On dihedral invariants of the free associative algebra of rank two

Abstract

Let K Xd denote the free associative algebra of rank d ≥ 2 over a field K. By results of Lane (1976) and Kharchenko (1978), the algebra of invariants K Xd G is free for any subgroup G ≤ d(K) and any field K. Koryukin (1984) 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 endows K Xd with the structure of a (K Xd,)-S-algebra. With respect to this action, Koryukin proved that the invariant algebra K Xd G is finitely generated for every reductive group G. In this paper we study the algebra C u,vD2n of invariants under the action of the dihedral group D2n on the free associative algebra C u,v of rank 2. We compute the Hilbert series of C u,vD2n and construct an explicit set of generators for C u,vD2n as a free algebra. Furthermore, we describe a finite generating set for the S-algebra C u,vD2n$.