On operator estimates in homogenization of non-local operators of convolution type

Abstract

The paper studies a bounded symmetric operator A in L2(Rd) with (A u) (x) = -d-2 ∫Rd a((x-y)/) μ(x/, y/) ( u(x) - u(y) )\,dy; here is a small positive parameter. It is assumed that a(x) is a non-negative L1(Rd) function such that a(-x)=a(x) and the moments Mk =∫Rd |x|k a(x)\,dx, k=1,2,3, are finite. It is also assumed that μ(x,y) is Zd-periodic both in x and y function such that μ(x,y) = μ(y,x) and 0< μ- ≤ μ(x,y) ≤ μ+< ∞. Our goal is to study the limit behaviour of the resolvent (A + I)-1, as 0. We show that, as 0, the operator (A + I)-1 converges in the operator norm in L2(Rd) to the resolvent (A0 + I)-1 of the effective operator A0 being a second order elliptic differential operator with constant coefficients of the form A0= - div g0 ∇. We then obtain sharp in order estimates of the rate of convergence.