Uniqueness for nonlinear Fokker-Planck equations and for McKean-Vlasov SDEs: The degenerate case

Abstract

This work is concerned with the existence and uniqueness of generalized (mild or distributional) solutions to (possibly degenerate) Fokker-Planck equations t-β()+ div(Db())=0 in (0,∞)×Rd, (0,x) 0(x). Under suitable assumptions on β:R,\,b:R and D:Rdd, d1, this equation generates a unique flow (t)=S(t)0:[0,∞) L1(Rd) as a mild solution in the sense of nonlinear semigroup theory. This flow is also unique in the class of L∞((0,T)×Rd) L1((0,T)×Rd), ∀ T>0, Schwartz distributional solutions on (0,∞)×Rd. Moreover, for 0∈ L1(Rd) H-1(Rd), t S(t)0 is differentiable from the right on [0,∞) in H-1(Rd)-norm. As a main application, the weak uniqueness of the corresponding McKean-Vlasov SDEs is proven.