Add to ORKGWe show that the problem of finding an approximate Nash equilibrium with a polynomial precision is PPAD-hard even for two-player sparse win-lose games (i.e., games with {0,1}-entries such that each row and column of the two n×n payoff matrices have at most O(log n) many ones). The proof is mainly based on a new class of prototype games called Chasing Games, which we think is of independent interest in understanding the complexity of Nash equilibrium
It is known that finding a Nash equilibrium for win-lose bimatrixgames, i.e., two-player garnes wher...
It is known that finding a Nash equilibrium for win-lose bimatrixgames, i.e., two-player garnes wher...
We investigate complexity issues related to pure Nash equilibria of strategic games. We show that, e...
A two-player game is sparse if most of its payoff entries are zeros. We show that the problem of com...
We show that computing a relatively (i.e. multiplicatively as opposed to additively) approximate Nas...
We prove the existence of -Nash equilibrium strategies with support logarithmic in the number of pur...
How long does it take until economic agents converge to an equilibrium? By studying the complexity o...
It is known that finding a Nash equilibrium for win-lose bimatrix games, i.e., two-player games wher...
Nash equilibrium is the central solution concept in Game Theory. Since Nash's original paper in 1951...
Nash equilibrium is the central solution concept in Game Theory. Since Nash's original paper in 1951...
By proving that the problem of computing a 1=n(1)-approximate Nash equilibrium remains PPAD-complete...
The quest for a PTAS for Nash equilibrium in a two-player game seeks to circumvent the PPAD-complete...
It is known [5] that an additively -approximate Nash equi-librium (with supports of size at most two...
We study the computational complexity of deciding the existence of a Pure Nash Equilibrium in multi-...
We know that k -Uniform Nash is W[2]-Complete when we consider imitation symmetric win-lose games (w...
It is known that finding a Nash equilibrium for win-lose bimatrixgames, i.e., two-player garnes wher...
It is known that finding a Nash equilibrium for win-lose bimatrixgames, i.e., two-player garnes wher...
We investigate complexity issues related to pure Nash equilibria of strategic games. We show that, e...
A two-player game is sparse if most of its payoff entries are zeros. We show that the problem of com...
We show that computing a relatively (i.e. multiplicatively as opposed to additively) approximate Nas...
We prove the existence of -Nash equilibrium strategies with support logarithmic in the number of pur...
How long does it take until economic agents converge to an equilibrium? By studying the complexity o...
It is known that finding a Nash equilibrium for win-lose bimatrix games, i.e., two-player games wher...
Nash equilibrium is the central solution concept in Game Theory. Since Nash's original paper in 1951...
Nash equilibrium is the central solution concept in Game Theory. Since Nash's original paper in 1951...
By proving that the problem of computing a 1=n(1)-approximate Nash equilibrium remains PPAD-complete...
The quest for a PTAS for Nash equilibrium in a two-player game seeks to circumvent the PPAD-complete...
It is known [5] that an additively -approximate Nash equi-librium (with supports of size at most two...
We study the computational complexity of deciding the existence of a Pure Nash Equilibrium in multi-...
We know that k -Uniform Nash is W[2]-Complete when we consider imitation symmetric win-lose games (w...
It is known that finding a Nash equilibrium for win-lose bimatrixgames, i.e., two-player garnes wher...
It is known that finding a Nash equilibrium for win-lose bimatrixgames, i.e., two-player garnes wher...
We investigate complexity issues related to pure Nash equilibria of strategic games. We show that, e...