On Sparse Reflexive Generalized Inverses

Abstract

We study sparse generalized inverses H of a rank-r real matrix A. We give a construction for reflexive generalized inverses having at most r2 nonzeros. For r=1 and for r=2 with A nonnegative, we demonstrate how to minimize the (vector) 1-norm over reflexive generalized inverses. For general r, we efficiently find reflexive generalized inverses with 1-norm within approximately a factor of r2 of the minimum 1-norm generalized inverse.