In this article we obtain a tensor product theorem for a certain class of associative algebras in the braided category of G G -graded vector spaces over C C where G G is a finite abelian group. The tensor product theorem describes the irreducible modules of the tensor product of G G -graded associative algebras in this class as the tensor product of the irreducibles of each of its constituents. Applying this general result to the universal enveloping algebras of basic classical Lie superalgebras or the queer Lie superalgebra or even certain Lie color algebras, we get an extension of a result of Yousofzadeh J. Algebra 606 (2022), pp. 19–29 to this larger class of algebras. Along the way, we also extend to the G G -graded setting the results of Lemire Proc. Amer. Math. Soc. 22 (1969), pp. 192–197 which relates the irreducibility of a representation of a semi-simple Lie algebra L L to the irreducibility of its weight spaces considered as modules for the centralizer of the Cartan subalgebra in the universal enveloping algebra of L L. We prove it in a more general setting of G G -graded associative algebras with a G G -compatible grading by another abelian group. In the case of the universal enveloping algebras of Lie superalgebras and Lie color algebras belonging to the class mentioned earlier, these results give us the analogues of Lemire’s results.
Dhali et al. (Thu,) studied this question.
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