Varieties of group-graded algebras of proper central exponent greater than two

Abstract

Let F be a field of characteristic zero and let V be a variety of associative F-algebras graded by a finite abelian group G. To a variety V is associated a numerical sequence called the sequence of proper central G-codimensions, cG,δn( V), \, n 1. Here cG,δn( V) is the dimension of the space of multilinear proper central G-polynomials in n fixed variables of any algebra A generating the variety V. Such sequence gives information on the growth of the proper central G-polynomials of A and in LMR it was proved that expG,δ( V)=n∞[n]cnG,δ( V) exists and is an integer called the proper central G-exponent. The aim of this paper is to characterize the varieties of associative G-graded algebras of proper central G-exponent greater than two. To this end we construct a finite list of G-graded algebras and we prove that expG,δ( V) >2 if and only if at least one of the algebras belongs to V. Matching this result with the characterization of the varieties of almost polynomial growth given in GLP, we obtain a characterization of the varieties of proper central G-exponent equal to two.