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Autori principali: Chauhan, Bharat Pratap, Dubey, Dipti
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2405.06785
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author Chauhan, Bharat Pratap
Dubey, Dipti
author_facet Chauhan, Bharat Pratap
Dubey, Dipti
contents In this paper, we introduce almost (strictly) semi-positive tensors, which extend the concept of almost (strictly) semimonotone matrices. Furthermore, we provide insights into the characteristics of the entries within these almost (strictly) semi-positive tensors and establish a condition that is both necessary and sufficient for categorizing the underlying tensor as an almost semi-positive tensor. Drawing inspiration from H. Väliaho's work on copositivity, we present the concept of almost (strictly) copositive tensors, which extends the notion of almost (strictly) copositive matrices to tensors. It is shown that a real symmetric tensor is almost (strictly) semi-positive if and only if it is almost (strictly) copositive and a symmetric almost (strictly) semi-positive tensor has a (nonpositive) negative $H^{++}$-eigenvalue. We also establish a relationship between (strictly) diagonally dominant and (strong) $\mathcal{M}$-tensors with (strictly) semi-positive tensors.
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institution arXiv
publishDate 2024
record_format arxiv
spellingShingle On Almost-Type Special Structured Tensor Classes Associated with Semi-Positive Tensors
Chauhan, Bharat Pratap
Dubey, Dipti
Optimization and Control
15A69, 15B48, 90C33
In this paper, we introduce almost (strictly) semi-positive tensors, which extend the concept of almost (strictly) semimonotone matrices. Furthermore, we provide insights into the characteristics of the entries within these almost (strictly) semi-positive tensors and establish a condition that is both necessary and sufficient for categorizing the underlying tensor as an almost semi-positive tensor. Drawing inspiration from H. Väliaho's work on copositivity, we present the concept of almost (strictly) copositive tensors, which extends the notion of almost (strictly) copositive matrices to tensors. It is shown that a real symmetric tensor is almost (strictly) semi-positive if and only if it is almost (strictly) copositive and a symmetric almost (strictly) semi-positive tensor has a (nonpositive) negative $H^{++}$-eigenvalue. We also establish a relationship between (strictly) diagonally dominant and (strong) $\mathcal{M}$-tensors with (strictly) semi-positive tensors.
title On Almost-Type Special Structured Tensor Classes Associated with Semi-Positive Tensors
topic Optimization and Control
15A69, 15B48, 90C33
url https://arxiv.org/abs/2405.06785