Sign non-reversal property for totally non-negative and totally positive matrices, and testing total positivity of their interval hull

Abstract

A matrix A is totally positive (or non-negative) of order k, denoted TPk (or TNk), if all minors of size ≤ k are positive (or non-negative). It is well-known that such matrices are characterized by the variation diminishing property together with the sign non-reversal property. We do away with the former, and show that A is TPk if and only if every submatrix formed from at most k consecutive rows and columns has the sign non-reversal property. In fact this can be strengthened to only consider test vectors in Rk with alternating signs. We also show a similar characterization for all TNk matrices - more strongly, both of these characterizations use a single vector (with alternating signs) for each square submatrix. These characterizations are novel, and similar in spirit to the fundamental results characterizing TP matrices by Gantmacher-Krein [Compos. Math. 1937] and P-matrices by Gale-Nikaido [Math. Ann. 1965]. As an application, we study the interval hull I(A,B) of two m × n matrices A=(aij) and B = (bij). This is the collection of C ∈ Rm × n such that each cij is between aij and bij. Using the sign non-reversal property, we identify a two-element subset of I(A,B) that detects the TPk property for all of I(A,B) for arbitrary k ≥ 1. In particular, this provides a test for total positivity (of any order), simultaneously for an entire class of rectangular matrices. In parallel, we also provide a finite set to test the total non-negativity (of any order) of an interval hull I(A,B).