Arithmetical rank of toric ideals associated to graphs

Abstract

Let IG ⊂ K[x1,...,xm] be the toric ideal associated to a finite graph G. In this paper we study the binomial arithmetical rank and the G-homogeneous arithmetical rank of IG in 2 cases: G is bipartite, IG is generated by quadratic binomials. In both cases we prove that the binomial arithmetical rank and the G-arithmetical rank coincide with the minimal number of generators of IG.