Spectral shift function and trace formula

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.