" xlink:type="simple"/></inline-formula> if r is odd. Also, suppose that either</p><p>a) F is continuous or</p><p>b) X has the following properties:</p><p>(i) If a non-decreasing sequence <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x100.png" xlink:type="simple"/></inline-formula> then <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x100.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x101.png" xlink:type="simple"/></inline-formula> for all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x100.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x101.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x102.png" xlink:type="simple"/></inline-formula>.</p><p>(ii) If a non-increasing sequence <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x103.png" xlink:type="simple"/></inline-formula> then <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x103.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x104.png" xlink:type="simple"/></inline-formula> for all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x103.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x104.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x105.png" xlink:type="simple"/></inline-formula>.</p><p>If there exist <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x106.png" xlink:type="simple"/></inline-formula> such that</p><disp-formula id="scirp.64733-formula136"><label>(iv)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x107.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula137"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x108.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula138"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x109.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula139"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x110.png"  xlink:type="simple"/></disp-formula><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x111.png" xlink:type="simple"/></inline-formula>if r is odd,</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x112.png" xlink:type="simple"/></inline-formula>, if r is even.</p><p>Then F and g have a r-tupled coincidence point, i.e. there exist <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x113.png" xlink:type="simple"/></inline-formula> such that</p><disp-formula id="scirp.64733-formula140"><label>(v)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x114.png"  xlink:type="simple"/></disp-formula><p>Now, we prove our main result as follows:</p><p>Theorem 3.2 Let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x115.png" xlink:type="simple"/></inline-formula> be a partially ordered set equipped with a metric d such that (X, d) is a complete metric space. Assume that there is a function <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x115.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x116.png" xlink:type="simple"/></inline-formula> with <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x115.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x116.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x117.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x115.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x116.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x117.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x118.png" xlink:type="simple"/></inline-formula> for each t &gt; 0. Further let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x115.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x116.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x117.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x118.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x119.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x115.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x116.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x117.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x118.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x119.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x120.png" xlink:type="simple"/></inline-formula> be two maps such that F has the mixed g-monotone property satisfying the following conditions:</p><disp-formula id="scirp.64733-formula141"><label>(3.1)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x121.png"  xlink:type="simple"/></disp-formula><p>(3.2) g is continuous and monotonically increasing,</p><p>(3.3) the pair (g, F) is compatible,</p><p>(3.4) <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x122.png" xlink:type="simple"/></inline-formula>,</p><p>For all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x123.png" xlink:type="simple"/></inline-formula>, with<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x123.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x124.png" xlink:type="simple"/></inline-formula>, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x123.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x124.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x125.png" xlink:type="simple"/></inline-formula>, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x123.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x124.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x125.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x126.png" xlink:type="simple"/></inline-formula> if r is even and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x123.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x124.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x125.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x126.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x127.png" xlink:type="simple"/></inline-formula> if r is odd. Also, suppose that either</p><p>a) F is continuous or</p><p>b) X has the following properties:</p><p>(i) If a non-decreasing sequence <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x128.png" xlink:type="simple"/></inline-formula> then <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x128.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x129.png" xlink:type="simple"/></inline-formula> for all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x128.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x129.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x130.png" xlink:type="simple"/></inline-formula>.</p><p>(ii) If a non-increasing sequence <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x131.png" xlink:type="simple"/></inline-formula> then <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x131.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x132.png" xlink:type="simple"/></inline-formula> for all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x131.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x132.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x133.png" xlink:type="simple"/></inline-formula>.</p><p>If there exist <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x134.png" xlink:type="simple"/></inline-formula> such that</p><disp-formula id="scirp.64733-formula142"><label>(3.5)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x135.png"  xlink:type="simple"/></disp-formula><p>Then F and g have a r-tupled coincidence point, i.e. there exist <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x136.png" xlink:type="simple"/></inline-formula> such that</p><disp-formula id="scirp.64733-formula143"><label>(3.6)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x137.png"  xlink:type="simple"/></disp-formula><p>Proof. Starting with<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x138.png" xlink:type="simple"/></inline-formula>, we define the sequences <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x138.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x139.png" xlink:type="simple"/></inline-formula> in X as follows:</p><disp-formula id="scirp.64733-formula144"><label>(3.7)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x140.png"  xlink:type="simple"/></disp-formula><p>Now, we prove that for all n ≥ 0,</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x141.png" xlink:type="simple"/></inline-formula>, if r is even and (3.8)</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x142.png" xlink:type="simple"/></inline-formula>, if r is odd.</p><disp-formula id="scirp.64733-formula145"><label>(3.9)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x143.