Vanishing and non-negativity of the first normal Hilbert coefficient

Abstract

Let (R,m) be a Noetherian local ring such that R is reduced. We prove that, when R is S2, if there exists a parameter ideal Q⊂eq R such that e1(Q)=0, then R is regular and (m/Q)≤ 1. This leads to an affirmative answer to a problem raised by Goto-Hong-Mandal. We also give an alternative proof (in fact a strengthening) of their main result. In particular, we show that if R is equidimensional, then e1(Q)≥ 0 for all parameter ideals Q⊂eq R, and in characteristic p>0, we actually have e1*(Q)≥ 0. Our proofs rely on the existence of big Cohen-Macaulay algebras.