Spectral estimates and asymptotics for integral operators on singular sets
Abstract
For singular numbers of integral operators of the form u(x) ∫ F1(X)K(X,Y,X-Y)F2(Y)u(Y)μ(dY), with measure μ singular with respect to the Lebesgue measure in RN, order sharp estimates for the counting function are established. The kernel K(X,Y,Z) is supposed to be smooth in X,Y and in Z 0 and to admit an asymptotic expansion in homogeneous functions in Z variable as Z 0. The order in estimates is determined by the leading homogeneity order in the kernel and geometric properties of the measure μ and involves integral norms of the weight functions F1,F2. For the case of the measure μ being the surface measure for a Lipschitz surface of some positive codimension d, in the self-adjoint case, the asymptotics of eigenvalues of this integral operator is found.
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