Graph Subspaces and the Spectral Shift Function

Abstract

We extend the concept of Lifshits--Krein spectral shift function associated with a pair of self-adjoint operators to the case of pairs of admissible operators that are similar to self-adjoint operators. Our main result is the following. Let 0 and 1 be separable Hilbert spaces, A0 a self-adjoint operator in 0, A1 a self-adjoint operator in 1, and Bij a bounded operator from j to i, i=0,1, j=1-i, and B10=B01*. Assume that the block operator matrix =+=(A0 & B01 B10& A1) has reducing graph subspaces of the form xi Qji xi: xi∈i, i=0,1, j=1-i, and Qji are Hilbert-Schmidt operators such that Qji=-Qij*. If both (-z)-1-(-z)-1 and (-z)-1 are trace class operators in for (z)≠ 0, then the operators Ai+Bij Qji and Ai, i=0,1, j=1-i, acting in the spaces i are resolvent comparable admissible operators. Moreover, the spectral shift function (x,,) associated with the pair (,) admits the representation (x,,)=(x,A0+B01 Q10,A0)+ (x,A1+B10 Q01,A1). We also obtain new representations for the solution to the operator Sylvester equation in the form of Stieltjes operator integrals and formulate sufficient criterion for the strong solvability of the operator Riccati equation that ensures the existence of reducing graph subspaces for block operator matrices.

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