Add to ORKGWe consider n–person normal form games where the strategy set of each player is a non–empty compact convex subset of a Euclidean space, and the payoff function of player i is continuous in joint strategies and continuously differentiable and concave in player i’s strategy. No further restrictions (such as multilinearity of the payoff functions or the requirement that the strategy sets be polyhedral) are imposed. We demonstrate that the graph of the Nash equilibrium correspondence on this domain is homeomorphic to the space of games. This result generalizes a well–known structure theorem in Kohlberg and Mertens [7]. It is supplemented by an extension analogous to the unknottedness theorems in Demichelis and Germano ([3] and [4]): the graph o...
Economics and game theory are replete with examples of parameterized games. We show that all minimal...
AbstractIn this paper we generalize Berge's Maximum Theorem to the case where the payoff (utility) f...
We consider generalized Nash equilibrium problems (GNEP) from a structural and computational point o...
I consider n-person normal form games where the strategy set of each player is a non-empty compact c...
We consider n--person normal form games where the strategy set of each player is a non--empty compac...
We extend Kohlberg and Mertens' (1986) structure theorem concerning the Nash equilibrium corresponde...
We introduce a new complete metric space of discontinuous normal form games and prove that the Nash ...
We introduce a procedure that uses basic topological characteristics of equilibrium correspondences ...
Abstract. We show that games with compact and convex strategy sets have pure strategy Nash equilibri...
This paper is concerned both with the comparative geometry of Nash and correlated equilibria, and wi...
It has been an open conjecture in the theory of non-cooperative games that Nash equilibrium is unive...
In this paper we generalize Berge's Maximum Theorem to the case where the payoff (utility) functions...
We describe algorithms for computing Nash equilibria in structured game representations, including b...
We present a general existence result for a type of equilibrium in normal-form games, which extends ...
B-convexity is defined as a suitable Peano-Kuratowski limit of linear convexities. An alternative id...
Economics and game theory are replete with examples of parameterized games. We show that all minimal...
AbstractIn this paper we generalize Berge's Maximum Theorem to the case where the payoff (utility) f...
We consider generalized Nash equilibrium problems (GNEP) from a structural and computational point o...
I consider n-person normal form games where the strategy set of each player is a non-empty compact c...
We consider n--person normal form games where the strategy set of each player is a non--empty compac...
We extend Kohlberg and Mertens' (1986) structure theorem concerning the Nash equilibrium corresponde...
We introduce a new complete metric space of discontinuous normal form games and prove that the Nash ...
We introduce a procedure that uses basic topological characteristics of equilibrium correspondences ...
Abstract. We show that games with compact and convex strategy sets have pure strategy Nash equilibri...
This paper is concerned both with the comparative geometry of Nash and correlated equilibria, and wi...
It has been an open conjecture in the theory of non-cooperative games that Nash equilibrium is unive...
In this paper we generalize Berge's Maximum Theorem to the case where the payoff (utility) functions...
We describe algorithms for computing Nash equilibria in structured game representations, including b...
We present a general existence result for a type of equilibrium in normal-form games, which extends ...
B-convexity is defined as a suitable Peano-Kuratowski limit of linear convexities. An alternative id...
Economics and game theory are replete with examples of parameterized games. We show that all minimal...
AbstractIn this paper we generalize Berge's Maximum Theorem to the case where the payoff (utility) f...
We consider generalized Nash equilibrium problems (GNEP) from a structural and computational point o...