Mean-field stochastic differential equations and associated PDEs

Abstract

In this paper we consider a mean-field stochastic differential equation, also called Mc Kean-Vlasov equation, with initial data (t,x)∈[0,T]× Rd, which coefficients depend on both the solution Xt,xs but also its law. By considering square integrable random variables as initial condition for this equation, we can easily show the flow property of the solution Xt,s of this new equation. Associating it with a process Xt,x,P_s which coincides with Xt,s, when one substitutes for x, but which has the advantage to depend only on the law P of , we characterise the function V(t,x,P)=E[(Xt,x,P_T,PXt,T)] under appropriate regularity conditions on the coefficients of the stochastic differential equation as the unique classical solution of a non local PDE of mean-field type, involving the first and second order derivatives of V with respect to its space variable and the probability law. The proof bases heavily on a preliminary study of the first and second order derivatives of the solution of the mean-field stochastic differential equation with respect to the probability law and a corresponding It\o formula. In our approach we use the notion of derivative with respect to a square integrable probability measure introduced in PL and we extend it in a direct way to second order derivatives.