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula146"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x144.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula147"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x145.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula148"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x146.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula149"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x147.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula150"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x148.png"  xlink:type="simple"/></disp-formula><p>So (3.8) holds for n = 0. Suppose that (3.8) holds for some n &gt; 0. Consider</p><disp-formula id="scirp.64733-formula151"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x149.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula152"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x150.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula153"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x151.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula154"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x152.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula155"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x153.png"  xlink:type="simple"/></disp-formula><p>and<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x154.png" xlink:type="simple"/></inline-formula>, if r is odd.</p><p>Thus by induction (3.8) holds for all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x155.png" xlink:type="simple"/></inline-formula>. Using (3.7) and (3.8)</p><disp-formula id="scirp.64733-formula156"><label>(3.10)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x156.png"  xlink:type="simple"/></disp-formula><p>Similarly, we can inductively write</p><disp-formula id="scirp.64733-formula157"><label>(3.11)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x157.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula158"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x158.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula159"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x159.png"  xlink:type="simple"/></disp-formula><p>Therefore, by putting</p><disp-formula id="scirp.64733-formula160"><label>(3.12)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x160.png"  xlink:type="simple"/></disp-formula><p>We have,</p><disp-formula id="scirp.64733-formula161"><label>(3.13)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x161.png"  xlink:type="simple"/></disp-formula><p>Since <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x162.png" xlink:type="simple"/></inline-formula> for all t &gt; 0, therefore, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x162.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x163.png" xlink:type="simple"/></inline-formula>for all m so that <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x162.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x163.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x164.png" xlink:type="simple"/></inline-formula> is a non-increasing sequence. Since it is bounded below, there is some <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x162.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x163.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x164.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x165.png" xlink:type="simple"/></inline-formula> such that</p><disp-formula id="scirp.64733-formula162"><label>(3.14)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x166.png"  xlink:type="simple"/></disp-formula><p>We shall show that<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x167.png" xlink:type="simple"/></inline-formula>. Suppose, if possible<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x167.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x168.png" xlink:type="simple"/></inline-formula>. Taking limit as <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x167.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x168.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x169.png" xlink:type="simple"/></inline-formula> of both sides of (3.13) and keeping in mind our supposition that <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x167.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x168.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x169.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x170.png" xlink:type="simple"/></inline-formula> for all t &gt; 0, we have</p><disp-formula id="scirp.64733-formula163"><label>(3.15)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x171.png"  xlink:type="simple"/></disp-formula><p>this contradiction gives <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x172.png" xlink:type="simple"/></inline-formula> and hence</p><disp-formula id="scirp.64733-formula164"><label>(3.16)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x173.png"  xlink:type="simple"/></disp-formula><p>Next we show that all the sequences <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x174.png" xlink:type="simple"/></inline-formula> are Cauchy sequences. If possible, suppose that at least one of <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x174.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x175.png" xlink:type="simple"/></inline-formula> is not a Cauchy sequence. Then there exist <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x174.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x175.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x176.png" xlink:type="simple"/></inline-formula> and sequences of positive integers <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x174.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x175.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x176.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x177.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x174.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x175.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x176.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x177.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x178.png" xlink:type="simple"/></inline-formula> such that for all positive integers k,</p><disp-formula id="scirp.64733-formula165"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x179.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula166"><label>(3.17)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x180.png"  xlink:type="simple"/></disp-formula><p>and</p><disp-formula id="scirp.64733-formula167"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x181.png"  xlink:type="simple"/></disp-formula><p>Now,</p><disp-formula id="scirp.64733-formula168"><label>(3.18)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x182.png"  xlink:type="simple"/></disp-formula><p>Similarly, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x183.png" xlink:type="simple"/></inline-formula>, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x183.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x184.png" xlink:type="simple"/></inline-formula></p><disp-formula id="scirp.64733-formula169"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x185.png"  xlink:type="simple"/></disp-formula><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x186.png" xlink:type="simple"/></inline-formula>, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x186.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x187.png" xlink:type="simple"/></inline-formula></p><p>Thus,</p><disp-formula id="scirp.64733-formula170"><label>(3.19)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x188.png"  xlink:type="simple"/></disp-formula><p>Again, the triangular inequality and (3.17) gives</p><disp-formula id="scirp.64733-formula171"><label>(3.20)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x189.png"  xlink:type="simple"/></disp-formula><p>and</p><disp-formula id="scirp.64733-formula172"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x190.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula173"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x191.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula174"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x192.png"  xlink:type="simple"/></disp-formula><p>i.e., we have</p><disp-formula id="scirp.64733-formula175"><label>(3.21)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x193.png"  xlink:type="simple"/></disp-formula><p>Also,</p><disp-formula id="scirp.64733-formula176"><label>(3.22)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x194.