Stable division and essential normality: the non-homogeneous and quasi homogeneous cases

Abstract

Let Hd(t) (t ≥ -d, t>-3) be the reproducing kernel Hilbert space on the unit ball Bd with kernel \[ k(z,w) = 1(1- z, w )d+t+1 . \] We prove that if an ideal I C[z1, …, zd] (not necessarily homogeneous) has what we call the "approximate stable division property", then the closure of I in Hd(t) is p-essentially normal for all p>d. We then show that all quasi homogeneous ideals in two variables have the stable division property, and combine these two results to obtain a new proof of the fact that the closure of any quasi homogeneous ideal in C[x,y] is p-essentially normal for p>2.