The saturation number of powers of graded ideals

Abstract

Let S=K[x1,…,xn] be the polynomial ring in n variables over a field K with maximal ideal m=(x1,...,xn), and let I be a graded ideal of S. In this paper, we define the saturation number (I) of I to be the smallest non-negative integer k such that I:k+1= I:k. We show that f(k) is linearly bounded, and that f(k) is a quasi-linear function for k 0, if I is a monomial ideal. Furthermore, we show that (Ik)=k if I is a principal Borel ideal and prove that (Id,nk) =\l\:\; (kd-l)/(k-l) ≤ n\, where Id,n is the squarefree Veronese ideal generated in degree d. abstract