Binomial Edge Ideals of Unicyclic Graphs

Abstract

Let G be a connected simple graph on the vertex set [n]. Banerjee-Betancourt proved that depth(S/JG)≤ n+1. In this article, we prove that if G is a unicyclic graph, then the depth of S/JG is bounded below by n. Also, we characterize G with depth(S/JG)=n and depth(S/JG)=n+1. We then compute one of the distinguished extremal Betti numbers of S/JG. If G is obtained by attaching whiskers at some vertices of the cycle of length k, then we show that k-1≤ reg(S/JG)≤ k+1. Furthermore, we characterize G with reg(S/JG)=k-1, reg(S/JG)=k and reg(S/JG)=k+1. In each of these cases, we classify the uniqueness of extremal Betti number of these graphs.