Complete Intersection Toric Ideals of Oriented Graphs and Chorded-Theta Subgraphs

Abstract

Let G=(V,E) be a finite, simple graph. We consider for each oriented graph G O associated to an orientation O of the edges of G, the toric ideal PG O. In this paper we study those graphs with the property that PG O is a binomial complete intersection, for all O. These graphs are called CI O graphs. We prove that these graphs can be constructed recursively as clique-sums of cycles and/or complete graphs. We introduce the chorded-theta subgraphs and their transversal triangles. Also we establish that the CI O graphs are determined by the property that each chorded-theta has a transversal triangle. As a consequence, we obtain that the tournaments hold this property. Finally we explicitly give the minimal forbidden induced subgraphs that characterize these graphs, these families of graphs are: prisms, pyramids, thetas and a particular family of wheels that we call θ-partial wheels.