Working paper

From Nash to Cournot-Nash equilibria via the Monge-Kantorovich problem

Adrien Blanchet, and Guillaume Carlier

Abstract

The notion of Nash equilibria plays a key role in the analysis of strategic interactions in the framework of N player games. Analysis of Nash equilibria is however a complex issue when the number of players is large. In this article we emphasize the role of optimal transport theory in: 1) the passage from Nash to Cournot-Nash equilibria as the number of players tends to infinity, 2) the analysis of Cournot-Nash equilibria.

Keywords

Nash equilibria; games with a continuum of players; Cournot-Nash equilibria; Monge-Kantorovich optimal transportation problem;

Replaced by

Adrien Blanchet, and Guillaume Carlier, From Nash to Cournot–Nash equilibria via the Monge–Kantorovich problem, Philosophical Transactions of the Royal Society A, vol. 372, n. 2028, October 6, 2014.

Reference

Adrien Blanchet, and Guillaume Carlier, From Nash to Cournot-Nash equilibria via the Monge-Kantorovich problem, TSE Working Paper, n. 14-490, May 2014.

See also

Published in

TSE Working Paper, n. 14-490, May 2014