State-Density Flows of Non-Degenerate Density-Dependent Mean Field SDEs and Associated PDEs

Abstract

In this paper, we study a combined system of a Fokker-Planck (FP) equation for mt,μ with initial (t,μ)∈[0,T]× L2(Rd), and a stochastic differential equation for Xt,x,μ with initial (t,x)∈[0,T]× Rd, whose coefficients depend on the solution of FP equation. We develop a combined probabilistic and analytical method to explore the regularity of the functional V(t,x,μ)=E[(Xt,x,μT,mt,μ(T,·))]. Our main result states that, under a non-degenerate condition and appropriate regularity assumptions on the coefficients, the function V is the unique classical solution of a nonlocal partial differential equation of mean-field type. The proof depends heavily on the differential properties of the flow μ (mt,μ, Xt,x,μ) over μ∈ L2(Rd). We also give an example to illustrate the role of our main result. Finally, we give a discussion on the L1 choice case in the initial μ.