21 pagesInternational audienceWe introduce two min-max problems: the first problem is to minimize the supremum of finitely many rational functions over a compact basic semi-algebraic set whereas the second problem is a 2-player zero-sum polynomial game in randomized strategies and with compact basic semi-algebraic pure strategy sets. It is proved that their optimal solution can be approximated by solving a hierarchy of semidefinite relaxations, in the spirit of the moment approach developed in Lasserre. This provides a unified approach and a class of algorithms to approximate all Nash equilibria and min-max strategies of many static and dynamic games. Each semidefinite relaxation can be solved in time which is polynomial in its input size a...
Computing solution concepts in games is an important endeavor in the field of algorithmic game theor...
We present a polynomial time algorithm based on semidefinite programming that, given a unique game o...
Koller, Megiddo and von Stengel showed how to efficiently compute minimax strategies for two-player ...
21 pagesInternational audienceWe introduce two min-max problems: the first problem is to minimize th...
We introduce and study the class of semidefinite games, which generalizes bimatrix games and finite ...
We define a class of zero-sum games with combinatorial structure, where the best response problem of...
Minimizing a polynomial function over a region defined by polynomial inequalities models broad class...
We consider the problem of global minimization of rational functions on (unconstrained case), and on...
We develop an efficient algorithm for computing pure strategy Nash equilibria that satisfy various c...
Minimizing a polynomial function over a region defined by polynomial inequalities models broad class...
International audienceWe consider the problem of globally minimizing the sum of many rational functi...
In this paper we propose a new methodology for determining approximate Nash equilibria of non-cooper...
We present, to our knowledge, the first mixed integer program (MIP) formulations for finding Nash equi...
Significant work has been done on computational aspects of solving games under various solution conc...
Computing solution concepts in games is an important endeavor in the field of algorithmic game theor...
We present a polynomial time algorithm based on semidefinite programming that, given a unique game o...
Koller, Megiddo and von Stengel showed how to efficiently compute minimax strategies for two-player ...
21 pagesInternational audienceWe introduce two min-max problems: the first problem is to minimize th...
We introduce and study the class of semidefinite games, which generalizes bimatrix games and finite ...
We define a class of zero-sum games with combinatorial structure, where the best response problem of...
Minimizing a polynomial function over a region defined by polynomial inequalities models broad class...
We consider the problem of global minimization of rational functions on (unconstrained case), and on...
We develop an efficient algorithm for computing pure strategy Nash equilibria that satisfy various c...
Minimizing a polynomial function over a region defined by polynomial inequalities models broad class...
International audienceWe consider the problem of globally minimizing the sum of many rational functi...
In this paper we propose a new methodology for determining approximate Nash equilibria of non-cooper...
We present, to our knowledge, the first mixed integer program (MIP) formulations for finding Nash equi...
Significant work has been done on computational aspects of solving games under various solution conc...
Computing solution concepts in games is an important endeavor in the field of algorithmic game theor...
We present a polynomial time algorithm based on semidefinite programming that, given a unique game o...
Koller, Megiddo and von Stengel showed how to efficiently compute minimax strategies for two-player ...