Homogenization estimates for high order elliptic operators
Abstract
In the whole space Rd, d 2, we study homogenization of a divergence form elliptic operator A of order 2m 4 with measurable -periodic coefficients, where is a small parameter. For the resolvent (A+1)-1, we construct an approximation with the remainder term of order 2 in the operator (L2Hm)-norm, using the resolvent of the homogenized operator, solutions of several auxiliary periodic problems on the unit cube, and smoothing operators. The homogenized operator here differs from the one commonly employed in homogenization.
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