Homogenizations of integro-differential equations with L\'evy operators with asymmetric and degenerate densities

Abstract

We consider periodic homogenization problems for the L\'evy operators with asymmetric L\'evy densities. The formal asymptotic expansion used for the -stable (symmetric) L\'evy operators (∈ (0,2)) is not applicable directly to such asymmetric cases. We rescale the asymmetric densities, extract the most singular part of the measures, which average out the microscopic dependences in the homogenization procedures. We give two conditions (A) and (B), which characterize such a class of asymmetric densities, that the above "rescaled" homogenization is available.