The combinatorics of permuting and preserving curve-bound spectra

Abstract

We prove that continuous spectrum- and commutativity-preserving maps to Mn(C) from the space of normal (real or complex) n× n, n 3 matrices with spectra contained in a given continuous-injection interval image ⊂eq C or R are (a) conjugations; (b) transpose conjugations, or (c) orderings of spectra according to an orientation of , with fixed eigenspaces. This generalizes results of Petek's (self-maps of real or complex Hermitian matrices) and the author's (complex Hermitian matrices as the domain, Mn(C) as the codomain). An application rules out possibility (c) for normal matrices with spectra constrained to a simple closed curve, extending a result by the author, Gogi\'c and Tomasevi\'c to the effect that continuous commutativity and spectrum preservers on unitary groups are (transpose) conjugations. The involution preserving eigenspaces and complex-conjugating eigenvalues is a novel possibility beyond (a), (b) and (c) if the domain consists of all semisimple operators with -bound spectra instead; its continuity (or lack thereof) and whether or not that map furthermore extends continuously to arbitrary -constrained-spectrum matrices hinge on the geometry and regularity of .