Anomalous diffusion for multi-dimensional critical Kinetic Fokker-Planck equations

Abstract

We consider a particle moving in d≥ 2 dimensions, its velocity being a reversible diffusion process, with identity diffusion coefficient, of which the invariant measure behaves, roughly, like (1+|v|)-β as |v| ∞, for some constant β>0. We prove that for large times, after a suitable rescaling, the position process resembles a Brownian motion if β≥ 4+d, a stable process if β∈ [d,4+d) and an integrated multi-dimensional generalization of a Bessel process if β∈ (d-2,d). The critical cases β=d, β=1+d and β=4+d require special rescalings.