Minimal Varieties and Identities of Relatively Free Algebras

Abstract

Let K be a field of characteristic zero and let M5 be the variety of associative algebras over K, defined by the identity [x1,x2][x3,x4,x5]. It is well-known that such variety is a minimal variety and that is generated by the algebra A=pmatrix E0 & E\\ 0 & E\\ pmatrix, where E=E0 E1 is the Grassmann algebra. In this paper, for any positive integer k, we describe the polynomial identities of the relatively free algebras of rank k of M5, \[Fk(M5)=K x1,…, xk K x1,…, xk T(M5).\] It turns out that such algebras satisfy the same polynomial identities of some algebras used in the description of the subvarieties of M5, given by Di Vincenzo, Drensky and Nardozza.