Continuous spectrum-shrinking maps and applications to preserver problems
Abstract
For a positive integer let be either the algebra of complex matrices, the set of all normal matrices, or any of the matrix Lie groups , and . We first give a short and elementary argument that for two positive integers and there exists a continuous spectrum-shrinking map (i.e.\ for all ) if and only if divides . Moreover, in that case we have the equality of characteristic polynomials for all , which in particular shows that preserves spectra. Using this we show that whenever , any continuous commutativity preserving and spectrum-shrinking map is of the form or , for some . The analogous results fail for the special unitary group but hold for the spaces of semisimple elements in either or . As a consequence, we also recover (a strengthened version of) \v{S}emrl's influential characterization of Jordan automorphisms of via preserving properties.
Cite
@article{arxiv.2501.06840,
title = {Continuous spectrum-shrinking maps and applications to preserver problems},
author = {Alexandru Chirvasitu and Ilja Gogić and Mateo Tomašević},
journal= {arXiv preprint arXiv:2501.06840},
year = {2025}
}
Comments
21 pages + references; v2 corrects an error and makes ancillary additions and modifications