On degenerations and invariants of low-dimensional complex nilpotent Leibniz algebras

Given two algebras and , if lies in the Zariski closure of the orbit , we say that is a degeneration of. We denote this by →. Degenerations (or contractions) were widely applied to a range of physical and mathematical point of view. The most well-known example oriented to the application on degenera...

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Main Authors: Mohamed, Nurul Shazwani, Said Husain, Sharifah Kartini, Yunos, Faridah
Format: Article
Language:English
Published: Science Publications 2019
Online Access:http://psasir.upm.edu.my/id/eprint/81532/1/On%20degenerations%20and%20invariants%20of%20low-dimensional%20complex%20nilpotent%20Leibniz%20algebras.pdf
http://psasir.upm.edu.my/id/eprint/81532/
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spelling my.upm.eprints.815322020-10-28T18:13:52Z http://psasir.upm.edu.my/id/eprint/81532/ On degenerations and invariants of low-dimensional complex nilpotent Leibniz algebras Mohamed, Nurul Shazwani Said Husain, Sharifah Kartini Yunos, Faridah Given two algebras and , if lies in the Zariski closure of the orbit , we say that is a degeneration of. We denote this by →. Degenerations (or contractions) were widely applied to a range of physical and mathematical point of view. The most well-known example oriented to the application on degenerations is limiting process from quantum mechanics to classical mechanics under ℏ → 0 that corresponds to the contraction of the Heisenberg algebras to the abelian ones of the same dimension. Research on degenerations of Lie, Leibniz and other classes of algebras are very active. Throughout the paper we are dealing with mathematical background with abstract algebraic structures. The present paper is devoted to the degenerations of low-dimensional nilpotent Leibniz algebras over the field of complex numbers. Particularly, we focus on the classification of three-dimensional nilpotent Leibniz algebras. List of invariance arguments are provided and its dimensions are calculated in order to find the possible degenerations between each pair of algebras. We show that for each possible degenerations, there exists construction of parameterized basis on parameter. We proof the non-degeneration case for mentioned classes of algebras by providing some reasons to reject the degenerations. As a result, we give complete list of degenerations and non-degenerations of low-dimensional complex nilpotent Leibniz algebras. In future research, from this result we can find its rigidity and irreducible components. Science Publications 2019 Article PeerReviewed text en http://psasir.upm.edu.my/id/eprint/81532/1/On%20degenerations%20and%20invariants%20of%20low-dimensional%20complex%20nilpotent%20Leibniz%20algebras.pdf Mohamed, Nurul Shazwani and Said Husain, Sharifah Kartini and Yunos, Faridah (2019) On degenerations and invariants of low-dimensional complex nilpotent Leibniz algebras. Mathematics and Statistics, 8 (2). pp. 95-99. ISSN 1549-3644 10.13189/ms.2020.080204
institution Universiti Putra Malaysia
building UPM Library
collection Institutional Repository
continent Asia
country Malaysia
content_provider Universiti Putra Malaysia
content_source UPM Institutional Repository
url_provider http://psasir.upm.edu.my/
language English
description Given two algebras and , if lies in the Zariski closure of the orbit , we say that is a degeneration of. We denote this by →. Degenerations (or contractions) were widely applied to a range of physical and mathematical point of view. The most well-known example oriented to the application on degenerations is limiting process from quantum mechanics to classical mechanics under ℏ → 0 that corresponds to the contraction of the Heisenberg algebras to the abelian ones of the same dimension. Research on degenerations of Lie, Leibniz and other classes of algebras are very active. Throughout the paper we are dealing with mathematical background with abstract algebraic structures. The present paper is devoted to the degenerations of low-dimensional nilpotent Leibniz algebras over the field of complex numbers. Particularly, we focus on the classification of three-dimensional nilpotent Leibniz algebras. List of invariance arguments are provided and its dimensions are calculated in order to find the possible degenerations between each pair of algebras. We show that for each possible degenerations, there exists construction of parameterized basis on parameter. We proof the non-degeneration case for mentioned classes of algebras by providing some reasons to reject the degenerations. As a result, we give complete list of degenerations and non-degenerations of low-dimensional complex nilpotent Leibniz algebras. In future research, from this result we can find its rigidity and irreducible components.
format Article
author Mohamed, Nurul Shazwani
Said Husain, Sharifah Kartini
Yunos, Faridah
spellingShingle Mohamed, Nurul Shazwani
Said Husain, Sharifah Kartini
Yunos, Faridah
On degenerations and invariants of low-dimensional complex nilpotent Leibniz algebras
author_facet Mohamed, Nurul Shazwani
Said Husain, Sharifah Kartini
Yunos, Faridah
author_sort Mohamed, Nurul Shazwani
title On degenerations and invariants of low-dimensional complex nilpotent Leibniz algebras
title_short On degenerations and invariants of low-dimensional complex nilpotent Leibniz algebras
title_full On degenerations and invariants of low-dimensional complex nilpotent Leibniz algebras
title_fullStr On degenerations and invariants of low-dimensional complex nilpotent Leibniz algebras
title_full_unstemmed On degenerations and invariants of low-dimensional complex nilpotent Leibniz algebras
title_sort on degenerations and invariants of low-dimensional complex nilpotent leibniz algebras
publisher Science Publications
publishDate 2019
url http://psasir.upm.edu.my/id/eprint/81532/1/On%20degenerations%20and%20invariants%20of%20low-dimensional%20complex%20nilpotent%20Leibniz%20algebras.pdf
http://psasir.upm.edu.my/id/eprint/81532/
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score 13.211869