English

The Xi Operator and its Relation to Krein's Spectral Shift Function

Spectral Theory 2007-05-23 v2

Abstract

We explore connections between Krein's spectral shift function ξ(λ,H0,H)\xi(\lambda,H_0,H) associated with the pair of self-adjoint operators (H0,H)(H_0,H), H=H0+VH=H_0+V in a Hilbert space \calH\calH and the recently introduced concept of a spectral shift operator Ξ(J+K(H0λi0)1K)\Xi(J+K^*(H_0-\lambda-i0)^{-1}K) associated with the operator-valued Herglotz function J+K(H0z)1KJ+K^*(H_0-z)^{-1}K, (z)>0\Im(z)>0 in \calH\calH, where V=KJKV=KJK^* and J=\sgn(V)J=\sgn(V). Our principal results include a new representation for ξ(λ,H0,H)\xi(\lambda,H_0,H) in terms of an averaged index for the Fredholm pair of self-adjoint spectral projections (EJ+A(λ)+tB(λ)((,0)),EJ((,0)))(E_{J+A(\lambda)+tB(\lambda)}((-\infty,0)),E_J((-\infty,0))), t\bbRt\in\bbR, where A(λ)=(K(H0λi0)1K)A(\lambda)=\Re(K^*(H_0-\lambda-i0)^{-1}K), B(λ)=(K(H0λi0)1K)B(\lambda)=\Im(K^*(H_0-\lambda-i0)^{-1}K) a.e. Moreover, introducing the new concept of a trindex for a pair of operators (A,P)(A,P) in \calH\calH, where AA is bounded and PP is an orthogonal projection, we prove that ξ(λ,H0,H)\xi(\lambda,H_0,H) coincides with the trindex associated with the pair (Ξ(J+K(H0λi0)1K),Ξ(J))(\Xi(J+K^*(H_0-\lambda-i0)^{-1}K),\Xi(J)). In addition, we discuss a variant of the Birman-Krein formula relating the trindex of a pair of Ξ\Xi-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.

Keywords

Cite

@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}
}

Comments

LaTeX, 35 pages, this is an extended version including a discussion of generalized spectral shift functions and extensions of the Birman-Schwinger principle