Interval hulls of N-matrices and almost P-matrices

Abstract

We establish a characterization of almost P-matrices via a sign non-reversal property. In this we are inspired by the analogous results for N-matrices. Next, the interval hull of two m × n matrices A=(aij) and B = (bij), denoted by I(A,B), is the collection of all matrices C ∈ Rm × n such that each cij is a convex combination of aij and bij. Using the sign non-reversal property, we identify a finite subset of I(A,B) that determines if all matrices in I(A,B) are N-matrices/almost P-matrices. This provides a test for an entire class of matrices simultaneously to be N-matrices/almost P-matrices. We also establish analogous results for semipositive and minimally semipositive matrices. These characterizations may be considered similar in spirit to that of P-matrices by Bialas-Garloff [Linear Algebra Appl. 1984] and Rohn-Rex [SIMAX 1996], and of positive definite matrices by Rohn [SIMAX 1994].