Gamma-convergence as s1- of anisotropic nonlocal fractional perimeter functionals

Abstract

We investigate the asymptotic behavior in the sense of (L1loc)-convergence as s1- of anisotropic non local s-fractional perimeters defined with respect to general anisotropic integration kernels ks(·), under the hypothesis of pointwise convergence of such kernels. In particular, we prove the (L1loc)-convergence as s1- of the rescaled anisotropic nonlocal s-fractional perimeters defined with respect to the kernels ks(·) to a suitable anisotropic perimeter. We do so both in Rn and on a bounded domain ⊂Rn with Lipschitz boundary.