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Representations and module-extensions of hom 3-Lie algebras

arXiv:1304.7334 · doi:10.1016/j.geomphys.2015.08.013

Abstract

In this paper, we study the representations and module-extensions of hom 3-Lie algebras. We show that a linear map between hom 3-Lie algebras is a morphism if and only if its graph is a hom 3-Lie subalgebra and show that the derivations of a hom 3-Lie algebra is a Lie algebra. Derivation extension of hom 3-Lie algebras are also studied as an application. Moreover, we introduce the definition of $T_θ$-extensions and $T^{*}_θ$-extensions of hom 3-Lie sub-algebras in terms of modules, provide the necessary and sufficient conditions for $2k$-dimensional metric hom 3-Lie algebra to be isomorphic to a $T^{*}_θ$-extensions.

arXiv admin note: substantial text overlap with arXiv:1005.0140 by other authors