The Xi Operator and its Relation to Krein's Spectral Shift Function
摘要
We explore connections between Krein's spectral shift function associated with the pair of self-adjoint operators , in a Hilbert space and the recently introduced concept of a spectral shift operator associated with the operator-valued Herglotz function , in , where and . Our principal results include a new representation for in terms of an averaged index for the Fredholm pair of self-adjoint spectral projections , , where , a.e. Moreover, introducing the new concept of a trindex for a pair of operators in , where is bounded and is an orthogonal projection, we prove that coincides with the trindex associated with the pair . In addition, we discuss a variant of the Birman-Krein formula relating the trindex of a pair of -operators and the Fredholm determinant of the abstract scattering matrix. We also provide a generalization of the classical Birman-Schwinger principle, replacing the traditional eigenvalue counting functions by appropriate spectral shift functions.
引用
@article{arxiv.math/9904050,
title = {The Xi Operator and its Relation to Krein's Spectral Shift Function},
author = {Fritz Gesztesy and Konstantin A. Makarov},
journal= {arXiv preprint arXiv:math/9904050},
year = {2007}
}
备注
LaTeX, 35 pages, this is an extended version including a discussion of generalized spectral shift functions and extensions of the Birman-Schwinger principle