Binomial edge ideals and rational normal scrolls
Abstract
Let X be the Hankel matrix of size 2× n and let G be a closed graph on the vertex set [n]. We study the binomial ideal IG⊂ K[x1,…,xn+1] which is generated by all the 2-minors of X which correspond to the edges of G. We show that IG is Cohen-Macaulay. We find the minimal primes of IG and show that IG is a set theoretical complete intersection. Moreover, a sharp upper bound for the regularity of IG is given.
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