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Lie algebras and algebras of associative type that every finite-dimensional semisimple algebra of associative type A = ⊕αεG Aα graded by some group G, over
Lie algebras and algebras of associative type that every finite-dimensional semisimple algebra of associative type A = ⊕αεG Aα graded by some group G, over
Associative n-Tuple algebras. Moreover, in terms of sandwich algebras, we describe a finite-dimensional n-tuple algebra A, over
On the nilpotency and decomposition of Lie-type algebras is proved. Moreover, it is shown that every semisimple algebra of associative type with ordered grading
On the nilpotency and decomposition of Lie-type algebras is proved. Moreover, it is shown that every semisimple algebra of associative type with ordered grading
Invariants of the action of a semisimple finite-dimensional Hopf algebra on special algebras of a finite-dimensional semisimple Hopf algebra H on a special algebra A, which is homomorphically
Associative n-Tuple algebras. Moreover, in terms of sandwich algebras, we describe a finite-dimensional n-tuple algebra A, over
Invariants of the action of a semisimple finite-dimensional Hopf algebra on special algebras of a finite-dimensional semisimple Hopf algebra H on a special algebra A, which is homomorphically
Finite-dimensional homogeneously simple algebras of associative typeIn this paper, we describe finite-dimensional homogeneously simple algebras of associative type
Invariants of the action of a semisimple Hopf algebra on PI-algebra of finite groups to the case of action of a finite-dimensional Hopf algebra H on an algebra satisfying a
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