AbstractWe show that every finite Z-grading of a simple associative algebra A comes from a Peirce decomposition induced by a complete system of orthogonal idempotents lying in the maximal left quotient algebra of A (which coincides with the graded maximal left quotient algebra of A). Moreover, a nontrivial 3-grading can be found. This grading provides 3-gradings in simple M-graded Lie algebras. Some consequences are obtained for left nonsingular algebras with a finite Z-grading
2010 Mathematics Subject Classification: Primary 17B70, secondary 17B40, 16W50.Given a grading Γ : L...
AbstractWe solve the generator problem for Z-graded central simple algebras. Applications are given ...
AbstractAn infinite-dimensional N-graded k-algebra A is called projectively simple if dimkA/I<∞ for ...
AbstractWe show that every finite Z-grading of a simple associative algebra A comes from a Peirce de...
AbstractWe show that the algebra Der(L) of derivations of a strongly nondegenerate Lie algebra L gra...
AbstractIn this paper, we examine a class of algebras which includes Lie algebras, Lie color algebra...
AbstractIn this paper we explore graded algebras of quotients of Lie algebras with special emphasis ...
AbstractWe describe gradings by finite abelian groups on the associative algebras of infinite matric...
AbstractThe concept of a graded Lie ring L is studied systematically. A grading of L is defined as a...
A set grading on the split simple Lie algebra of type $D_{13}$, that cannot be realized as a group-g...
AbstractLet R=⊕g∈GRg be a G-graded ring. We describe all types of gradings on R if G is torsion free...
AbstractThe notion of A-graded algebras was introduced by V.I. Arnold, who made a complete classific...
This paper introduces two new algorithms for Lie algebras over finite fields and applies them to the...
Assuming the base field is algebraically closed, we classify, up to isomorphism, gradings by arbitr...
This thesis investigates the role of filtrations and gradings in the study of Lie superalgebras. The...
2010 Mathematics Subject Classification: Primary 17B70, secondary 17B40, 16W50.Given a grading Γ : L...
AbstractWe solve the generator problem for Z-graded central simple algebras. Applications are given ...
AbstractAn infinite-dimensional N-graded k-algebra A is called projectively simple if dimkA/I<∞ for ...
AbstractWe show that every finite Z-grading of a simple associative algebra A comes from a Peirce de...
AbstractWe show that the algebra Der(L) of derivations of a strongly nondegenerate Lie algebra L gra...
AbstractIn this paper, we examine a class of algebras which includes Lie algebras, Lie color algebra...
AbstractIn this paper we explore graded algebras of quotients of Lie algebras with special emphasis ...
AbstractWe describe gradings by finite abelian groups on the associative algebras of infinite matric...
AbstractThe concept of a graded Lie ring L is studied systematically. A grading of L is defined as a...
A set grading on the split simple Lie algebra of type $D_{13}$, that cannot be realized as a group-g...
AbstractLet R=⊕g∈GRg be a G-graded ring. We describe all types of gradings on R if G is torsion free...
AbstractThe notion of A-graded algebras was introduced by V.I. Arnold, who made a complete classific...
This paper introduces two new algorithms for Lie algebras over finite fields and applies them to the...
Assuming the base field is algebraically closed, we classify, up to isomorphism, gradings by arbitr...
This thesis investigates the role of filtrations and gradings in the study of Lie superalgebras. The...
2010 Mathematics Subject Classification: Primary 17B70, secondary 17B40, 16W50.Given a grading Γ : L...
AbstractWe solve the generator problem for Z-graded central simple algebras. Applications are given ...
AbstractAn infinite-dimensional N-graded k-algebra A is called projectively simple if dimkA/I<∞ for ...
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