Abstract
We consider a non zero sum stochastic differential game with a maximum n players, where the players control a diffusion in order to minimise a certain cost functional. During the game it is possible that present players may die or new players may appear. The death, respectively the birth time of a player is exponentially distributed with intensities that depend on the diffusion and the controls of the players who are alive. We show how the game is related to a system of partial differential equations with a special coupling in the zero order terms. We provide an existence result for solutions in appropriate spaces that allow to construct Nash optimal feedback controls. The paper is related to a previous result in a similar setting for two players leading to a parabolic system of Bellman equations [4]. Here, we study the elliptic case (infinite horizon) and present the generalisation to more than two players.
Keywords
Systems of PDE; L∞ estimates; regularity; stochastic differential games; controlled birth/death processes;
Reference
Alain Bensoussan, Jens Frehse, and Christine Grün, “Stochastic differential games with a varying number of players”, Communications on Pure and Applied Analysis, vol. 13, September 2014, pp. 1719–1736.
See also
Published in
Communications on Pure and Applied Analysis, vol. 13, September 2014, pp. 1719–1736