Zhongwei Shen
Published 2022-11-29Version 1
In this paper we study the homogenization of the Dirichlet problem for the Stokes equations in a perforated domain with multiple microstructures. First, under the assumption that the interface between subdomains is a union of Lipschitz surfaces, we show that the effective velocity and pressure are governed by a Darcy law, where the permeability matrix is piecewise constant. The key step is to prove that the effective pressure is continuous across the interface, using Tartar's method of test functions. Secondly, we establish the sharp error estimates for the convergence of the velocity and pressure, assuming the interface satisfies certain smoothness and geometric conditions. This is achieved by constructing two correctors. One of them is used to correct the discontinuity of the two-scale approximation on the interface, while the other is used to correct the discrepancy between boundary values of the solution and its approximation.
Compactness and Large-Scale Regularity for Darcy's Law
Darcy's law as low Mach and homogenization limit of a compressible fluid in perforated domains
Applications of Fourier analysis in homogenization of Dirichlet problem II. $L^p$ estimates
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