Spectral Properties of Sign Patterns
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Published:2020-04-05
Issue:36
Volume:36
Page:183-197
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ISSN:1081-3810
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Container-title:The Electronic Journal of Linear Algebra
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language:
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Short-container-title:ELA
Author:
Cavers Michael,Fischer Jonathan,Vander Meulen Kevin N.
Abstract
In this paper, an infinite family of irreducible sign patterns that are spectrally arbitrary, for which the nilpotent-Jacobian method does not apply, is given. It is demonstrated that it is possible for an irreducible sign pattern to be refined inertially arbitrary and not spectrally arbitrary. It is observed that not every nonzero spectrally arbitrary pattern has a signing which is spectrally arbitrary. It is also shown that every superpattern of the reducible pattern $\T_2 \oplus \T_2$ is spectrally arbitrary.
Publisher
University of Wyoming Libraries
Subject
Algebra and Number Theory