Homogenization of the elliptic Dirichlet problem: operator error estimates in L2
Abstract
Let O ⊂ Rd be a bounded domain of class C2. In the Hilbert space L2(O;Cn), we consider a matrix elliptic second order differential operator AD, with the Dirichlet boundary condition. Here >0 is the small parameter. The coefficients of the operator are periodic and depend on x/. A sharp order operator error estimate \|AD,-1 - (AD0)-1 \|L2 L2 ≤ C is obtained. Here A0D is the effective operator with constant coefficients and with the Dirichlet boundary condition.
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