Regularization properties of the 2D homogeneous Boltzmann equation without cutoff

Abstract

We consider the 2-dimensional spatially homogeneous Boltzmann equation for hard potentials. We assume that the initial condition is a probability measure that has some exponential moments and is not a Dirac mass. We prove some regularization properties: for a class of very hard potentials, the solution instantaneously belongs to Hr, for some r∈ (-1,2) depending on the parameters of the equation. Our proof relies on the use of a well-suited Malliavin calculus for jump processes.