Sign regularity preserving linear operators
Abstract
A matrix A∈ Rm × n is strictly sign regular/SSR (or sign regular/SR) if for each 1 ≤ k ≤ \m,n\, all (non-zero) k× k minors of A have the same sign. This class of matrices contains the totally positive matrices, and was first studied by Schoenberg in 1930 to characterize variation diminution, a fundamental property in total positivity theory. In this article, we classify all surjective linear mappings L:Rm× nm× n that preserve: (i) sign regularity and (ii) sign regularity with a given sign pattern, as well as (iii) strict versions of these.
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