A discrete event system is a dynamical system whose state evolves in time by the occurrence of events at possibly irregular time intervals. Timed Petri nets are a graphical and mathematical modeling tool applicable to discrete event systems in order to represent its states evolution where the timing at which the state changes is taken into consideration. One of the most important performance issues to be considered in a discrete event system is its stability. Lyapunov theory provides the required tools needed to aboard the stability and stabilization problems for discrete event systems modeled with timed Petri nets whose mathematical model is given in terms of difference equations. By proving stability one guarantees a bound on the discrete event systems state dynamics. When the system is unstable, a sufficient condition to stabilize the system is given. It is shown that it is possible to restrict the discrete event systems state space in such a way that boundedness is achieved. However, the restriction is not numerically precisely known. This inconvenience is overcome by considering a specific recurrence equation, in the max-plus algebra, which is assigned to the timed Petri net graphical model.
Discrete Event Systems Lyapunov Methods Max-Plus Algebra Timed Petri Nets1. Introduction
A discrete event system, is a dynamical system whose state evolves in time by the occurrence of events at possibly irregular time intervals. Timed Petri nets are a graphical and mathematical modeling tool applicable to discrete event systems in order to represent its states evolution where the timing at which the state changes is taken into consideration Timed Petri nets are known to be useful for analyzing the systems properties in addition of being a paradigm for describing and studying information processing systems, where the timing at which the state changes is taken into consideration. For a detailed discussion of Petri net theory see [1] and the references quoted therein. One of the most important performance issues to be considered in a discrete event system is its stability. Lyapunov theory provides the required tools needed to aboard the stability and stabilization problems for discrete event systems modeled with timed Petri nets whose mathematical model is given in terms of difference equations [2]. By proving stability one guarantees a bound on the discrete event systems state dynamics. When the system is unstable, a sufficient condition to stabilize the system is given. It is shown that it is possible to restrict the discrete event systems state space in such a way that boundedness is achieved. However, the restriction is not numerically precisely known. This inconvenience is overcome by considering a specific recurrence equation, in the max-plus algebra, which is assigned to the timed Petri net graphical model. This paper proposes a methodology consisting in combining Lyapunov theory with max-plus algebra to give a precise solution to the stabilization problem for discrete event systems modeled with timed Petri nets. The presented methodology results to be innovative and it is not, in general, known. The main objective of the paper is to spread its results along large audiences. The paper is organized as follows. In Section 2, Lyapunov theory for discrete event systems modeled with Petri nets is given. Section 3 presents max-plus algebra and max-plus recurrence equations for timed event Petri nets. Section 4 considers the solution to the stabilization problem for discrete event systems modeled with timed Petri nets. Finally, the paper ends with some conclusions.
2. Lyapunov Stability and Stabilization of Discrete Event Systems Modeled with Petri Nets [<xref ref-type="bibr" rid="scirp.57916-ref2">2</xref>]-[<xref ref-type="bibr" rid="scirp.57916-ref4">4</xref>]
NOTATION:, ,. Given, is equivalent to. A function, is called nondecreasing in if given such that and then,. Consider systems of first ordinary difference equations given by
where, and is continuous in.
Definition 1 The vector valued function is said to be a solution of (1) if and for all.
Definition 2 The system (1) is said to be practically stable, if given with, then
Definition 3 A continuous function is said to belong to class if and it is strictly increasing.
Consider a vector Lyapunov function, and define the variation of relative to (1) by
Theorem 4 Let be a continuous function in, define the function such that satisfies the estimates
for, , where is a continuous function in the second argument. Assume
that: is nondecreasing in, are given and finally that is satisfied. Then, the practical stability properties of
imply the practical stability properties of system (1).
Corollary 5 In Theorem (4): If we get uniform practical stability of (1) which implies structural stability.
Definition 6 A Petri net is a 5-tuple, where: is a finite set of places, is a finite set of transitions, is a set of arcs, is a weight function,: is the initial marking, and.
