New upper bounds for the spectral variation of a general matrix

Abstract

Let A∈Cn× n be a normal matrix with spectrum \λi\i=1n, and let A=A+E∈Cn× n be a perturbed matrix with spectrum \λi\i=1n. If A is still normal, the celebrated Hoffman--Wielandt theorem states that there exists a permutation π of \1,…,n\ such that (Σi=1n|λπ(i)-λi|2)1/2≤\|E\|F, where \|·\|F denotes the Frobenius norm of a matrix. This theorem reveals the strong stability of the spectrum of a normal matrix. However, if A or A is non-normal, the Hoffman--Wielandt theorem does not hold in general. In this paper, we present new upper bounds for (Σi=1n|λπ(i)-λi|2)1/2, provided that both A and A are general matrices. Some of our estimates improve or generalize the existing ones.