A stochastic representation for the Poisson–Vlasov equation

In Eqs. ( 9), ( 14) and ( 15) This replacement in no way affects the existence of the stochastic process, nor the representation theorem 2.1 which remains valid.

We investigate the \(h\) expansion of the Time-Dependent Hartree Fock equation in the Wigner and Husimi representations. Both lead formally to the Vlasov equation in lowest order. The Husimi representation delivers a more stable expansion in particular when the selfinteraction in the mean field is c

We study the long-time behaviour of solutions of the Vlasov-Poisson-Fokker-Planck equation for initial data small enough and satisfying some suitable integrability conditions. Our analysis relies on the study of the linearized problems with bounded potentials decaying fast enough for large times. We

## Abstract Let us consider a solution __f__(__x__,__v__,__t__)ϵ__L__^1^(ℝ^2N^ × [0,__T__]) of the kinetic equation equation image where |__v__|^α+1^ __f__~o~,|__v__|^α^ __ϵL__^1^ (ℝ__2N__ × [0, __T__]) for some α< 0. We prove that __f__ has a higher moment than what is expected. Namely, for any b