Periodicity of betti numbers of monomial curves
Abstract
Let K be an arbitrary field. Let = (a1< ... <an) be a sequence of positive integers. Let C() be the affine monomial curve in An parametrized by t (ta1, ..., tan). Let I() be the defining ideal of C() in K[x1, ..., xn]. For each positive integer j, let +j be the sequence (a1 + j, ..., an+j). In this paper, we prove the conjecture of Herzog and Srinivasan saying that the betti numbers of I( + j) are eventually periodic in j with period an -a1. When j is large enough, we describe the betti table for the closure of C(+j) in n.
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