One dimensional critical Kinetic Fokker-Planck equations, Bessel and stable processes

Abstract

We consider a particle moving in one dimension, its velocity being a reversible diffusion process, with constant diffusion coefficient, of which the invariant measure behaves like (1+|v|)-β for some β>0. We prove that, under a suitable rescaling, the position process resembles a Brownian motion if β≥ 5, a stable process if β∈ [1,5) and an integrated symmetric Bessel process if β∈ (0,1). The critical cases β=1 and β=5 require special rescaling. We recover some results of G.Lebeau and M.Puel [LP17], P.Cattiaux, E.Nasreddine and M. Puel [CNP16], and E.Barkai, E.Aghion and D. A. Kesslerwith [BAK14] with an alternative approach.