On a spectral version of Cartan's theorem

Abstract

For a domain in the complex plane, we consider the domain Sn() consisting of those n× n complex matrices whose spectrum is contained in . Given a holomorphic self-map of Sn() such that (A)=A and the derivative of at A is identity for some A∈ Sn(), we investigate when the map would be spectrum-preserving. We prove that if the matrix A is either diagonalizable or non-derogatory then for most domains , is spectrum-preserving on Sn(). Further, when A is arbitrary, we prove that is spectrum-preserving on a certain analytic subset of Sn().