Abstract

The objective of this paper is to present a novel idea about the continuous possibilistic cooperative static game (Poss-CCSTG). The proposed Poss-CCSTG is a continuous cooperative static game (CCSTG) in which parameter associated with the cost functions of the players involves the possibility measures. The considered Poss-CCSTG is converted into the crisp α-CCSTG problem by using the α-cuts and hence into the multiple objective nonlinear programming problem. To solve the formulated α-CCSTG problem, an interactive approach is presented in the study with the use of the reference direction method. Further, the Lexicographic weighted Tchebycheff model is derived to obtain the weights. Also, a parametric study corresponding to the α-possibly optimal solution is defined and determined. Finally, a decision-maker can compare their desired solution with the attainable reference point and the weak efficient solution. The presented model is illustrated with a numerical example and its advantages are stated.

1. Introduction

Game theory is one of the essential theories in optimization techniques. It plays a vital role in many engineering fields such as Economics, Engineering, Biology, computational engineering, and other mathematical sciences with many applications in real-world problems [1]. The most crucial types of games are differential games, matrix games, and continuous static games. Matrix games derive their name from a discrete relationship between a finite/countable number of possible decisions and the related costs. The connection is conveniently represented in a matrix (or two-player games) where one player’s decision corresponds to the selection of a row and the other player’s decision to select a column, with the corresponding entries denoting the costs. It is intense that decision probabilities are not mandatory in cooperative games. In addition, there is no time in the relationship between costs and decisions in static games. Differential games are identified by continuously varying costs and a dynamic system controlled by ordinary differential equations. For continuous static games, there are several solution concepts. How players use these concepts depends not only on information concerning the nature of the other players but also on their personality. A given player may or may not play rationally, cheat, cooperate, bargain, and so on. A player making the ultimate choice of their control vector must consider all of these factors. Thomas and Walter [2] introduced different formulations in continuous static games. The three basic solution concepts for these games are as follows:(1)Nash equilibrium solution(2)Min-max solutions(3)Pareto minimal solutions

In our day-to-day life, uncertainties play a dominant role and occur almost in each sector. To handle it, Zadeh [3] stated the innovative concept of fuzzy set which relates every component of the universal set to a unique real number, called membership degree. By using a fuzzification principle, Dubois and Prade [4] expanded the applications of algebraic operations on real numbers to fuzzy numbers. Bellman and Zadeh [5] developed decision-making in a fuzzy environment, which improved the management decision problems. Kaufmann and Gupta [6] worked on various fuzzy mathematical models with their applications in management sciences and engineering. Ebrahimnejad [7] presented an algorithm for solving the fully fuzzy linear programming problems. Osman [8] formulated different parametric problems of continuous static games. Osman et al. proposed Stackelberg leader with min-max follower’s solution [9] to solve continuous static games with fuzzy parameters and introduced the parametric analysis for the solution. For large scale, continuous static games with parameters in all cost functions and limitations, Osman et al. [10] developed the Nash equilibrium solution. In this type of game, the players are independent without participation with any other players, and every player seeks to minimize their cost functions. In addition, the information that is available to every player contains the cost functions and constraints. To solve Nash Cooperative Continuous Static Games, Elshafei [11] established an interactive approach and fixed on the first-kind corresponding’s stability set to the obtained compromise solution. Several articles were developed for the game’s theory by an enormous of research, and for more details about such studies, we refer to read the articles mentioned in [12–21]. Shuler [22] looked at cooperative games in which the impoverished agents profiting from collaboration with the wealthy is not applicable. Khalifa and Kumar [23] studied the cooperative continuous static games in a crisp environment, defined them, and found the first-kind stability set corresponding to the solution without differentiability. Several researchers [24–29] have recently enriched the theory of cooperative games by considering the degree of uncertainties in the analysis.

The present work studies the concept of continuous static games (CSG) under an uncertain environment by keeping the above literature in mind. For this, CSG is considered under the possibilistic environment in the study. In this game, it is supposed that every player helps the others up to the point of disadvantages to himself. To discuss it in detail, a concept of Pareto optimal solution is discussed in which cooperation between all of the players is taken into account. To handle the uncertainties in the game theory, a concept of the continuous possibilistic cooperative static game (Poss-CCSTG) is proposed. The proposed Poss-CCSTG is a continuous cooperative static game (CCSTG) in which the cost functions associated with m players involve the possibility measures. By using the concept of the α-cuts, the considered Poss-CCSTG is converted into the crisp α-CCSTG problem and hence into the multiple objective nonlinear programming problem. To solve the formulated α-CCSTG problem, an interactive approach is presented in the study with the use of the reference direction method. Furthermore, the α-Parametric efficient solution for players’ cooperation is discussed in the study. The main objective of the study is considered as(1)An idea related to the CCSTG with possibilistic parameters associated with the cost functions of the m players is discussed. To handle the uncertainties in the model and a conflicting nature between the objectives, a possibilistic variable which is categorized by a possibilistic distribution for is taken in the study.(2)α-possibly efficient solution, α-parametric efficient solution, and the relationship between them for a Poss-CCSTG are characterized.(3)An interactive algorithm is presented to solve the Poss-CCSTG by considering the decision-maker’s preference.(4)The first-kind stability set that corresponds to the solution is conceptuaized.(5)A numerical example is provided to validate the proposed study. Also, a characteristic comparison of the proposed study over several other existing studies is examined.

