Characterizing total positivity: single vector tests via Linear Complementarity, sign non-reversal, and variation diminution (2103.05624v4)

Abstract: A matrix $A$ is called totally positive (or totally non-negative) of order $k$, denoted by TP_k (or TN_k), if all minors of size at most $k$ are positive (or non-negative). These matrices have featured in diverse areas in mathematics, including algebra, analysis, combinatorics, and probability theory. The goal of this article is to provide a novel connection between total positivity and optimization/game theory. Specifically, we draw a relationship between TP matrices and the Linear Complementarity Problem (LCP), which generalizes and unifies linear and quadratic programming problems and bimatrix games - this connection is unexplored, to the best of our knowledge. We show that $A$ is $TP_k$ if and only if for every contiguous square submatrix $A_r$ of $A$, $LCP(A_r,q)$ has a unique solution for each vector $q<0$. In fact this can be strengthened to check the solution set of LCP at a single vector for each such square submatrix. These novel characterizations are in the spirit of classical results characterizing $TP$ matrices by Gantmacher-Krein [Compos. Math. 1937] and P-matrices by Ingleton [Proc. London Math. Soc. 1966]. Our work contains two other contributions, both of which characterize TP using single test vectors. First, we improve on one of the main results in recent joint work [Bull. London Math. Soc., 2021], which provided a novel characterization of TP_k matrices using sign non-reversal phenomena. We further improve on a classical characterization of TP by Brown-Johnstone-MacGibbon J. Amer. Statist. Assoc. 1981 involving the variation diminishing property. Finally, we use a P\'olya frequency function of Karlin [Trans. Amer. Math. Soc. 1964] to show that our aforementioned characterizations of TP, involving test-vectors drawn from the `alternating' bi-orthant, do not work if these vectors are drawn from any other open orthant.