Spectral shift function and trace formula

Sinha, Kalyan B. ; Mohapatra, A. N. (1994) Spectral shift function and trace formula Proceedings of the Indian Academy of Sciences - Mathematical Sciences, 104 (4). pp. 819-853. ISSN 0253-4142

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Official URL: http://www.ias.ac.in/j_archive/mathsci/104/4/819-8...

Related URL: http://dx.doi.org/10.1007/BF02830804

Abstract

The complete proofs of Krein's theorem on the spectral shift function and the trace formula are given for a pair of self-adjoint operators such that either (i) their difference is trace-class or (ii) the difference of their resolvents is trace-class. The proofs, essentially due to Krein, is based on Herglotz's theorem on the boundary value of the analytic functions whose imaginary part is non-negative on the upper half plane, and an almost optimal class of functions are obtained for which the trace formula is valid. Also an alternative method based on Weyl-von Neumann's theorem for self-adjoint operators, avoiding the complex function theory and inspired by Voiculescu's work, is given for the first case. Furthermore, some applications of the spectral shift function have been discussed.

Item Type:Article
Source:Copyright of this article belongs to Indian Academy of Sciences.
Keywords:Spectral Shift Function; Trace Formula; Krein's Theorem
ID Code:61302
Deposited On:15 Sep 2011 03:50
Last Modified:18 May 2016 11:04

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