In potential games, the best-reply dynamics results in the existence of a cost function such that each player’s best-reply set equals the set of minimizers of the potential given by the opponents’ strategies. The study of sequential best-reply dynamics dates back to Cournot and, an equilibrium point which is stable under the game’s best-reply dynamics is commonly said to be Cournot stable. However, it is exactly the best-reply behavior that we obtain using the Lyapunov notion of stability in game theory. In addition, Lyapunov theory presents several advantages. In this paper, we show that the stability conditions and the equilibrium point properties of Cournot and Lyapunov meet in potential games
The talk presents some concepts and results from systems and control theory, focusing on convergence...
Game theory is widely used as a behavioral model for strategic interactions in biology and social sc...
This article is devoted to various methods (optimal transport, fixed-point, ordinary differential eq...
In normal form games with single-valued best reply functions it is shown that dominance-solvability ...
We study what topological assumptions should be added to the acyclicity of individual best response ...
In the first chapter we present some proofs of the existence of the minimax point of a strategic gam...
We introduce the concept of a Lyapunov game as a subclass of strictly dominated games and potential ...
We introduce the concept of a Lyapunov game as a subclass of strictly dominated games and potential ...
Conditions for the Cournot equilibrium to be locally asymptotically stable or unstable are explored,...
We present a general result on the convergence to an equilibrium of class of dynamic adjustment proc...
We show that the Cournot oligopoly game with non-linear market demand can be reformulated as a best-...
This paper models the indirect evolution of the preferences of a population of fully rational agents...
In this paper we present a general result on the convergence to an equilibrium of a class of dynamic...
Best-reply behavior in Cournot oligopolies generally leads to Cournot-Nash equilibrium, but imitativ...
This paper models the indirect evolution of the preferences of a population of fully rational agents...
The talk presents some concepts and results from systems and control theory, focusing on convergence...
Game theory is widely used as a behavioral model for strategic interactions in biology and social sc...
This article is devoted to various methods (optimal transport, fixed-point, ordinary differential eq...
In normal form games with single-valued best reply functions it is shown that dominance-solvability ...
We study what topological assumptions should be added to the acyclicity of individual best response ...
In the first chapter we present some proofs of the existence of the minimax point of a strategic gam...
We introduce the concept of a Lyapunov game as a subclass of strictly dominated games and potential ...
We introduce the concept of a Lyapunov game as a subclass of strictly dominated games and potential ...
Conditions for the Cournot equilibrium to be locally asymptotically stable or unstable are explored,...
We present a general result on the convergence to an equilibrium of class of dynamic adjustment proc...
We show that the Cournot oligopoly game with non-linear market demand can be reformulated as a best-...
This paper models the indirect evolution of the preferences of a population of fully rational agents...
In this paper we present a general result on the convergence to an equilibrium of a class of dynamic...
Best-reply behavior in Cournot oligopolies generally leads to Cournot-Nash equilibrium, but imitativ...
This paper models the indirect evolution of the preferences of a population of fully rational agents...
The talk presents some concepts and results from systems and control theory, focusing on convergence...
Game theory is widely used as a behavioral model for strategic interactions in biology and social sc...
This article is devoted to various methods (optimal transport, fixed-point, ordinary differential eq...