The low-rank eigenvalue problem

Abstract

The nonzero eigenvalues of AB are equal to those of BA: an identity that holds as long as the products are square, even when A,B are rectangular. This fact naturally suggests an efficient algorithm for computing eigenvalues and eigenvectors of a low-rank matrix X= AB with A,BT∈CN× r, N r: form the small r× r matrix BA and find its eigenvalues and eigenvectors. For nonzero eigenvalues, the eigenvectors are related by ABv = λv BAw = λw with w=Bv, and the same holds for Jordan vectors. For zero eigenvalues, the Jordan blocks can change sizes between AB and BA, and we characterize this behavior.