Stability with respect to domain of the low Mach number limit of compressible heat-conducting viscous fluid
Abstract
We investigate the asymptotic limit of solutions to the Navier-Stokes-Fourier system with the Mach number proportional to a small parameter 0, the Froude number proportional to and when the fluid occupies large domain with spatial obstacle of rough surface varying when 0. The limit velocity field is solenoidal and satisfies the incompressible Oberbeck-Boussinesq approximation. Our studies are based on weak solutions approach and in order to pass to the limit in a convective term we apply the spectral analysis of the associated wave propagator (Neumann Laplacian) governing the motion of acoustic waves.
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