Rees algebras of complementary edge ideals

Abstract

In this paper we investigate the Rees algebras of squarefree monomial ideals I ⊂ S=K[x1,…,xn] generated in degree n-2, where K is a field. Every such ideal arises as the complementary edge ideal Ic(G) of a finite simple graph G. We describe the defining equations of the Rees algebra R(Ic(G)) in terms of the combinatorics of G. If G is a tree or a unicyclic graph whose unique induced cycle has length 3 or 4, we prove that R(Ic(G)) is Koszul. We also determine the asymptotic depth of the powers of Ic(G), proving that k ∞depth\, S/Ic(G)k=b(G), where b(G) is the number of bipartite connected components of G. Finally, we show that the index of depth stability of Ic(G) is at most n-2, and equality holds when G is a path graph.