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula177"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x195.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula178"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x196.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula179"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x197.png"  xlink:type="simple"/></disp-formula><p>Using (3.17), (3.19) and (3.22), we have</p><disp-formula id="scirp.64733-formula180"><label>(3.23)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x198.png"  xlink:type="simple"/></disp-formula><p>Letting <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x199.png" xlink:type="simple"/></inline-formula> in above equation, we get</p><disp-formula id="scirp.64733-formula181"><label>(3.24)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x200.png"  xlink:type="simple"/></disp-formula><p>Finally, letting <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x201.png" xlink:type="simple"/></inline-formula> in (3.17) and using (3.19) and (3.23), we get</p><disp-formula id="scirp.64733-formula182"><label>(3.25)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x202.png"  xlink:type="simple"/></disp-formula><p>which is a contradiction. Therefore, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x203.png" xlink:type="simple"/></inline-formula>are Cauchy sequences. Since the metric space (X, d) is complete, so there exist <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x203.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x204.png" xlink:type="simple"/></inline-formula> such that</p><disp-formula id="scirp.64733-formula183"><label>(3.26)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x205.png"  xlink:type="simple"/></disp-formula><p>As g is continuous, so from (2.26), we have</p><disp-formula id="scirp.64733-formula184"><label>(3.27)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x206.png"  xlink:type="simple"/></disp-formula><p>By the compatibility of g and F, we have</p><disp-formula id="scirp.64733-formula185"><label>(3.28)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x207.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula186"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x208.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula187"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x209.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.64733-formula188"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x210.png"  xlink:type="simple"/></disp-formula><p>Now, we show that F and g have an r-tupled coincidence point. To accomplish this, suppose (a) holds. i.e. F is continuous, then using (3.28) and (3.8), we see that</p><disp-formula id="scirp.64733-formula189"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x211.png"  xlink:type="simple"/></disp-formula><p>which gives<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x212.png" xlink:type="simple"/></inline-formula>. Similarly, we can prove <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x212.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x213.png" xlink:type="simple"/></inline-formula></p><disp-formula id="scirp.64733-formula190"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x214.png"  xlink:type="simple"/></disp-formula><p>Hence <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x215.png" xlink:type="simple"/></inline-formula> is an r-tupled coincidence point of the maps F and g.</p><p>If (b) holds, since <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x216.png" xlink:type="simple"/></inline-formula> is non-decreasing or non-increasing as i is odd or even and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x216.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x217.png" xlink:type="simple"/></inline-formula> as<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x216.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x217.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x218.png" xlink:type="simple"/></inline-formula>, we have<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x216.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x217.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x218.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x219.png" xlink:type="simple"/></inline-formula>, when i is odd while <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x216.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x217.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x218.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x219.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x220.png" xlink:type="simple"/></inline-formula> when i is even. Since g is monotonically increasing, therefore</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x221.png" xlink:type="simple"/></inline-formula>when i is odd, (3.29)</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x222.png" xlink:type="simple"/></inline-formula>when i is even.</p><p>Now, using triangle inequality together with (3.8), we get</p><disp-formula id="scirp.64733-formula191"><label>(3.30)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x223.png"  xlink:type="simple"/></disp-formula><p>Therefore,<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x224.png" xlink:type="simple"/></inline-formula>. Similarly we can prove</p><p><img data-original="http://html.scirp.org/file/2-7403037x226.png" /><img data-original="http://html.scirp.org/file/2-7403037x225.png" /></p><p>Thus the theorem follows.</p><p>Corollary 3.1 Under the hypothesis of theorem 3.2 and satisfying contractive condition as (3.31) <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x227.png" xlink:type="simple"/></inline-formula></p><p>Then F and g have a r-tupled coincidence point.</p><p>Proof: If we put <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x228.png" xlink:type="simple"/></inline-formula> with <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x228.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x229.png" xlink:type="simple"/></inline-formula> in theorem 3.2, we get the corollary.</p><p>Uniqueness of r-tupled fixed point</p><p>For all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x230.png" xlink:type="simple"/></inline-formula>,</p><disp-formula id="scirp.64733-formula192"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x231.png"  xlink:type="simple"/></disp-formula><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x232.png" xlink:type="simple"/></inline-formula>.</p><p>We say that <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x233.png" xlink:type="simple"/></inline-formula></p><p>Theorem 3.3 In addition to the hypothesis of theorem 3.1, suppose that for every</p><disp-formula id="scirp.64733-formula193"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x234.png"  xlink:type="simple"/></disp-formula><p>Then exist <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x235.png" xlink:type="simple"/></inline-formula> such that <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x235.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x236.png" xlink:type="simple"/></inline-formula> is comparable to</p><disp-formula id="scirp.64733-formula194"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x237.png"  xlink:type="simple"/></disp-formula><p>And</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x238.png" xlink:type="simple"/></inline-formula>.</p><p>Then F and g have a unique r-coincidence point, which is a fixed point of <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x239.png" xlink:type="simple"/></inline-formula> and<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x239.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x240.png" xlink:type="simple"/></inline-formula>. That is there exists a unique <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x239.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x240.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x241.png" xlink:type="simple"/></inline-formula> such that</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x242.png" xlink:type="simple"/></inline-formula>for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x242.