Stochastic Control of Memory Mean-Field Processes

Abstract

By a memory mean-field process we mean the solution X(·) of a stochastic mean-field equation involving not just the current state X(t) and its law L(X(t)) at time t, but also the state values X(s) and its law L(X(s)) at some previous times s<t. Our purpose is to study stochastic control problems of memory mean-field processes. - We consider the space M of measures on R with the norm || ·||M introduced by Agram and ksendal in AO1, and prove the existence and uniqueness of solutions of memory mean-field stochastic functional differential equations. - We prove two stochastic maximum principles, one sufficient (a verification theorem) and one necessary, both under partial information. The corresponding equations for the adjoint variables are a pair of (time-) advanced backward stochastic differential equations, one of them with values in the space of bounded linear functionals on path segment spaces. - As an application of our methods, we solve a memory mean-variance problem as well as a linear-quadratic problem of a memory process.