The organization of the article is summarized in Figure 1.

Figure 1 

Structure of the paper.

2. Preliminaries

In this section, we recall the basic definitions related to possibilistic variables and their properties. Let V be a universal set.

Definition 1 (see [30, 31]). A possibilistic variable on is a variable categorized by a possibility distribution .
In other words, we can say that if is a variable taking values in then corresponding to may be viewed as a fuzzy constraint. Such a distribution is characterized by a possibility distribution function which is associated with each the degree of compatibility of with the realization

Remark 1. If is a Cartesian product of , then is an ary possibility distribution, i.e., .

Definition 2 (see [30]). The α-level set of possibilistic variable is defined as

Definition 3 (see [30]). A possibility distribution on is said to be convex if

Definition 4 (see [31]). The support of a possibilistic variable is defined aswhere .

Remark 2 (see [30]). is closed set on

3. Formulation of the Problem with Possibilistic Variables

In this section, we present the concept of the Poss-CCSTG with players. Consider a game problem with players having possibilistic parameters in the cost functions aswhere , are convex functions on , , are concave functions on , stated as are convex functions on and is a possibilistic ary, i.e., , are possibilistic variables on characterized by the possibilistic distributions (Luhandjula [32, 33]). If the functions are differentiable, then the Jacobian , in a neighborhood of a solution point to (2). is the solution to (2) generated by It is noted her that the differentiability assumptions are not needed for the functions and . is a regular and compact set.

The considered Poss-CCSTG model defined in equations (4)–(6) transforms into α-CCSTG based on a certain degree as

Here, it should be noted that in problem (7), the parameters , are decision variables not constants.

Definition 5. Let denote the solution to (5) generated by A point is said to be possibly efficient solution to the (4) if and only if there does not exist such that for some where are level minimal parameters.
From the concept of possibly efficient solution to the , one can see that is an possibly efficient solution to the problem (7), if and only if is an parametric efficient solution to the following possibilistic multiobjective nonlinear programming ( MONLP) problem (Vincent and Grantham [2]).where , are convex functions on and , are concave functions on , and . is the cut of .
By the convexity assumption, , are real intervals denoted by , Then, clearly, the can be rewritten as follows:

Definition 6. is an parametric efficient solution for if and only if there is no and such that and for at least one

Theorem 1. is an possibly efficient solution for Poss-CCSTG if and only if is an parametric efficient solution for

Proof:. Necessity.
Let be an possibly efficient solution for Poss-CCSTG and be not parametric efficient solution for . Then, there are and , i = 1,2, …, m, such thatAs , we get Poss .
This contradicts the possibly efficient solution of Poss-CCSTG.
Let be an parametric efficient solution for and be not possibly efficient solution of Poss-CCSTG. Then, there are and such that Poss .whereFor the supremum to be exist, there is with , thenThis contradicts equation (6).
Hence, there is satisfyingFrom (16) and (17), we conclude to the contradiction that is an parametric efficient solution for .

4. Solution Approach

This section stated the interactive solution procedure for solving the above formulated possibilistic models. The steps of the proposed approach are summarized as follows: Step 1. Formulate the problem, after the decision-maker specifies the initial value of . Step 2. Solve the following problem: After solving this model, assume be its optimum value. Step 3. Given initial reference point. Decision-maker provides an initial attainable reference point such that . Let  Step 4. Search for a reference possibly efficient solution. Let Then, consider the following Lexicographic weighted Tchebycheff program (LEWT): After solving this LEWT model, we get the possibly optimal solution as .  Step 5. Termination determination: When the decision-maker satisfies with the obtained solution , then stop the process with as the final solution. On the other hand, when decision-maker is not satisfied with and or , then there is no satisfactory possibly efficient reference solution of . In that case, we proceed to Step 6. Step 6. Modification of reference point by DM is as follows:(a)DM chooses any in such that is an unsatisfactory objective in at . Let . Separate into the following two parts:(b)For , the decision-maker provides , be the amount to be relaxed for , such that . Let . For , let . For , let (c)In the case of , return to (a) to separate again or to raise the amount to be relaxed for some at , go to (b) if the DM wishes to do that. Otherwise, stop and there is no satisfactory possibly optimal solution. In this case, we have , for some , go to (d).(d)Let , and solve the auxiliary problem (AP) as follows (AP) : Let be the satisfactory possibly optimal solution. When or for objective is not satisfactory to the DM, return to (b) to increase the amount to be relaxed for some at if the DM wishes; otherwise, stop and there is no satisfactory possibly optimal solution. When and is satisfactory to the DM for objective , the DM provides , the largest amount to be improved for such that . Let .(e)If , let and return to step (c). Otherwise, let , and return to (d) when is a unique possibly optimal solution of (AP) or let be an possibly optimal solution of the following problem: Let , and return to (c). If , put , and return to Step 4. Step 7. Determine the first-kind stability set by applying the following conditions: