The main purpose of this paper is to prove that if there is a non-expansive map relating the sets of optimal strategies for a convex polynomial game, then there exists only one optimal strategy for solving that game. We introduce the remark that those sets are semi-algebraic. This is a natural and important property deduced from the polynomial payments. This property allows us to construct the space of strategies with an infinite number of semi-algebraic curves. We semi-algebraically decompose the set of strategies and relate them with non-expansive maps. By proving the existence of an unique fixed point in these maps, we state that the solution of zero-sum convex polynomial games is determined in the space of strategies
Zero-determinant (ZD) strategies, a recently found novel class of strategies in repeated games, has ...
We prove a generalization of von Neumann's minmax theorem to the class of separable multiplayer zero...
Abstract—Motivated by recent work on computing Nash equilibria in two-player zero-sum games with pol...
The main purpose of this paper is to prove that if there is a non-expansive map relating the sets of...
AbstractTwo-player, zero-sum, non-cooperative, blindfold games in extensive form with incomplete inf...
In the zero-sum (non-zero sum) completely mixed game each player has only one optimal (equilibrium) ...
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21 pagesInternational audienceWe introduce two min-max problems: the first problem is to minimize th...
We apply linear and non-linear programming to find the solutions for Nash equilibriums and Nash arbi...
AbstractA 2-person zero-sum game with the payoff function being a sum of two linear functions and a ...
We define a class of zero-sum games with combinatorial structure, where the best response problem of...
As is well known, zero-sum games are appropriate instruments for the analysis of several issues acro...
The purpose of the thesis is the examination of the Minimax Theorem of the Theory of Games. Consider...
This paper presents a case study for the application of semiring semantics for fixed-point formulae ...
We introduce and study the class of semidefinite games, which generalizes bimatrix games and finite ...
Zero-determinant (ZD) strategies, a recently found novel class of strategies in repeated games, has ...
We prove a generalization of von Neumann's minmax theorem to the class of separable multiplayer zero...
Abstract—Motivated by recent work on computing Nash equilibria in two-player zero-sum games with pol...
The main purpose of this paper is to prove that if there is a non-expansive map relating the sets of...
AbstractTwo-player, zero-sum, non-cooperative, blindfold games in extensive form with incomplete inf...
In the zero-sum (non-zero sum) completely mixed game each player has only one optimal (equilibrium) ...
AbstractIn this paper we consider n-person games in which each player has a convex strategy set over...
21 pagesInternational audienceWe introduce two min-max problems: the first problem is to minimize th...
We apply linear and non-linear programming to find the solutions for Nash equilibriums and Nash arbi...
AbstractA 2-person zero-sum game with the payoff function being a sum of two linear functions and a ...
We define a class of zero-sum games with combinatorial structure, where the best response problem of...
As is well known, zero-sum games are appropriate instruments for the analysis of several issues acro...
The purpose of the thesis is the examination of the Minimax Theorem of the Theory of Games. Consider...
This paper presents a case study for the application of semiring semantics for fixed-point formulae ...
We introduce and study the class of semidefinite games, which generalizes bimatrix games and finite ...
Zero-determinant (ZD) strategies, a recently found novel class of strategies in repeated games, has ...
We prove a generalization of von Neumann's minmax theorem to the class of separable multiplayer zero...
Abstract—Motivated by recent work on computing Nash equilibria in two-player zero-sum games with pol...