Add to ORKGIn the present work, binary-Lie, assocyclic, and binary (-1,1) algebras are studied. We prove that, for every assocyclic algebra A, the algebra A(-) is binary-Lie. We find a simple non-Malcev binary-Lie superalgebra T that cannot be embedded in A(-s) for an assocyclic superalgebra A. We use the Grassmann envelope of T to prove the similar result for algebras. This solve negatively a problem by Filippov (see [1, Problem 2.108]). Finally, we prove that the superalgebra T is isomorphic to the commutator superalgebra A(-s) for a simple binary (-1,1) superalgebra A
AbstractIn this paper we establish a Gröbner–Shirshov bases theory for Lie algebras over commutative...
AbstractA Lie-admissible algebra gives a Lie algebra by anticommutativity. In this work we describe ...
A general superalgebra of vector type is a superalgebra obtained by a certain double process from an...
In the present work, binary-Lie, assocyclic, and binary (-1,1) algebras are studied. We prove that, ...
In the present work, binary-Lie, assocyclic, and binary (-1,1) algebras are studied. We prove that, ...
In the present work, binary-Lie, assocyclic, and binary (-1,1) algebras are studied. We prove that, ...
AbstractThe class of so-called Lie–Jordan algebras, which have one binary (Lie) operation [x,y] and ...
The simple non-associative algebra N (e(AS), q, n, t)(k) and its simple subalgebras are defined in [...
Over $\mathbb{C}$, Montgomery superized Herstein's construction of simple Lie algebras from finite-d...
AbstractThe main purpose of this work is to develop the basic notions of the Lie theory for commutat...
Lie antialgebras which is a $\Z_2$-graded commutative algebra (but not associative) was introduced i...
Lie antialgebras which is a $\Z_2$-graded commutative algebra (but not associative) was introduced i...
1 Lie algebras and the PBW theorem The Poincaré-Birkhoff-Witt (PBW) theorem (Jacobson [2]) implies ...
AbstractThe mutation algebra A(p, q) of a nonassociative algebra A is known to be Lie-admissible, as...
Superalgebras appeared (as graded algebras) in the context of al-gebraic topology and homological al...
AbstractIn this paper we establish a Gröbner–Shirshov bases theory for Lie algebras over commutative...
AbstractA Lie-admissible algebra gives a Lie algebra by anticommutativity. In this work we describe ...
A general superalgebra of vector type is a superalgebra obtained by a certain double process from an...
In the present work, binary-Lie, assocyclic, and binary (-1,1) algebras are studied. We prove that, ...
In the present work, binary-Lie, assocyclic, and binary (-1,1) algebras are studied. We prove that, ...
In the present work, binary-Lie, assocyclic, and binary (-1,1) algebras are studied. We prove that, ...
AbstractThe class of so-called Lie–Jordan algebras, which have one binary (Lie) operation [x,y] and ...
The simple non-associative algebra N (e(AS), q, n, t)(k) and its simple subalgebras are defined in [...
Over $\mathbb{C}$, Montgomery superized Herstein's construction of simple Lie algebras from finite-d...
AbstractThe main purpose of this work is to develop the basic notions of the Lie theory for commutat...
Lie antialgebras which is a $\Z_2$-graded commutative algebra (but not associative) was introduced i...
Lie antialgebras which is a $\Z_2$-graded commutative algebra (but not associative) was introduced i...
1 Lie algebras and the PBW theorem The Poincaré-Birkhoff-Witt (PBW) theorem (Jacobson [2]) implies ...
AbstractThe mutation algebra A(p, q) of a nonassociative algebra A is known to be Lie-admissible, as...
Superalgebras appeared (as graded algebras) in the context of al-gebraic topology and homological al...
AbstractIn this paper we establish a Gröbner–Shirshov bases theory for Lie algebras over commutative...
AbstractA Lie-admissible algebra gives a Lie algebra by anticommutativity. In this work we describe ...
A general superalgebra of vector type is a superalgebra obtained by a certain double process from an...