Abstract
Abstract The goal of this paper is to examine the structure of split involutive regular BiHom-Lie superalgebras, which can be viewed as the natural generalization of split involutive regular Hom-Lie algebras and split regular BiHom-Lie superalgebras. By developing techniques of connections of roots for this kind of algebras, we show that such a split involutive regular BiHom-Lie superalgebra L {\mathfrak{L}} is of the form L = U + ∑ α I α {\mathfrak{L}}=U+{\sum }_{\alpha }{I}_{\alpha } with U a subspace of a maximal abelian subalgebra H and any I α , a well-described ideal of L {\mathfrak{L}} , satisfying [I α , I β ] = 0 if [α] ≠ [β]. In the case of L {\mathfrak{L}} being of maximal length, the simplicity of L {\mathfrak{L}} is also characterized in terms of connections of roots.
Highlights
The notion of Hom-Lie algebras was first introduced by Hartwig, Larsson and Silvestrov in [1], who developed an approach to deformations of the Witt and Virasoro algebras based on σ-deformations
The purpose of this paper is to consider the structure of involutive regular BiHom-Lie superalgebras by the techniques of connections of roots based on some work in [11] and [12]
Let us introduce the class of split algebras in the framework of involutive regular BiHom-Lie superalgebras
Summary
The notion of Hom-Lie algebras was first introduced by Hartwig, Larsson and Silvestrov in [1], who developed an approach to deformations of the Witt and Virasoro algebras based on σ-deformations. A BiHom-algebra is an algebra in which the identities defining the structure are twisted by two homomorphisms φ and ψ. This class of algebras was introduced from a categorical approach in [2] which can be viewed as an extension of the class of Hom-algebras. If the two linear maps are the same automorphisms, BiHom-algebras will return to Hom-algebras These algebraic structures include BiHomassociative algebras, BiHom-Lie algebras and BiHom-bialgebras. The purpose of this paper is to consider the structure of involutive regular BiHom-Lie superalgebras by the techniques of connections of roots based on some work in [11] and [12].
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