Operator estimates for Neumann sieve problem

Abstract

Let be a domain in Rn, be a hyperplane intersecting , >0 be a small parameter, and Dk,, k=1,2,3… be a family of small "holes" in ; when 0, the number of holes tends to infinity, while their diameters tends to zero. Let A be the Neumann Laplacian in the perforated domain =, where = (k Dk,) ("sieve"). It is well-known that if the sizes of holes are carefully chosen, A converges in the strong resolvent sense to the Laplacian on subject to the so-called δ'-conditions on . In the current work we improve this result: under rather general assumptions on the shapes and locations of the holes we derive estimates on the rate of convergence in terms of L2 L2 and L2 H1 operator norms; in the latter case a special corrector is required.