Graded Imbeddings in Finite Dimensional Simple Graded Algebras
Abstract
Let F be a field and G a group. This work is inspired in the following problem: " given a division (simple) G-graded F-algebra, is there any other division (simple) G-graded F-algebra such that the former can be G-imbedded in the latter?". In this work, we answer this question affirmatively for F algebraically closed, G finite abelian, and associative algebras of finite dimension. To prove this, we apply concepts and properties of Group Cohomology. We show H2(H, F*)=resGH (H2(G, F*)), where H is a subgroup of G and resGH is the restriction homomorphism. Posteriorly, we prove that, given any H1,H2≤G and σi∈Z2(Hi,F*), i=1,2, are equivalent: i) Fσ1[H1] G Fσ2[H2]; ii) H1≤ H2 and [σ1]=[σ2]H1; iii) TG(Fσ2[H2])⊂eq TG(Fσ1[H1]), where TG(Fσi[Hi]) is the GT-ideal of graded identities of Fσi[Hi]. Furthermore, we prove that, given A and B two finite dimensional simple G-graded F-algebras, if F is algebraically closed, char(F) = 0 or char (F) is coprime with the order of each finite subgroup of G, and any subgroup of G is normal, then TG(A)⊂eq TG(B) iff B G A.
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