Dissipation and Semigroup on Hkn: Non-cutoff Linearized Boltzmann Operator with Soft Potential

Abstract

In this paper, we find that the linearized collision operator L of the non-cutoff Boltzmann equation with soft potential generates a strongly continuous semigroup on Hkn, with k,n∈R. In the theory of Boltzmann equation without angular cutoff, the weighted Sobolev space plays a fundamental role. The proof is based on pseudo-differential calculus and in general, for a specific class of Weyl quantization, the L2 dissipation implies Hkn dissipation. This kind of estimate is also known as the Grding's inequality.