Preservers of Unitary Similarity Functions on Lie Products of Matrices

Abstract

Denote by Mn the set of n× n complex matrices. Let f: Mn → [0,∞) be a continuous map such that f(μ UAU*)= f(A) for any complex unit μ, A ∈ Mn and unitary U ∈ Mn, f(X)=0 if and only if X=0 and the induced map t f(tX) is monotonic increasing on [0,∞) for any rank 1 nilpotent X ∈ Mn. Characterizations are given for surjective maps φ on Mn satisfying f(AB-BA) = f(φ(A)φ(B)-φ(B)φ(A)). The general theorem are then used to deduce results on special cases when the function is the pseudo spectrum and the pseudo spectral radius, that answers a question of Molnar raised at the 2014 CMS summer meeting.