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On operator estimates in homogenization of nonlocal operators of convolution type

Andrey Piatnitski, V. A. Sloushch, T. A. Suslina, Е. Г. Жижина

2023Journal of Differential Equations17 citationsDOIOpen Access PDF

Abstract

The paper studies a bounded symmetric operator Aε in L2(Rd) with(Aεu)(x)=ε−d−2∫Rda((x−y)/ε)μ(x/ε,y/ε)(u(x)−u(y))dy; here ε 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|ka(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 (Aε+I)−1, as ε→0. We show that, as ε→0, the operator (Aε+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=−divg0∇. We then obtain sharp in order estimates of the rate of convergence.

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