Minimal Monomial Reductions and the Reduced Fiber Ring of an Extremal Ideal

Abstract

Let I be a monomial ideal in a polynomial ring A=K[x1,...,xn]. We call a monomial ideal J to be a minimal monomial reduction ideal of I if there exists no proper monomial ideal L ⊂ J such that L is a reduction ideal of I. We prove that there exists a unique minimal monomial reduction ideal J of I and we show that the maximum degree of a monomial generator of J determines the slope p of the linear function (It)=pt+c for t 0. We determine the structure of the reduced fiber ring F(J) of J and show that F(J) is isomorphic to the inverse limit of an inverse system of semigroup rings determined by convex geometric properties of J.

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