Parametrizations of k-Nonnegative Matrices: Cluster Algebras and k-Positivity Tests

Abstract

A k-positive matrix is a matrix where all minors of order k or less are positive. Computing all such minors to test for k-positivity is inefficient, as there are Σ=1k n2 of them in an n× n matrix. However, there are minimal k-positivity tests which only require testing n2 minors. These minimal tests can be related by series of exchanges, and form a family of sub-cluster algebras of the cluster algebra of total positivity tests. We give a description of the sub-cluster algebras that give k-positivity tests, ways to move between them, and an alternative combinatorial description of many of the tests.