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x243.png" xlink:type="simple"/></inline-formula> (3.32)</p><p>Proof. By theorem 3.2, the set of r-coincidence points is non-empty. Now, suppose that <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x244.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x244.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x245.png" xlink:type="simple"/></inline-formula> are two coincidence points of F and g, that is <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x244.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x245.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x246.png" xlink:type="simple"/></inline-formula> for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x244.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x245.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x246.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x247.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x244.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x245.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x246.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x247.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x248.png" xlink:type="simple"/></inline-formula> for all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x244.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x245.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x246.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x247.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x248.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x249.png" xlink:type="simple"/></inline-formula>.</p><p>We will show that <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x250.png" xlink:type="simple"/></inline-formula> for all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x250.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x251.png" xlink:type="simple"/></inline-formula>.</p><p>By assumption, there exists <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x252.png" xlink:type="simple"/></inline-formula> such that</p><disp-formula id="scirp.64733-formula195"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x253.png"  xlink:type="simple"/></disp-formula><p>is comparable to</p><disp-formula id="scirp.64733-formula196"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x254.png"  xlink:type="simple"/></disp-formula><p>and</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x255.png" xlink:type="simple"/></inline-formula>.</p><p>Let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x256.png" xlink:type="simple"/></inline-formula> for all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x256.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x257.png" xlink:type="simple"/></inline-formula>. Since<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x256.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x257.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x258.png" xlink:type="simple"/></inline-formula>, we can choose <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x256.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x257.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x258.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x259.png" xlink:type="simple"/></inline-formula> such that <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x256.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x257.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x258.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x259.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x260.png" xlink:type="simple"/></inline-formula> for all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x256.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x257.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x258.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x259.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x260.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x261.png" xlink:type="simple"/></inline-formula>. By a similar reason, we can inductively define sequences <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x256.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x257.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x258.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x259.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x260.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x261.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x262.png" xlink:type="simple"/></inline-formula> for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x256.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x257.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x258.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x259.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x260.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x261.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x262.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x263.png" xlink:type="simple"/></inline-formula> such that <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x256.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x257.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x258.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x259.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x260.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x261.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x262.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x263.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x264.png" xlink:type="simple"/></inline-formula> for all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x256.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x257.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x258.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x259.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x260.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x261.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x262.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x263.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x264.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x265.png" xlink:type="simple"/></inline-formula>.</p><p>In addition, let <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x266.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x266.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x267.png" xlink:type="simple"/></inline-formula> for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x266.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x267.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x268.png" xlink:type="simple"/></inline-formula> and in the same way, define the sequences <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x266.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x267.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x268.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x269.png" xlink:type="simple"/></inline-formula> and<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x266.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x267.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x268.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x269.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x270.png" xlink:type="simple"/></inline-formula>, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x266.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x267.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x268.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x269.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x270.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x271.png" xlink:type="simple"/></inline-formula>for all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x266.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x267.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x268.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x269.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x270.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x271.