Max Min vertex cover and the size of Betti tables

Abstract

Let G be a finite simple graph on n vertices, that contains no isolated vertices, and let I(G) ⊂eq S = K[x1, …, xn] be its edge ideal. In this paper, we study the pair of integers that measure the projective dimension and the regularity of S/I(G). We show that if the projective dimension of S/I(G) attains its minimum value 2n-2 then, with only one exception, the its regularity must be 1. We also provide a full description for the spectrum of the projective dimension of S/I(G) when the regularity attains its minimum value 1.