High-velocity tails of the inelastic and the multi-species mixture Boltzmann equations

Abstract

We study high-velocity tails of some homogeneous Boltzmann equations on v ∈ Rvd. First, we consider spatially homogeneous inelastic Boltzmann equation with noncutoff collision kernel, in the case of moderately soft potentials. We also study spatially homogeneous mixture Boltzmann equations : for both noncutoff collision kernel with moderately soft potentials and cutoff collision kernel with hard potentials. In the case of noncutoff inelastic Boltzmann, we obtain \[ f(t,v) ≥ a(t) e-b(t)|v|p, 2 < p < 6.213 \] by extending Cancellation lemma and spreading lemma and assuming f∈ C∞. For the Mixture type Boltzmann equations, we prove Maxwellian p=2.