Some results on homogeneous locally nilpotent R-derivations on R[X,Y,Z]

Abstract

Let k be a field of characteristic zero and R a k-algebra. In this paper we study homogeneous R-lnds D on R[X,Y,Z] with respect to the standard weights (1,1,1). We show that when R is a PID, rank(D) can be at most 2 if (D) ≤slant 3. As a consequence we obtain a certain class of homogeneous lnds on k[4] whose kernel is k[3]. Further when R is a Dedekind domain, we give a bound for minimum number of generators of (D) as an R-algebra if (D) ≤slant 3.