Operator estimates in homogenization of L\'evy-type operators with periodic coefficients

Abstract

The paper deals with homogenization of self-adjoint operators in L2( Rd) of the form ( A u) () = ∫d μ(/, /) ( u() - u() )| - |d+α\,d, where 0< α < 2, and >0 is a small parameter. It is assumed that the function μ(,) is d-periodic in each variable, μ(,)=μ(,) for all and , and 0< μ- ≤slant μ(,) ≤slant μ+< ∞. Under these assumptions we show that the resolvent ( A + I)-1 converges, as 0, in the operator norm in L2(d) to the resolvent ( A0 + I)-1 of the limit operator A0 given by ( A0 u) () = ∫d μ0 ( u() - u() )| - |d+α\,d, where μ0 is the mean value of μ(,). We also show that the operator norm of the discrepancy \|( A + I)-1 - (0 + I)-1\|L2( Rd) L2( Rd) can be estimated by O(α), if 0< α < 1, by O( (1 + | ln |)2), if α =1, and by O(2- α), if 1< α < 2.

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