Classical invariant theory for free metabelian Lie algebras

Abstract

Let KXd be a vector space with basis Xd=\x1,…,xd\ over a field K of characteristic 0. One of the main topics of classical invariant theory is the study of the algebra of invariants K[Xd]SL2(K), where KXd is a module of the special linear group SL2(K) isomorphic to a direct sum Vk1·s Vkr and Vk is the SL2(K)-module of binary forms of degree k. Noncommutative invariant theory deals with the algebra of invariants Fd( V)G of the group G<GLd(K) acting on the relatively free algebra Fd( V) of a variety of K-algebras V. In this paper we consider the free metabelian Lie algebra Fd( A2) which is the relatively free algebra in the variety A2 of metabelian (solvable of class 2) Lie algebras. We study the algebra Fd( A2)SL2(K) of SL2(K)-invariants of Fd( A2). We describe the cases when this algebra is finitely generated. This happens if and only if KXd V1 V0·s V0 or KXd V2 as an SL2(K)-module (and in the trivial case KXd V0·s V0). For small d we give a list of generators even when Fd( A2)SL2(K) is not finitely generated. The methods for establishing that the algebra Fd( A2)SL2(K) is not finitely generated work also for other relatively free algebras Fd( V) and for other groups G.