On the intersection of Annihilator of the Valabrega-Valla module

Abstract

Let (A,) be a \ local ring with an infinite residue field and let I be an -primary ideal. Let = x1,…,xr be a A-superficial sequence \ I. Set I() = n≥ 1 In+1 () In. A consequence of a theorem due to Valabrega and Valla is that I() = 0 \ the initial forms x1*,…,xr* is a GI(A) regular sequence. Furthermore this holds if and only if GI(A) ≥ r. We show that if GI(A) < r then \[ r(I)= = x1,…,xr is a \\ A-superficial sequence w.r.t I A I() \ is \ -primary. \] Suprisingly we also prove that under the same hypotheses, \[ n≥ 1 r(In) \ is also \ -primary. \]