On the resolvent of multidimensional operators with frequently alternating boundary conditions with the Robin homogenized condition (Q291240)

In the paper under review, the authors consider an elliptic operator in an arbitrary multidimensional domain with frequent alternation of the Dirichlet condition and the Robin condition, in the case where the homogenized operator contains only the original Robin condition. Then, they prove the uniform resolvent convergence of the perturbed operator to the homogenized operator and they construct a complete two-parameter asymptotic expansion of the resolvent in an unbounded domain.