Intrinsic H\"older spaces for fractional kinetic operators

Abstract

We introduce anisotropic H\"older spaces useful for the study of the regularity theory for non local kinetic operators L whose prototypal example is equation L u (t,x,v) = ∫Rd Cd,s|v - v'|d+2s (u(t,x,v') - u(t,x,v)) d v' + v , ∇x + ∂t, (t,x,v)∈R×R2d. equation The H\"older spaces are defined in terms of an anisotropic distance relevant to the Galilean geometric structure on R×R2d the operator L is invariant with respect to. We prove an intrinsic Taylor-like formula, whose reminder is estimated in terms of the anisotropic distance of the Galilean structure. Our achievements naturally extend analogous known results for purely differential operators on Lie groups.