Generalized Shemesh criterion, common invariant subspaces and irreducible completely positive superoperators

Abstract

Assume that A1,...,As are complex n× n matrices. We give a computable criterion for existence of a common eigenvector of Ai which generalize the result of D. Shemesh established for two matrices. We use this criterion to prove some necessary and sufficient condition for Ai to have a common invariant subspace of dimension d, 2≤ d<n, if every Ai has pairwise different eigenvalues. Finally, we observe that the set of all matrices having multiple eigevalues has Lebesgue measure 0 and thus the condition is sufficient in practical applications. Being motivated by quantum information theory, we give a flavour of such applications for irreducible completely positive superoperators.