Optimal time decay of the non cut-off Boltzmann equation in the whole space

Abstract

In this paper we study the large-time behavior of perturbative classical solutions to the hard and soft potential Boltzmann equation without the angular cut-off assumption in the whole space x with . We use the existence theory of global in time nearby Maxwellian solutions from gsNonCutA,gsNonCut0. It has been a longstanding open problem to determine the large time decay rates for the soft potential Boltzmann equation in the whole space, with or without the angular cut-off assumption MR677262,MR2847536. For perturbative initial data, we prove that solutions converge to the global Maxwellian with the optimal large-time decay rate of O(t-2+2r) in the L2(Lrx)-norm for any 2≤ r≤ ∞.