Locally nilpotent Lie algebras of derivations of integral domains

Abstract

Let K be a field of characteristic zero and A an integral domain over K. The Lie algebra K A of all K-derivations of A carries very important information about the algebra A. This Lie algebra is embedded into the Lie algebra R K A⊂eq KR, where R= Frac(A) is the fraction field of A. The rank rkRL of a subalgebra L of R K A is defined as dimension R RL. We prove that every locally nilpotent subalgebra L of R K A with rkRL=n has a series of ideals 0=L0⊂ L1⊂ L2… ⊂ Ln=L such that R Li=i and all the quotient Lie algebras Li+1/Li, i=0, … , n-1, are abelian. We also describe all maximal (with respect to inclusion) locally nilpotent subalgebras L of the Lie algebra R K A with rkRL=3.