Definition 7 The clock structure associated with a place is a set of clock sequences
The positive number, associated to, called holding time, represents the time that a token must spend in this place until its outputs enabled transitions fire. We partition into subsets and, where is the set of places with zero holding time, and is the set of places that have some holding time.
Definition 8 A timed Petri net is a 6-tuple where are as before, and is a clock structure. A timed Petri net is a timed event petri net when every has one input and one output transition, in which case the associated clock structure set of a place reduces to one element.
Notice that if (or) then, this is often represented graphically by, () arcs from to (to) each with no numeric label.
Let denote the marking (i.e., the number of tokens) at place at time and let denote the marking (state) of at time. A transition is said to be enabled at time if for all such that. It is assumed that at each time there exists at least one transition to fire. If a transition is enabled then, it can fire. If an enabled transition fires at time then, the next marking for is given by
Let denote an matrix of integers (the incidence matrix) where with and. Let denote a firing vector where if is fired then, its
corresponding firing vector is with the one in the position in the vector and zeros everywhere else. The nonlinear difference matrix equation describing the dynamical behavior represented by a is:
where if at step, for all then, is enabled and if this fires then, its corresponding firing vector is utilized in the difference equation to generate the next step. Notice that if can be reached from some other marking and, if we fire some sequence of transitions with corresponding firing vectors we obtain that
Let be a metric space where is defined by and consider the matrix difference equation which describes the dynamical behavior of the discrete event system modeled by a, see (7).
Proposition 9 Let be a Petri net. is uniform practical stable if there exists a strictly positive vector such that
Moreover, is uniform practical asymptotic stable if the following equation holds
Lemma 10 Let suppose that Proposition (9) holds then,
Remark 11 Notice that since the state space of a TPN is contained in the state space of the same now not timed PN, stability of PN implies stability of the TPN.
Lyapunov Stabilization
Definition 12 Let be a Petri net. is said to be stabilizable if there exists a firing transition sequence with transition count vector such that system (7) remains bounded.
Proposition 13 Let be a Petri net. is stabilizable if there exists a firing transition sequence with transition count vector such that the following equation holds
Remark 14 By fixing a particular, which satisfies (11), the state space is restricted to those markings that are finite.
NOTATION:, ,. Let and define the operations and by: and.
Definition 15 The set with the two operations and is called a max-plus algebra and is denoted by
Definition 16 A semiring is a nonempty set endowed with two operations and two elements and such that: is associative and commutative with zero element is associative, distributes over, and has unit element is absorbing for i.e., , In addition if is commutative then is called a commutative semiring, and if is such that, then it is called idempotent.
Theorem 17 The max-plus algebra has the algebraic structure of a commutative and idempotent semiring.
3.2. Matrices and Graphs
Let be the set of matrices with coefficients in with the following operations: The sum of matrices, denoted is defined by: for and
The product of matrices, denoted is defined by: for
and. Let denote the matrix with all its elements equal to and denote by the matrix which has its diagonal elements equal to and all the other elements equal to Then, the following result can be stated.
Theorem 18 The 5-tuple has the algebraic structure of a noncommutative idempotent semiring.
Definition 19 Let and then the k-th power of denoted by is defined by: (k times), where is set equal to.
Definition 20 A matrix is said to be regular if contains at least one element distinct from in each row.
Definition 21 Let be a finite and non-empty set and consider. The pair is called a directed graph, where is the set of elements called nodes and is the set of ordered pairs of nodes called arcs. A directed graph is called a weighted graph if a weight is associated with any arc.
Let be any matrix, a graph, called the communication graph of, can be associated as follows. Define and a pair will be a member of, where denotes the set of arcs of.
Definition 22 A path from node to node is a sequence of arcs such that, for and. The path consists of the nodes with length denoted by. In the case when the path is said to be a circuit. A circuit is said to be elementary if nodes and are different for. A circuit consisting of one arc is called a self-loop.
