suboptimal error estimates for homogenization of linear elasticity systems on perforated domains

Abstract

In the present work, we established almost-sharp error estimates for linear elasticity systems in periodically perforated domains. The first result was L2dd-1-τ-error estimates O(1-τ2) with 0<τ<1 for a bounded smooth domain. It followed from weighted Hardy-Sobolev's inequalities and a suboptimal error estimate for the square function of the first-order approximating corrector (which was earliest investigated by C. Kenig, F. Lin, Z. Shen KLS under additional regularity assumption on coefficients). The new approach relied on the weighted quenched Calder\'on-Zygmund estimate (initially appeared in A. Gloria, S. Neukamm, F. Otto's work GloriaNeukammOtto2015 for a quantitative stochastic homogenization theory). The second effort was L2-error estimates O(5623(1/)) for a Lipschitz domain, followed from a new duality scheme coupled with interpolation inequalities. Also, we developed a new weighted extension theorem for perforated domains, and a real method imposed by Z. Shen S3 played a fundamental role in the whole project.