Homogenization and Orowan's law for anisotropic fractional operators of any order

Abstract

We consider an anisotropic L\'evy operator Is of any order s∈(0,1) and we consider the homogenization properties of an evolution equation. The scaling properties and the effective Hamiltonian that we obtain is different according to the cases s<1/2 and s>1/2. In the isotropic onedimensional case, we also prove a statement related to the so-called Orowan's law, that is an appropriate scaling of the effective Hamiltonian presents a linear behavior.