English

Eigenvalue counting inequalities, with applications to Schrodinger operators

Mathematical Physics 2014-03-12 v2 math.MP

Abstract

We derive a sufficient condition for a Hermitian N×NN \times N matrix AA to have at least mm eigenvalues (counting multiplicities) in the interval (ϵ,ϵ)(-\epsilon, \epsilon). This condition is expressed in terms of the existence of a principal (N2m)×(N2m)(N-2m) \times (N-2m) submatrix of AA whose Schur complement in AA has at least mm eigenvalues in the interval (Kϵ,Kϵ)(-K\epsilon, K\epsilon), with an explicit constant KK. We apply this result to a random Schrodinger operator HωH_\omega, obtaining a criterion that allows us to control the probability of having mm closely lying eigenvalues for HωH_\omega-a result known as an mm-level Wegner estimate. We demonstrate its usefulness by verifying the input condition of our criterion for some physical models. These include the Anderson model and random block operators that arise in the Bogoliubov-de Gennes theory of dirty superconductors.

Keywords

Cite

@article{arxiv.1306.3459,
  title  = {Eigenvalue counting inequalities, with applications to Schrodinger operators},
  author = {Alexander Elgart and Daniel Schmidt},
  journal= {arXiv preprint arXiv:1306.3459},
  year   = {2014}
}

Comments

revised version, 26 pages, no figures

R2 v1 2026-06-22T00:34:03.785Z