Star-Varieties 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 with involution *. Associated to V* are three sequences: the sequence of \(*\)-codimensions \( c*n( V*) \), the sequence of central \(*\)-codimensions \( c*,zn( V*) \) and the sequence of proper central \(*\)-codimensions \( c*,δn( V*) \). These sequences provide information on the growth of, respectively, the *-polynomial identities, the central *-polynomial and the proper central *-polynomial of any generating algebra with involution A of V*. In MR2022 it was proved that exp*,δ( V*)=n∞[n]cn*,δ( V*) exists and is an integer called the proper central *-exponent. The aim of this paper is to study the varieties of associative algebras with involution of proper central *-exponent greater than two. To this end we construct a finite list of algebras with involution and we prove that if exp*,δ( V*) >2, then at least one of these algebras belongs to V*.
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