On the GL(n)-module structure of Lie nilpotent associative relatively free algebras

Abstract

Let K X denote the free associative algebra generated by a set X = \x1, …, xn\ over a field K of characteristic 0. Let Ip, for p ≥ 2, denote the two-sided ideal in K X generated by all commutators of the form [u1, …, up], where u1, …, up ∈ K X . We discuss the GL(n, K)-module structure of the quotient K X / Ip+1 for all p ≥ 1 under the standard diagonal action. We give a bound on the values of partitions λ such that the irreducible GL(n, K)-module Vλ appears in the decomposition of K X / Ip+1 as a GL(n, K)-module. As an application, we take K = C and we consider the algebra of invariants (C X / Ip+1)G for G = SL(n, C), O(n, C), SO(n, C), or Sp(2s, C) (for n=2s). By a theorem of Domokos and Drensky, (C X / Ip+1)G is finitely generated. We give an upper bound on the degree of generators of (C X / Ip+1)G in a minimal generating set. In a similar way, we consider also the algebra of invariants (C X / Ip+1)G, where G=UT(n, C), and give an upper bound on the degree of generators in a minimal generating set. These results provide useful information about the invariants in C X G from the point of view of Classical Invariant Theory. In particular, for all G as above we give a criterion when a G-invariant of C X belongs to Ip.