Upper bounds for the function solution of the homogenuous 2D Boltzmann equation with hard potential

Abstract

We deal with f\t(dv), the solution of the homogeneous 2D Boltzmannequation without cutoff. The initial condition f\0(dv) may be anyprobability distribution (except a Dirac mass). However, for sufficiently hardpotentials, the semigroup has a regularization property (see [BF]):f\t(dv)=f\t(v)dv for every t>0. The aim of this paper is to give upperbounds for f\t(v), the most significant one being of type f\t(v)≤Ct-ηe- v λ for some η,λ>0.