A periodic homogenization problem with defects rare at infinity
Abstract
We consider a homogenization problem for the diffusion equation -div(a ∇ u ) = f when the coefficient a is a non-local perturbation of a periodic coefficient. The perturbation does not vanish but becomes rare at infinity in a sense made precise in the text. We prove the existence of a corrector, identify the homogenized limit and study the convergence rates of u to its homogenized limit.
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