On cyclic invariants of the free associative algebra

Abstract

Let K Xd be the free associative algebra of rank d ≥ 2 over a field K. Lane in 1976 and Kharchenko in 1978 proved that the algebra of invariants K XdG is free for any subgroup G ≤ GLd(K) and any field K. Later, Kharchenko introduced an additional action of the symmetric group Sym(n) on the homogeneous component of degree n of K Xd, given by permuting the positions of the variables. This equips K Xd with the structure of a (K Xd,)-S-algebra. Then Koryukin showed that the algebra of invariants K XdG is finitely generated for every reductive group G with respect to this action. In our paper we study the algebra K x1,…,xdCd of invariants of the cyclic group Cd, d≥ 2, where K is an arbitrary field of characteristic 0. We compute the Hilbert series of K x1,…,xd Cd. When K= C we find a vector space basis of C x1,…,xd Cd and explicitly describe the generators of C x1,…,xd Cd as a free algebra. Moreover, we describe a finite generating set for the S-algebra ( C x1,…,xd Cd,). We also transfer the results for K= C to the case of an arbitrary field of characteristic 0 for the S-algebra (K x1,x2,x3 C3,) and find a minimal generating set for it as an S-algebra.