English

Spectral-Variation Bounds in Hyperbolic Geometry

Numerical Analysis 2015-12-22 v2 Spectral Theory

Abstract

We derive new estimates for distances between optimal matchings of eigenvalues of non-normal matrices in terms of the norm of their difference. We introduce and estimate a hyperbolic metric analogue of the classical spectral-variation distance. The result yields a qualitatively new and simple characterization of the localization of eigenvalues. Our bound improves on the best classical spectral-variation bounds due to Krause if the distance of matrices is sufficiently small and is sharp for asymptotically large matrices. Our approach is based on the theory of model operators, which provides us with strong resolvent estimates. The latter naturally lead to a Chebychev-type interpolation problem with finite Blaschke products, which can be solved explicitly and gives stronger bounds than the classical Chebychev interpolation with polynomials. As compared to the classical approach our method does not rely on Hadamard's inequality and immediately generalize to algebraic operators on Hilbert space.

Keywords

Cite

@article{arxiv.1405.4031,
  title  = {Spectral-Variation Bounds in Hyperbolic Geometry},
  author = {Oleg Szehr and Alexander Müller-Hermes},
  journal= {arXiv preprint arXiv:1405.4031},
  year   = {2015}
}

Comments

19 pages, 4 pictures, Linear Algebra and its Applications, Volume 482, 1 October 2015

R2 v1 2026-06-22T04:15:33.607Z