The evolution to equilibrium of solutions to nonlinear Fokker-Planck equation

Abstract

One proves the H-theorem for mild solutions to a nondegenerate, nonlinear Fokker-Planck equation ut-β(u)+ div(D(x)b(u)u)=0, \ t≥0, \ x∈Rd, (1) and under appropriate hypotheses on β, D and b the convergence in L1loc(Rd), L1(Rd), respectively, for some tn∞ of the solution u(tn) to an equilibrium state of the equation for a large set of nonnegative initial data in L1. These results are new in the literature on nonlinear Fokker-Planck equations arising in the mean field theory and are also relevant to the theory of stochastic differential equations. As a matter of fact, by the above convergence result, it follows that the solution to the McKean-Vlasov stochastic differential equation corresponding to (1), which is a nonlinear distorted Brownian motion, has this equilibrium state as its unique invariant measure. Keywords: Fokker-Planck equation, m-accretive operator, probability density, Lyapunov function, H-theorem, McKean-Vlasov stochastic differential equation, nonlinear distorted Brownian motion. 2010 Mathematics Subject Classification: 35B40, 35Q84, 60H10.