Nonlinear Fokker-Planck equations for Probability Measures on Path Space and Path-Distribution Dependent SDEs

Abstract

By investigating path-distribution dependent stochastic differential equations, the following type of nonlinear Fokker--Planck equations for probability measures (μt)t ≥ 0 on the path space C:=C([-r0,0]; Rd), is analyzed: ∂t μ(t)=Lt,μt*μt,\ \ t 0, where μ(t) is the image of μt under the projection C (0)∈ Rd, and Lt,μ():= 1 2Σi,j=1d aij(t,,μ)∂2 ∂(0)i ∂(0)j +Σi=1d bi(t,,μ)∂∂(0)i,\ \ t 0, ∈ C, μ∈ P C. Under reasonable conditions on the coefficients aij and bi, the existence, uniqueness, Lipschitz continuity in Wasserstein distance, total variational norm and entropy, as well as derivative estimates are derived for the martingale solutions.