论文信息 - Group Gradings on Associative Algebras

Group Gradings on Associative Algebras

Abstract Let R = ⊕g ∈ G Rg be a G-graded ring. We describe all types of gradings on R if G is torsion free and R is Artinian semisimple. If R is a matrix algebra over an algebraically closed field F, then we give a description of all G-gradings on R provided that G is an abelian group. In the case of an abelian group G we also classify all finite-dimensional graded simple algebras and finite-dimensional graded division algebras over an algebraically closed field of characteristic zero.

S. Sehgal | Y. Bahturin | M. Zaicev

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