The ergodicity of nonlinear Fokker-Planck flows in L1( Rd)

Abstract

One proves in this work that the nonlinear semigroup S(t) in L1( Rd), d≥ 3, associated with the nonlinear Fokker-Planck equation ut-β(u)+div(Db(u)u)=0, u(0)=u0 in (0,∞)× Rd, under suitable conditions on the coefficients β: R R, D: Rd Rd and b: R R, is mean ergodic. In particular, this implies the mean ergodicity of the time marginal laws of the solutions to the corresponding McKean-Vlasov stochastic differential equation. This completes the results established in [7] on the nature of the corresponding omega-set ω(u0) for S(t) in the case where the flow S(t) in L1( Rd) has not a fixed point and so the corresponding stationary Fokker-Planck equation has no solutions.