One answers to an open question of Herings et al. (2008), by proving that their fixed point theorem for discontinuous functions works for mappings defined on convex compact subset of $\R^n$, and not only polytopes. This fixed point theorem can be applied to the problem of Nash equilibrium existence in discontinuous games
. We prove a generalization of Brouwer's famous fixed point theorem to discontinuous maps. The ...
International audienceThis paper offers an equilibrium existence theorem in discontinuous games. We ...
We introduce a notion of variational convergence for sequences of games and we show that the Nash eq...
One answers to an open question of Herings et al. (2008), by proving that their fixed point theorem ...
One answers to an open question of Herings et al. (2008), by prov-ing that their fixed point theorem...
International audienceOne answers to an open question of Herings et al. (2008), by proving that thei...
URL des Documents de travail :<br />http://ces.univ-paris1.fr/cesdp/CESFramDP2007.htmDocuments de tr...
Any function from a non-empty polytope into itself that is locally gross direction preserving is sho...
Any function from a non-empty polytope into itself that is locally gross direction preserving is sho...
In this note, we prove an equilibrium existence theorem for games with discontinuous payoffs and con...
In this note we prove an equilibrium existence theorem for games with discontinuous pay-offs and con...
Abstract. We show that games with compact and convex strategy sets have pure strategy Nash equilibri...
We provide a pure Nash equilibrium existence theorem for games with discontinuous payoffs whose hypo...
We provide a pure Nash equilibrium existence theorem for games with discontinuous payoffs whose hypo...
Abstract: We provide a Nash equilibrium existence theorem for games with discontinuous payoffs whose...
. We prove a generalization of Brouwer's famous fixed point theorem to discontinuous maps. The ...
International audienceThis paper offers an equilibrium existence theorem in discontinuous games. We ...
We introduce a notion of variational convergence for sequences of games and we show that the Nash eq...
One answers to an open question of Herings et al. (2008), by proving that their fixed point theorem ...
One answers to an open question of Herings et al. (2008), by prov-ing that their fixed point theorem...
International audienceOne answers to an open question of Herings et al. (2008), by proving that thei...
URL des Documents de travail :<br />http://ces.univ-paris1.fr/cesdp/CESFramDP2007.htmDocuments de tr...
Any function from a non-empty polytope into itself that is locally gross direction preserving is sho...
Any function from a non-empty polytope into itself that is locally gross direction preserving is sho...
In this note, we prove an equilibrium existence theorem for games with discontinuous payoffs and con...
In this note we prove an equilibrium existence theorem for games with discontinuous pay-offs and con...
Abstract. We show that games with compact and convex strategy sets have pure strategy Nash equilibri...
We provide a pure Nash equilibrium existence theorem for games with discontinuous payoffs whose hypo...
We provide a pure Nash equilibrium existence theorem for games with discontinuous payoffs whose hypo...
Abstract: We provide a Nash equilibrium existence theorem for games with discontinuous payoffs whose...
. We prove a generalization of Brouwer's famous fixed point theorem to discontinuous maps. The ...
International audienceThis paper offers an equilibrium existence theorem in discontinuous games. We ...
We introduce a notion of variational convergence for sequences of games and we show that the Nash eq...