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x272.png" xlink:type="simple"/></inline-formula>. Since</p><disp-formula id="scirp.64733-formula197"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x273.png"  xlink:type="simple"/></disp-formula><p>And</p><disp-formula id="scirp.64733-formula198"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x274.png"  xlink:type="simple"/></disp-formula><p>are comparable, then</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x275.png" xlink:type="simple"/></inline-formula>for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x275.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x276.png" xlink:type="simple"/></inline-formula> if i is odd,</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x277.png" xlink:type="simple"/></inline-formula>for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x277.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x278.png" xlink:type="simple"/></inline-formula> if i is even.</p><p>We have</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x279.png" xlink:type="simple"/></inline-formula>,</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x280.png" xlink:type="simple"/></inline-formula>.</p><p>Then <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x281.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x281.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x282.png" xlink:type="simple"/></inline-formula> are comparable for all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x281.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x282.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x283.png" xlink:type="simple"/></inline-formula>. It follows from condition (3.4) of theorem 3.2</p><disp-formula id="scirp.64733-formula199"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x284.png"  xlink:type="simple"/></disp-formula><p>Summing, we get</p><disp-formula id="scirp.64733-formula200"><label>(3.33)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x285.png"  xlink:type="simple"/></disp-formula><p>It follows that</p><disp-formula id="scirp.64733-formula201"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x286.png"  xlink:type="simple"/></disp-formula><p>For all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x287.png" xlink:type="simple"/></inline-formula>. Note that <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x287.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x288.png" xlink:type="simple"/></inline-formula> for <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x287.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x288.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x289.png" xlink:type="simple"/></inline-formula> imply that <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x287.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x288.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x289.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x290.png" xlink:type="simple"/></inline-formula> for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x287.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x288.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x289.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x290.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x291.png" xlink:type="simple"/></inline-formula> Hence from (3.32) we have</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x292.png" xlink:type="simple"/></inline-formula>for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x292.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x293.png" xlink:type="simple"/></inline-formula> (3.34)</p><p>Similarly, one can prove that</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x294.png" xlink:type="simple"/></inline-formula>for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x294.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x295.png" xlink:type="simple"/></inline-formula> (3.35)</p><p>Using (3.34), (3.35) and triangle inequality we get</p><disp-formula id="scirp.64733-formula202"><graphic  xlink:href="http://html.scirp.org/file/2-7403037x296.png"  xlink:type="simple"/></disp-formula><p>As <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x297.png" xlink:type="simple"/></inline-formula> for all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x297.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x298.png" xlink:type="simple"/></inline-formula>. Hence, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x297.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x298.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x299.png" xlink:type="simple"/></inline-formula>, therefore (3.32) is proved.</p><p>Since <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x300.png" xlink:type="simple"/></inline-formula> for all<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x300.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x301.png" xlink:type="simple"/></inline-formula>, by the commutativity of F and g, we have</p><disp-formula id="scirp.64733-formula203"><label>(3.36)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/2-7403037x302.png"  xlink:type="simple"/></disp-formula><p>Denote <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x303.png" xlink:type="simple"/></inline-formula> for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x303.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x304.png" xlink:type="simple"/></inline-formula> From (3.36), we have</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x305.png" xlink:type="simple"/></inline-formula>for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x305.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x306.png" xlink:type="simple"/></inline-formula> (3.37)</p><p>Hence <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x307.png" xlink:type="simple"/></inline-formula> is a r-coincidence point of F and g.</p><p>It follows from (3.32) <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x308.png" xlink:type="simple"/></inline-formula>and so</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x309.png" xlink:type="simple"/></inline-formula>for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x309.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x310.png" xlink:type="simple"/></inline-formula></p><p>This means that</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x311.png" xlink:type="simple"/></inline-formula>for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x311.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x312.png" xlink:type="simple"/></inline-formula></p><p>Now, from (3.37), we have</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x313.png" xlink:type="simple"/></inline-formula>for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x313.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x314.png" xlink:type="simple"/></inline-formula></p><p>Hence, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x315.png" xlink:type="simple"/></inline-formula>is a r-fixed point of F and a fixed point of g.</p><p>To prove the uniqueness of the fixed point, assume that <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x316.png" xlink:type="simple"/></inline-formula> is another r-fixed point. Then by (3.32) we have</p><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x317.png" xlink:type="simple"/></inline-formula>for all <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x317.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x318.png" xlink:type="simple"/></inline-formula></p><p>Thus,<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/2-7403037x319.png" xlink:type="simple"/></inline-formula>. This completes the proof.</p></sec><sec id="s4"><title>Acknowledgements</title><p>Authors are highly thankful for the financial support of this paper to Deanship of Scientific Research, Jazan University, K.S.A.</p></sec><sec id="s5"><title>Conflict of Interest</title><p>Authors declare that they have no conflict of interest.</p></sec><sec id="s6"><title>Cite this paper</title><p>Ibtisam Masmali,Sumitra Dalal, (2016) Study of Fixed Point Theorems for Higher Dimension in Partially Ordered Metric Spaces. Applied Mathematics,07,399-412. doi: 10.4236/am.2016.75037</p></sec></body><back><ref-list><title>References</title><ref id="scirp.64733-ref1"><label>1</label><mixed-citation publication-type="other" xlink:type="simple">Choudhary, B.S. and Kundu, A. (2010) Coupled Coincidence Point Results in Ordered Metric Spaces for Compatible Mappings. 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