A characterization for positive semi-definite matrix products

Abstract

A well-known fact in linear algebra is that AT A is always positive semi-definite for any real matrix A. We consider a generalization of this fact via the following decision problem. Given a symbolic product of length k, consisting of variables and their transposes, such as ABBTCAT, does there exist an n∈ N and an assignment of matrices from Rn× n such that the resulting matrix product has a negative eigenvalue? We show that this problem is decidable and provide a simple characterization of those symbolic products that have only non-negative real eigenvalues for any assignment of matrices. This characterization can also be understood as a matrix analogue of the positive graph conjecture by Camarena, Cs\'oka, Hubai, Lippner, and Lov\'asz, and the proof relies on this surprising connection to graph theory.