Hessenberg decomposition of matrix fields and bounded operator fields
Spectral Theory
2009-06-16 v1 Operator Algebras
Abstract
Hessenberg decomposition is the basic tool used in computational linear algebra to approximate the eigenvalues of a matrix. In this article, we generalize Hessenberg decomposition to continuous matrix fields over topological spaces. This works in great generality: the space is only required to be normal and to have finite covering dimension. As applications, we derive some new structure results on self-adjoint matrix fields, we establish some eigenvalue separation results, and we generalize to all finite-dimensional normal spaces a classical result on trivial summands of vector bundles. Finally, we develop a variant of Hessenberg decomposition for fields of bounded operators on a separable, infinite-dimensional Hilbert space.
Cite
@article{arxiv.0906.2543,
title = {Hessenberg decomposition of matrix fields and bounded operator fields},
author = {Benoit Jacob},
journal= {arXiv preprint arXiv:0906.2543},
year = {2009}
}
Comments
25 pages