A four-mean theorem and its application to pseudospectra

Abstract

Let N 4. We show that, if x1,…,xN and y1,…,yN are N-tuples of strictly positive numbers whose arithmetic, geometric and harmonic means agree, then \[ j xj <(N-2)j yj j xj <(N-2)j yj. \] This is used to show that, if N4 and A,B are N× N matrices with super-identical pseudospectra, then, for every polynomial p, we have \[ \|p(A)\|< N-2\|p(B)\|, \] unless p(A)=p(B)=0. This improves a previously known inequality to the point of being sharp, at least for N=4.