Let us denote by the set of all paths from node to node of length and for any arc let its weight be given by then the weight of a path denoted by is defined to be the sum of the weights of all the arcs that belong to the path. The average weight of a path is given by. Given two paths, as for example, and in the concatenation of paths is defined as. The communication graph and powers of matrix are closely related as it is shown in the next theorem.
Theorem 23 Let, then:, where in the case when is empty i.e., no path of length from node to node exists in.
Definition 24 Let then define the matrix as:. Where the element gives the maximal weight of any path from to. If in addition one wants to add the possibility of staying at a node then one must include matrix in the definition of matrix giving rise to its Kleene star representation defined by:
Lemma 25 Let be such that any circuit in has average circuit weight less than or equal to. Then it holds that:
Definition 26 Let be a graph and, node is reachable from node, denoted as, if there exists a path from to. A graph is said to be strongly connected if. A matrix is called irreducible if its communication graph is strongly connected, when this is not the case matrix is called reducible.
Remark 27 In this paper irreducible matrices are just considered. It is possible to treat the reducible case by transforming it into its normal form and computing its generalized eigenmode see [5].
Spectral Theory and Linear Equations
Definition 28 Let be a matrix. If is a scalar and is a vector that contains at least one finite element such that: then, is called an eigenvalue and an eigenvector.
Let denote the set of all elementary circuits in and write: for the maximal
average circuit weight. Notice that since is a finite set, the maximum is attained (which is always the case when matrix is irreducible). In case define.
Definition 29 A circuit is said to be critical if its average weight is maximal. The critical graph of, denoted by, is the graph consisting of those nodes and arcs that belong to critical circuits in.
Theorem 30 If is irreducible, then there exists one and only one finite eigenvalue (with possible several eigenvectors). This eigenvalue is equal to the maximal average weight of circuits in .
Theorem 31 Let and. If the communication graph has maximal average circuit
weight less than or equal to, then solves the equation. Moreover, if the circuit weights in are negative then, the solution is unique.
3.3. Max-Plus Recurrence Equations for Timed Event Petri Nets
Definition 32 Let for and for;. Then, the recurrence equation: is called an Mth order recurrence equation.
Theorem 33 The Mth order recurrence equation, given by equation, can be transformed into a first order recurrence equation; provided that has circuit weights less than or equal to zero.
With any timed event Petri net, matrices can be defined by setting, where is the largest of the holding times with respect to all places between transitions and with tokens, for, with equal to the maximum number of tokens with respect to all places. Let denote the kth time that transition fires, then the vector, called the
state of the system, satisfies the Mth order recurrence equation:. Now, assuming that all the hypothesis of theorem (33) are satisfied, and setting, equation can be expressed as:, which is known as the standard autonomous equation.
4. The Solution to the Stability Problem for Discrete Event Dynamical Systems Modeled with Timed Petri Nets
Definition 34 A TPN is said to be stable if all the transitions fire with the same proportion i.e., if there exists such that
This means that in order to obtain a stable all the transitions have to be fired times. It will be desirable to be more precise and know exactly how many times. The answer to this question is given next.
Lemma 35 Consider the recurrence relation, arbitrary. an irreducible matrix and its eigenvalue then,
Proof. Let be an eigenvector of such that then,
Now starting with an unstable, collecting the results given by: proposition (13), what has just been discussed about recurrence equations for at the end of subsection (3.3) and the previous lemma (35) plus theorem (30), the solution to the problem is obtained.
5. Conclusion
The main objective of the proposal is to make it knowledgeable to large audiences. This paper gives a complete and precise solution to the stabilization problem for discrete event systems modeled with timed Petri nets combining Lyapunov theory with max-plus algebra. The presented methodology results to be innovative.
Cite this paper
Zvi Retchkiman Konigsberg, (2015) The Relation between the Stabilization Problem for Discrete Event Systems Modeled with Timed Petri Nets via Lyapunov Methods and Max-Plus Algebra. Journal of Applied Mathematics and Physics,03,839-845. doi: 10.4236/jamp.2015.37104
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