Affiliation:
1. Department of Mathematics, Faculty of Science, Srinakharinwirot University, 114 Sukhumvit 23, Bangkok 10110, Thailand
Abstract
Leibniz algebras are generalizations of Lie algebras. Similar to Lie algebras, inner derivations play a crucial role in characterizing complete Leibniz algebras. In this work, we demonstrate that the algebra of inner derivations of a Leibniz algebra can be decomposed into the sum of the algebra of left multiplications and a certain ideal. Furthermore, we show that the quotient of the algebra of derivations of the Leibniz algebra by this ideal yields a complete Lie algebra. Our results independently establish that any derivation of a semisimple Leibniz algebra can be expressed as a combination of three derivations. Additionally, we compare the properties of the algebra of inner derivations of Leibniz algebras with the algebra of central derivations.
Reference15 articles.
1. On a generalization of Lie algebra notion;Bloh;Math. USSR Dokl.,1965
2. Une version non commutative des algebra de Lie: Les algèbres de Leibniz;Loday;Enseign. Math.,2009
3. On a complete rigid Leibniz non-Lie algebra in arbitrary dimension;Linear Algebra Appl.,2013
4. Complete Leibniz algebras;Boyle;J. Algebra,2020
5. Some results on complete Lie algebras;Meng;Commun. Algebra,1994
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