Positive entries of stable matrices

Shmuel Friedland; Daniel Hershkowitz; Siegfried Rump

doi:10.13001/1081-3810.1142

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Published: Jan 1, 2005

DOI: https://doi.org/10.13001/1081-3810.1142

Keywords:

Stable matrix, Companion matrix, Positive elementary symmetric functions

Shmuel Friedland

Daniel Hershkowitz

Siegfried M. Rump

Abstract

The question of howma ny elements of a real positive stable matrix must be positive is investigated. It is shown that any real stable matrix of order greater than 1 has at least two positive entries. Furthermore, for every stable spectrum of cardinality greater than 1 there exists a real matrix with that spectrum with exactly two positive elements, where all other elements of the matrix can be chosen to be negative.

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Vol. 12 (2005)

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