Homogenization of stable-like operators with random, ergodic coefficients

Abstract

We show homogenization for a family of Rd-valued stable-like processes (Xtε;θ)t 0, ε∈(0,1], whose (random) Fourier symbols equal qε(x,;θ)=1εαq(x/ε,ε; θ), whereq(x,; θ)=∫Rd(1-ei y·+iy·1\|y|1\)\, a(x;θ)y,y|y|d+2+α\,dy,for (x,,θ)∈R2d×. Here, α∈(0,2) and the family (a(x; θ))x∈Rd of d× d symmetric, non-negative definite matrices is a stationary ergodic random field over some probability space (, H,m). We assume that the random field is deterministically bounded and non-degenerate, i.e.\ |a(x;θ)| and Tr(a(x;θ))λ for some ,λ>0 and all θ∈. In addition, we suppose that the field is regular enough so that for any θ∈, the operator -q(·,D;θ), defined on the space of compactly supported C2 functions, is closable in the space of continuous functions vanishing at infinity and its closure generates a Feller semigroup. We prove the weak convergence of the laws of (Xtε;θ)t 0, as ε0+, in the Skorokhod space, m-a.s.\ in θ, to an α-stable process whose Fourier symbol q() is given by q()=∫q(0,;θ)*(θ)\,m(dθ), where * is a strictly positive density w.r.t.\ measure m. Our result has an analytic interpretation in terms of the convergence, as ε0+, of the solutions to random integro-differential equations ∂tuε(t,x;θ)=-qε(x,D;θ)uε(t,x;θ), with the initial condition uε(0,x;θ)=f(x), where f is a bounded and continuous function.