A Lower Bound For Depths of Powers of Edge Ideals

Abstract

Let G be a graph and let I be the edge ideal of G. Our main results in this article provide lower bounds for the depth of the first three powers of I in terms of the diameter of G. More precisely, we show that R/It ≥ d-4t+53 +p-1, where d is the diameter of G, p is the number of connected components of G and 1 ≤ t ≤ 3. For general powers of edge ideals we show