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Glasnik matematički, Vol. 57 No. 2, 2022.

Izvorni znanstveni članak

https://doi.org/10.3336/gm.57.2.06

On a generalization of some instability results for Riccati equations via nonassociative algebras

Hamza Boujemaa orcid id orcid.org/0000-0001-8117-7227 ; Département de Mathématiques, Faculté des Sciences de Rabat, Mohammed V University in Rabat, 1014RP Rabat, Rabat, Morocco
Brigita Ferčec orcid id orcid.org/0000-0003-0990-2775 ; Faculty of Energy Technology, University of Maribor, Hočevarjev trg 1, 8270 Krško, Slovenia

Puni tekst: engleski pdf 161 Kb

str. 251-264

preuzimanja: 108

citiraj

Preuzmi JATS datoteku

Sažetak

In [28], for any real non associative algebra of dimension \(m\geq2\),
having \(k\) linearly independent nilpotent elements \(n_{1}\), \(n_{2}\), …,
\(n_{k},\) \(1\leq k\leq m-1\), Mencinger and Zalar defined near idempotents and
near nilpotents associated to \(n_{1}\), \(n_{2}\), …, \(n_{k}\). Assuming
\(\mathcal{N}_{k}\mathcal{N}_{k}=\left\{ 0\right\}\), where \(\mathcal{N}
_{k}=\operatorname*{span}\left\{ n_{1},n_{2},\ldots,n_{k}\right\} \), they
showed that if there exists a near idempotent or a near nilpotent, called \(u\),
associated to \(n_{1},n_{2},\ldots,n_{k}\) verifying \(n_{i}u\in\mathbb{R}n_{i},\)
for \(1\leq i\leq k\), then any nilpotent element in \(\mathcal{N}_{k}\) is
unstable. They also raised the question of extending their results to cases
where \(\mathcal{N}_{k}\mathcal{N}_{k}\not =\left\{ 0\right\} \) with
\(\mathcal{N}_{k}\mathcal{N}_{k}\subset\mathcal{N}_{k}\mathcal{\ }\)and to cases
where \(\mathcal{N}_{k}\mathcal{N}_{k} \not\subset \mathcal{N}_{k}.\)
In this paper, positive answers are emphasized and in some cases under the
weaker conditions \(n_{i}u\in\mathcal{N}_{k}\). In addition, we characterize all
such algebras in dimension 3.

Ključne riječi

Quadratic differential systems, non-associative algebra,singular points, stability

Hrčak ID:

289606

URI

https://hrcak.srce.hr/289606

Datum izdavanja:

30.12.2022.

Posjeta: 279 *

Publication date: 30 December 2022

Volume: Vol 57

Issue: Svezak 2

Pages: 251-264

DOI: https://doi.org/10.3336/gm.57.2.06

Article Information (continued)

Categories:

Subject: Izvorni znanstveni članak

Keywords:

Keyword: Quadratic differential systems, non-associative algebra, singular points, stability

On a generalization of some instability results for Riccati equations via nonassociative algebras

Hamza Boujemaa[1]

Email: hamzaboujemaa@gmail.com

Brigita Ferčec[2]

Email: brigita.fercec@um.si

 

[1] Département de Mathématiques, Faculté des Sciences de Rabat, Mohammed V University in Rabat, 1014RP Rabat, Rabat, Morocco

[2] Faculty of Energy Technology, University of Maribor, Hočevarjev trg 1, 8270 Krško, Slovenia

Abstract

In [28], for any real non associative algebra of dimension \(m\geq2\), having \(k\) linearly independent nilpotent elements \(n_{1}\), \(n_{2}\), …, \(n_{k},\) \(1\leq k\leq m-1\), Mencinger and Zalar defined near idempotents and near nilpotents associated to \(n_{1}\), \(n_{2}\), …, \(n_{k}\). Assuming \(\mathcal{N}_{k}\mathcal{N}_{k}=\left\{ 0\right\}\), where \(\mathcal{N} _{k}=\operatorname*{span}\left\{ n_{1},n_{2},\ldots,n_{k}\right\} \), they showed that if there exists a near idempotent or a near nilpotent, called \(u\), associated to \(n_{1},n_{2},\ldots,n_{k}\) verifying \(n_{i}u\in\mathbb{R}n_{i},\) for \(1\leq i\leq k\), then any nilpotent element in \(\mathcal{N}_{k}\) is unstable. They also raised the question of extending their results to cases where \(\mathcal{N}_{k}\mathcal{N}_{k}\not =\left\{ 0\right\} \) with \(\mathcal{N}_{k}\mathcal{N}_{k}\subset\mathcal{N}_{k}\mathcal{\ }\)and to cases where \(\mathcal{N}_{k}\mathcal{N}_{k} \not\subset \mathcal{N}_{k}.\) In this paper, positive answers are emphasized and in some cases under the weaker conditions \(n_{i}u\in\mathcal{N}_{k}\). In addition, we characterize all such algebras in dimension 3.

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