We generalize the results of Leger and Luks and other researchers about generalized derivations to the cases of ternary Lie algebras and n-BiHom Lie algebras. We investigate the derivations algebras of ternary Lie algebras induced from Lie algebras, we explore the subalgebra of quasi-derivations and give their properties. Moreover, we give a classification of the derivations algebras for low dimensional ternary Lie algebras. For the class of n-BiHom Lie algebras, we study the algebras of generalized derivations and prove that the algebra of quasi-derivations can be embedded in the derivation algebra of a larger n-BiHom Lie algebra
The aim of this paper is to extend to ternary algebras the classical theory of formal deformations o...
We study the structure of n-Lie algebras with involutive derivations for n≥2. We obtain that a 3-Lie...
We prove that every 2-local derivation on a finite-dimensional semi-simple Lie algebra L over an alg...
The aim of this paper is to give a description of Lie derivations of generalized matrix algebras. As...
AbstractThe aim of this paper is to give a description of Lie derivations of generalized matrix alge...
In their paper [6], Leger and Luks introduced the notion of a generalized derivation in nonassociati...
AbstractSuppose L is a finite-dimensional Lie algebra with multiplication μ: L∧L→L. Let Δ(L) denote ...
Let R be a commutative ring with unity, A; B be R-algebras, M be (A; B)-bimodule and N be (B;A)-bimo...
Based on the relation between the notions of Lie triple systems and Jordan algebras, we introduce th...
Abstract. Motivated by the intensive and powerful works con-cerning additive mappings of operator al...
Let L be a Lie algebra. A derivation α of L is a commuting derivation (central derivation), if α (x)...
A left-symmetric algebra A is said to be a derivation algebra if all its left and right multiplicati...
Ternary derivations extend the concept of derivations to triples of linear maps. In this thesis, we ...
AbstractWe show a method to determine the space of derivations of any Lie algebra, and in particular...
The goal of this paper is to study cohomological theory of n-Lie algebras with derivations. We defin...
The aim of this paper is to extend to ternary algebras the classical theory of formal deformations o...
We study the structure of n-Lie algebras with involutive derivations for n≥2. We obtain that a 3-Lie...
We prove that every 2-local derivation on a finite-dimensional semi-simple Lie algebra L over an alg...
The aim of this paper is to give a description of Lie derivations of generalized matrix algebras. As...
AbstractThe aim of this paper is to give a description of Lie derivations of generalized matrix alge...
In their paper [6], Leger and Luks introduced the notion of a generalized derivation in nonassociati...
AbstractSuppose L is a finite-dimensional Lie algebra with multiplication μ: L∧L→L. Let Δ(L) denote ...
Let R be a commutative ring with unity, A; B be R-algebras, M be (A; B)-bimodule and N be (B;A)-bimo...
Based on the relation between the notions of Lie triple systems and Jordan algebras, we introduce th...
Abstract. Motivated by the intensive and powerful works con-cerning additive mappings of operator al...
Let L be a Lie algebra. A derivation α of L is a commuting derivation (central derivation), if α (x)...
A left-symmetric algebra A is said to be a derivation algebra if all its left and right multiplicati...
Ternary derivations extend the concept of derivations to triples of linear maps. In this thesis, we ...
AbstractWe show a method to determine the space of derivations of any Lie algebra, and in particular...
The goal of this paper is to study cohomological theory of n-Lie algebras with derivations. We defin...
The aim of this paper is to extend to ternary algebras the classical theory of formal deformations o...
We study the structure of n-Lie algebras with involutive derivations for n≥2. We obtain that a 3-Lie...
We prove that every 2-local derivation on a finite-dimensional semi-simple Lie algebra L over an alg...