Structure of n-Lie Algebras with Involutive Derivations

Structure of n-Lie Algebras with Involutive Derivations

We study the structure of n-Lie algebras with involutive derivations for n≥2. We obtain that a 3-Lie algebra A is a two-dimensional extension of Lie algebras if and only if there is an involutive derivation D on A=A1  ∔  A-1 such that dim A1=2 or dim A-1=2, where A1 and A-1 are subspaces of A with e...

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Main Authors: Ruipu Bai, Shuai Hou, Yansha Gao
Format: Article
Language:English
Published: Hindawi Limited 2018-01-01
Series:International Journal of Mathematics and Mathematical Sciences
Online Access:http://dx.doi.org/10.1155/2018/7202141
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spelling doaj-28c64cc22a384c43b4878bfcba5af5452020-11-25T00:04:47ZengHindawi LimitedInternational Journal of Mathematics and Mathematical Sciences0161-17121687-04252018-01-01201810.1155/2018/72021417202141Structure of n-Lie Algebras with Involutive DerivationsRuipu Bai0Shuai Hou1Yansha Gao2College of Mathematics and Information Science, Hebei University, Key Laboratory of Machine Learning and Computational Intelligence of Hebei Province, Baoding 071002, ChinaCollege of Mathematics and Information Science, Hebei University, Baoding 071002, ChinaCollege of Mathematics and Information Science, Hebei University, Baoding 071002, ChinaWe study the structure of n-Lie algebras with involutive derivations for n≥2. We obtain that a 3-Lie algebra A is a two-dimensional extension of Lie algebras if and only if there is an involutive derivation D on A=A1  ∔  A-1 such that dim A1=2 or dim A-1=2, where A1 and A-1 are subspaces of A with eigenvalues 1 and -1, respectively. We show that there does not exist involutive derivations on nonabelian n-Lie algebras with n=2s for s≥1. We also prove that if A is a (2s+2)-dimensional (2s+1)-Lie algebra with dim A1=r, then there are involutive derivations on A if and only if r is even, or r satisfies 1≤r≤s+2. We discuss also the existence of involutive derivations on (2s+3)-dimensional (2s+1)-Lie algebras.http://dx.doi.org/10.1155/2018/7202141
collection DOAJ
language English
format Article
sources DOAJ
author Ruipu Bai
Shuai Hou
Yansha Gao
spellingShingle Ruipu Bai
Shuai Hou
Yansha Gao
Structure of n-Lie Algebras with Involutive Derivations
International Journal of Mathematics and Mathematical Sciences
author_facet Ruipu Bai
Shuai Hou
Yansha Gao
author_sort Ruipu Bai
title Structure of n-Lie Algebras with Involutive Derivations
title_short Structure of n-Lie Algebras with Involutive Derivations
title_full Structure of n-Lie Algebras with Involutive Derivations
title_fullStr Structure of n-Lie Algebras with Involutive Derivations
title_full_unstemmed Structure of n-Lie Algebras with Involutive Derivations
title_sort structure of n-lie algebras with involutive derivations
publisher Hindawi Limited
series International Journal of Mathematics and Mathematical Sciences
issn 0161-1712
1687-0425
publishDate 2018-01-01
description We study the structure of n-Lie algebras with involutive derivations for n≥2. We obtain that a 3-Lie algebra A is a two-dimensional extension of Lie algebras if and only if there is an involutive derivation D on A=A1  ∔  A-1 such that dim A1=2 or dim A-1=2, where A1 and A-1 are subspaces of A with eigenvalues 1 and -1, respectively. We show that there does not exist involutive derivations on nonabelian n-Lie algebras with n=2s for s≥1. We also prove that if A is a (2s+2)-dimensional (2s+1)-Lie algebra with dim A1=r, then there are involutive derivations on A if and only if r is even, or r satisfies 1≤r≤s+2. We discuss also the existence of involutive derivations on (2s+3)-dimensional (2s+1)-Lie algebras.
url http://dx.doi.org/10.1155/2018/7202141
work_keys_str_mv AT ruipubai structureofnliealgebraswithinvolutivederivations
AT shuaihou structureofnliealgebraswithinvolutivederivations
AT yanshagao structureofnliealgebraswithinvolutivederivations
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