Compressible Euler limit from Boltzmann equation with Maxwell reflection boundary condition in half-space
Abstract
Starting from the local-in-time classical solution to the compressible Euler system with impermeable boundary condition in half-space, by employing the coupled weak viscous layers (governed by linearized compressible Prandtl equations with Robin boundary condition) and linear kinetic boundary layers, and the analytical tools in Guo-Jang-Jiang-2010-CPAM and some new boundary estimates both for Prandtl and Knudsen layers, we proved the local-in-time existence of Hilbert expansion type classical solutions to the scaled Boltzmann equation with Maxwell reflection boundary condition with accommodation coefficient α=O() when the Knudsen number small enough. As a consequence, this justifies the corresponding case of formal analysis in Sone's books Sone-2002book, Sone-2007-Book. This also extends the results in GHW-2020 from specular to Maxwell reflection boundary condition. Both of this paper and GHW-2020 can be viewed as generalizations of Caflisch's classic work Caflish-1980-CPAM to the cases with boundary.
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