The Nowicki Conjecture for free metabelian Lie algebras

Abstract

Let K[Xd]=K[x1,…,xd] be the polynomial algebra in d variables over a field K of characteristic 0. The classical theorem of Weitzenb\"ock from 1932 states that for linear locally nilpotent derivations δ (known as Weitzenb\"ock derivations) the algebra of constants K[Xd]δ is finitely generated. When the Weitzenb\"ock derivation δ acts on the polynomial algebra K[Xd,Yd] in 2d variables by δ(yi)=xi, δ(xi)=0, i=1,…,d, Nowicki conjectured that K[Xd,Yd]δ is generated by Xd and xiyj-yixj for all 1≤ i<j≤ d. There are several proofs based on different ideas confirming this conjecture. Considering arbitrary Weitzenb\"ock derivations of the free d-generated metabelian Lie algebra Fd, with few trivial exceptions, the algebra Fdδ is not finitely generated. However, the vector subspace (Fd')δ of the commutator ideal Fd' of Fd is finitely generated as a K[Xd]δ-module. In this paper we study an analogue of the Nowicki conjecture in the Lie algebra setting and give an explicit set of generators of the K[Xd,Yd]δ-module (F2d')δ.