Operator estimates for homogenization of the Robin Laplacian in a perforated domain
Abstract
Let >0 be a small parameter. We consider the domain := D, where is an open domain in Rn, and D is a family of small balls of the radius d=o() distributed periodically with period . Let be the Laplace operator in subject to the Robin condition ∂ u ∂ n+γ u = 0 with γ 0 on the boundary of the holes and the Dirichlet condition on the exterior boundary. Kaizu (1985, 1989) and Brillard (1988) have shown that, under appropriate assumptions on d and γ, the operator converges in the strong resolvent sense to the sum of the Dirichlet Laplacian in and a constant potential. We improve this result deriving estimates on the rate of convergence in terms of L2 L2 and L2 H1 operator norms. As a byproduct we establish the estimate on the distance between the spectra of the associated operators.
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