AbstractSuppose L is a finite-dimensional Lie algebra with multiplication μ: L∧L→L. Let Δ(L) denote the set of triples (f,f′,f″), with f, f′, f″∈Hom(L,L), such that μ∘(f∧IL+IL∧f′)=f″∘μ. We consider the Lie algebra GenDer(L)={f∈Hom(L,L)|∃f′, f″: (f,f′, f″)∈Δ(L)}. Well-researched subalgebras of GenDer(L) include the derivation algebra, Der(L)={f∈Hom(L, L)|(f, f, f)∈Δ(L)}, and the centroid, C(L)={f∈Hom(L,L)|(f,0,f)∈δ(L)}. We now study the subalgebra QDer(L)={f∈Hom(L,L)|∃f′: (f,f,f′)∈Δ(L)}, and the subspace QC(L)={f∈Hom(L,L)|(f,−f,0)∈Δ(L)}. In characteristic ≠2, GenDer(L)=QDer(L)+QC(L) and we are concerned with the inclusions Der(L)⊆QDer(L) and C(L)⊆QC(L)∩QDer(L). If Z(L)=0 then C(L)=QC(L)∩QDer(L) and, under reasonable conditions on Lie algebra...
AbstractWe study Lie triple derivations of TUHF algebras. It is shown that if L is a continuous Lie ...
summary:Let $R$ be an arbitrary commutative ring with identity, $\operatorname{gl}(n,R)$ the general...
Let g be a nilpotent Lie algebra (of finite dimension n over an algebraically closed field of charac...
We generalize the results of Leger and Luks and other researchers about generalized derivations to t...
Let L be a Lie algebra. A derivation α of L is a commuting derivation (central derivation), if α (x)...
AbstractLet R be an arbitrary commutative ring with identity, gl(n,R) the general linear Lie algebra...
AbstractLet A be a prime algebra of characteristic not 2 with extended centroid C, let R be a noncen...
Let R be a commutative ring with unity, A; B be R-algebras, M be (A; B)-bimodule and N be (B;A)-bimo...
A left-symmetric algebra A is said to be a derivation algebra if all its left and right multiplicati...
The aim of this paper is to give a description of Lie derivations of generalized matrix algebras. As...
In their paper [6], Leger and Luks introduced the notion of a generalized derivation in nonassociati...
[[abstract]]Let A be a prime algebra of characteristic not 2 with extended centroid C, let R be a no...
AbstractThe aim of this paper is to give a description of Lie derivations of generalized matrix alge...
A nonzero locally nilpotent linear derivation ? of the polynomial algebra K[Xd]=K[x1,.,Xd] in severa...
Let A be a standard operator algebra on an infinite dimensional complex Hilbert space H containing i...
AbstractWe study Lie triple derivations of TUHF algebras. It is shown that if L is a continuous Lie ...
summary:Let $R$ be an arbitrary commutative ring with identity, $\operatorname{gl}(n,R)$ the general...
Let g be a nilpotent Lie algebra (of finite dimension n over an algebraically closed field of charac...
We generalize the results of Leger and Luks and other researchers about generalized derivations to t...
Let L be a Lie algebra. A derivation α of L is a commuting derivation (central derivation), if α (x)...
AbstractLet R be an arbitrary commutative ring with identity, gl(n,R) the general linear Lie algebra...
AbstractLet A be a prime algebra of characteristic not 2 with extended centroid C, let R be a noncen...
Let R be a commutative ring with unity, A; B be R-algebras, M be (A; B)-bimodule and N be (B;A)-bimo...
A left-symmetric algebra A is said to be a derivation algebra if all its left and right multiplicati...
The aim of this paper is to give a description of Lie derivations of generalized matrix algebras. As...
In their paper [6], Leger and Luks introduced the notion of a generalized derivation in nonassociati...
[[abstract]]Let A be a prime algebra of characteristic not 2 with extended centroid C, let R be a no...
AbstractThe aim of this paper is to give a description of Lie derivations of generalized matrix alge...
A nonzero locally nilpotent linear derivation ? of the polynomial algebra K[Xd]=K[x1,.,Xd] in severa...
Let A be a standard operator algebra on an infinite dimensional complex Hilbert space H containing i...
AbstractWe study Lie triple derivations of TUHF algebras. It is shown that if L is a continuous Lie ...
summary:Let $R$ be an arbitrary commutative ring with identity, $\operatorname{gl}(n,R)$ the general...
Let g be a nilpotent Lie algebra (of finite dimension n over an algebraically closed field of charac...