Quadratic (resp. symmetric) Leibniz superalgebras

“…For instance, in [7] the authors generalize the notion of double extension and describe quadratic Lie superalgebras; quadratic Leibniz algebras are also studied in [1] and in [8]. The authors in [9] investigate odd quadratic Leibniz superalgebras, in particular they proved that all quadratic Leibniz superalgebras are symmetric and they gave an inductive description of quadratic Leibniz superalgebra. In all these study of quadratic structure, we noticed that the invariance property or the associativity of the bilinear form B (that is…”

Simple and Pseudo Quadratic Leibniz Superalgebras

“…For instance, in [7] the authors generalize the notion of double extension and describe quadratic Lie superalgebras; quadratic Leibniz algebras are also studied in [1] and in [8]. The authors in [9] investigate odd quadratic Leibniz superalgebras, in particular they proved that all quadratic Leibniz superalgebras are symmetric and they gave an inductive description of quadratic Leibniz superalgebra. In all these study of quadratic structure, we noticed that the invariance property or the associativity of the bilinear form B (that is…”

Simple and Pseudo Quadratic Leibniz Superalgebras

“…The present paper is about symmetric (left and right) Zinbiel (super)algebras. This variety of algebras is dual to symmetric Leibniz algebras (about symmetric Leibniz algebras see in [5] and references therein) and it is very thin. As we have proven each symmetric Zinbiel algebra is a 2-step nilpotent or 3-step nilpotent algebra.…”

Symmetric Zinbiel superalgebras

The algebraic and geometric classification of nilpotent weakly associative and symmetric Leibniz algebras