Hilbert Coefficients and Regularity of Binomial Edge Ideals
Abstract
Let G be a simple graph on n vertices, and let JG denotes the corresponding binomial edge ideal in S=K[x1,…,xn,y1,…,yn], where K is a field. We show that if a vertex satisfies a certain degree condition, then some Hilbert coefficients remain unchanged upon its removal, thereby providing a reduction technique for computing Hilbert coefficients. As an application, for any i≥ 0 and a pair (r,s) with r≥ 2, s∈ Z, we show that there always exists a graph G such that reg(S/JG)=r and ei(S/JG)=s, where reg(S/JG) and ei(R/JG) denote the Castelnuovo-Mumford regularity and the i-th Hilbert coefficient of S/JG, respectively. In particular, this demonstrates that there is no inherent relationship between the regularity and the Hilbert coefficients for the class of binomial edge ideals.
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