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. A G-grading W = g ∈ GWg is said to be nondegenerate if Wg1Wg2... Wgr ≠ 0 for any r ≥ 1 and any r tuple (g1, g2,..., gr) in Gr.