Using crossed homomorphisms, we show that the category of weak representations (resp. admissible representations) of Lie-Rinehart algebras (resp. Leibniz pairs) is a left module category over the monoidal category of representations of Lie algebras. In particular, the corresponding bifunctor of monoidal categories is established to give new weak representations (resp. admissible representations) of Lie-Rinehart algebras (resp. Leibniz pairs). This generalizes and unifies various existing constructions of representations of many Lie algebras by using this new bifunctor. We construct some crossed homomorphisms in different situations and use our actions of monoidal categories to recover some known constructions of representations of various L...
We show how the Connes-Moscovici's bialgebroid construction naturally provides universal objects for...
The category of group-graded modules over an abelian group $G$ is a monoidal category. For any bicha...
Bakalov, Kac and Voronov introduced Leibniz conformal algebras (and their cohomology) as a non-commu...
In this paper, first we give the notion of a crossed homomorphism on a 3-Lie algebra with respect to...
In this paper, we introduce the concept of crossed module for Hom-Leibniz-Rinehart algebras. We stud...
AbstractLet g be a Lie algebra over a field K. Endow the polynomial ring K[t] with a g-action by der...
In this paper, we give Maurer-Cartan characterizations as well as a cohomology theory for compatible...
The aim here is to sketch the development of ideas related to brackets and similar concepts: Some pu...
This book presents material in two parts. Part one provides an introduction to crossed modules of gr...
In this paper we study a cohomology theory of compatible Leibniz algebra. We construct a graded Lie ...
International audienceWe construct crossed modules for some famous 3-cocycles on the Lie algebra of ...
Let g be a Lie algebra over a field K. Endow the polynomial ring K[t] with a g-action by derivations...
Let $H$ be a bialgebra. Let $\sigma: H\otimes H\to A$ be a linear map, where $A$ is a left $H$-comod...
Empirical thesis.Bibliography: pages 49-50.1. Introduction -- 2. Crossed modules in protomodular, Ba...
In this article, we generalize Loday and Pirashvili's [10] computation of the Ext-category of Leibni...
We show how the Connes-Moscovici's bialgebroid construction naturally provides universal objects for...
The category of group-graded modules over an abelian group $G$ is a monoidal category. For any bicha...
Bakalov, Kac and Voronov introduced Leibniz conformal algebras (and their cohomology) as a non-commu...
In this paper, first we give the notion of a crossed homomorphism on a 3-Lie algebra with respect to...
In this paper, we introduce the concept of crossed module for Hom-Leibniz-Rinehart algebras. We stud...
AbstractLet g be a Lie algebra over a field K. Endow the polynomial ring K[t] with a g-action by der...
In this paper, we give Maurer-Cartan characterizations as well as a cohomology theory for compatible...
The aim here is to sketch the development of ideas related to brackets and similar concepts: Some pu...
This book presents material in two parts. Part one provides an introduction to crossed modules of gr...
In this paper we study a cohomology theory of compatible Leibniz algebra. We construct a graded Lie ...
International audienceWe construct crossed modules for some famous 3-cocycles on the Lie algebra of ...
Let g be a Lie algebra over a field K. Endow the polynomial ring K[t] with a g-action by derivations...
Let $H$ be a bialgebra. Let $\sigma: H\otimes H\to A$ be a linear map, where $A$ is a left $H$-comod...
Empirical thesis.Bibliography: pages 49-50.1. Introduction -- 2. Crossed modules in protomodular, Ba...
In this article, we generalize Loday and Pirashvili's [10] computation of the Ext-category of Leibni...
We show how the Connes-Moscovici's bialgebroid construction naturally provides universal objects for...
The category of group-graded modules over an abelian group $G$ is a monoidal category. For any bicha...
Bakalov, Kac and Voronov introduced Leibniz conformal algebras (and their cohomology) as a non-commu...