Yunbai Cao
Published 2018-12-21Version 1
We consider the Boltzmann equation with external fields in strictly convex domains with diffuse reflection boundary condition. As long as the normal derivative of external fields satisfy some sign condition on the boundary (1.8) we construct classical $C^1$ solutions away from the grazing set. As a consequence we construct solutions of Vlasov-Poisson-Boltzmann system having bounded derivatives away from the grazing set (weighted $W^{1,\infty}$ estimate). In particular this improves the recent regularity estimate of such system in weighted $W^{1,p}$ space for $p<6$ in [1].
Regularity of the Boltzmann Equation in Convex Domains
Acoustic Limit for the Boltzmann equation in Optimal Scaling
Global solutions in $W_k^{ΞΆ,p}L^\infty_TL^2_v$ for the Boltzmann equation without cutoff
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