Restrictions on Hilbert coefficients give depths of graded domains
Abstract
In this paper, we prove that if P is a homogeneous prime ideal inside a standard graded polynomial ring S with (S/P)=d, and for s ≤ d, adjoining s general linear forms to the prime ideal changes the (d-s)-th Hilbert coefficient by 1, then depth(S/P)=s-1. This criterion also tells us about possible restrictions on the generic initial ideal of a prime ideal inside a polynomial ring.
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