A Note on Eigenvalues of Perturbed Hermitian Matrices

Abstract

Let A=(arraycc H1 & E*\\ E & H2array) and A=(arraycc H1 & O\\ O & H2array) be two N-by-N Hermitian matrices with eigenvalues λ1 ·s λN and λ1 ·s λN, respectively. There are two kinds of perturbation bounds on |λi - λi|: |λi- λi| \|E\|, where \|E\| is the largest singular value of \|E\|, regardless of Hi's spectral distributions, and |λi - λi| \|E\|2/η, where η is the minimum gap between Hi's spectra. enumerate Bounds of the first kind overestimate the changes when \|E\|η while those of the second kind may blow up when η is too tiny. Denote by \|E\| the spectral norm of the matrix E, and η the spectral gap between the spectra of H1 and H2. It is shown that |λi - λi| 2\|E\|2 η+η2+4\|E\|2 \, , which improves all the existing results. Similar bounds are obtained for singular values of matrices under block perturbations.