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On group gradings on PI-algebras

Abstract

We show that there exists a constant K such that for any PI- algebra W and any nondegenerate G-grading on W where G is any group (possibly infinite), there exists an abelian subgroup U of G with [G:U]≀exp(W)K[G : U] \leq exp(W)^K. A G-grading W=⨁g∈GWgW = \bigoplus_{g \in G}W_g is said to be nondegenerate if Wg1Wg2...Wgrβ‰ 0W_{g_1}W_{g_2}... W_{g_r} \neq 0 for any rβ‰₯1r \geq 1 and any rr tuple (g1,g2,...,gr)(g_1, g_2,..., g_r) in GrG^r.Comment: 17 page

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