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Spectral homogenization for a Robin-Neumann problem. (English) Zbl 1377.35092

Summary: We consider a Neumann-Robin spectral problem in a perforated domain \(\Omega _{\epsilon }\). By homogenization techniques we find the suitable homogenized problem and we discuss the asymptotics of eigenpairs, as the size of the perforation tends to zero. Our results involve an approach based on Višík lemma and the Mosco convergence of eigenspaces. We prove that eigenpairs of our problem converge to eigenpairs of the homogenized problem with rate \(\sqrt{\epsilon }\).

MSC:

35J60 Nonlinear elliptic equations
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