Limiting absorption principle for perturbed operator
Abstract
In this note the following theorem is proved. Let H and K be Hilbert spaces. Let H0 be a self-adjoint operator on H, F H K be a closed |H0|1/2-compact operator, and J K K be a bounded self-adjoint operator. If the operator F (H0 - λ - iy)-1 F* has norm limit as y 0+ for a.e.~λ, then so does the operator F (H0 + F*JF - λ - iy)-1 F*. An invariant operator ideal version of this result is also discussed.
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