A study of a quadratic almost complete intersection ideal and its linked Gorenstein ideal

Abstract

We examine the ideal I=(x12, …, xn2, (x1+…+xn)2) in the polynomial ring Q=k[x1, …, xn], where k is a field of characteristic zero or greater than n. We also study the Gorenstein ideal G linked to I via the complete intersection ideal (x12, …, xn2). We compute the Betti numbers of I and G over Q when n is odd and extend known computations when n is even. A consequence is that the socle of Q/I is generated in a single degree (thus Q/I is level) and its dimension is a Catalan number. We also describe the generators and the initial ideal with respect to reverse lexicographic order for the Gorenstein ideal G.

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