Leibniz Algebras with Invariant Bilinear Forms and Related Lie Algebras |
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Authors: | Saıd Benayadi Samiha Hidri |
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Affiliation: | 1. Université de Lorraine, Laboratoire IECL, CNRS UMR 7502, Ile du Saulcy, Francesaid.benayadi@univ-lorraine.fr;3. Université de Lorraine, Laboratoire IECL, CNRS UMR 7502, Ile du Saulcy, France;4. Faculté des Sciences de Sfax, Département de Mathématiques, Sfax BP, Tunisia |
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Abstract: | In ([11 Benayadi, S., Hidri, S. (2014). Quadratic Leibniz algebras. Journal of Lie Theory 24:737–759.[Web of Science ®] , [Google Scholar]]), we have studied quadratic Leibniz algebras that are Leibniz algebras endowed with symmetric, nondegenerate, and associative (or invariant) bilinear forms. The nonanticommutativity of the Leibniz product gives rise to other types of invariance for a bilinear form defined on a Leibniz algebra: the left invariance, the right invariance. In this article, we study the structure of Leibniz algebras endowed with nondegenerate, symmetric, and left (resp. right) invariant bilinear forms. In particular, the existence of such a bilinear form on a Leibniz algebra 𝔏 gives rise to a new algebra structure ☆ on the underlying vector space 𝔏. In this article, we study this new algebra, and we give information on the structure of this type of algebras by using some extensions introduced in [11 Benayadi, S., Hidri, S. (2014). Quadratic Leibniz algebras. Journal of Lie Theory 24:737–759.[Web of Science ®] , [Google Scholar]]. In particular, we improve the results obtained in [22 Lin, J., Chen, Z. (2010). Leibniz algebras with pseudo-Riemannian bilinear forms. Front. Math. China 5(1):103–115.[Crossref], [Web of Science ®] , [Google Scholar]]. |
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Keywords: | Double extension Left (resp. Right) invariant bilinear form Leibniz algebra Levi–Civita product Pseudo-metric on Lie algebra T*-extension |
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