On Lie algebras consisting of locally nilpotent derivations

Abstract

Let K be an algebraically closed field of characteristic zero and A an integral K-domain. The Lie algebra DerK(A) of all K-derivations of A contains the set LND(A) of all locally nilpotent derivations. The structure of LND(A) is of great interest, and the question about properties of Lie algebras contained in LND(A) is still open. An answer to it in the finite dimensional case is given. It is proved that any finite dimensional (over K) subalgebra of DerK(A) consisting of locally nilpotent derivations is nilpotent. In the case A=K[x, y], it is also proved that any subalgebra of DerK(A) consisting of locally nilpotent derivations is conjugated by an automorphism of K[x, y] with a subalgebra of the triangular Lie algebra.