Weighted graphs defining facets: a connection between stable set and linear ordering polytopes

TL;DR

This paper explores the relationship between weighted alpha-critical graphs related to stable set polytopes and linear ordering polytopes, establishing connections and deriving new results including an alternative proof of Lovász's finite basis theorem.

Contribution

It demonstrates that facet-defining graphs for the linear ordering polytope can be derived from 1-critical facet-graphs, linking two weighted generalizations of alpha-critical graphs.

Findings

Facet-defining graphs are obtainable from 1-critical facet-graphs.

Derived results from the finite basis theorem for critical facet-graphs.

Provided an alternative proof of Lovász's finite basis theorem.

Abstract

A graph is alpha-critical if its stability number increases whenever an edge is removed from its edge set. The class of alpha-critical graphs has several nice structural properties, most of them related to their defect which is the number of vertices minus two times the stability number. In particular, a remarkable result of Lov\'asz (1978) is the finite basis theorem for alpha-critical graphs of a fixed defect. The class of alpha-critical graphs is also of interest for at least two topics of polyhedral studies. First, Chv\'atal (1975) shows that each alpha-critical graph induces a rank inequality which is facet-defining for its stable set polytope. Investigating a weighted generalization, Lipt\'ak and Lov\'asz (2000, 2001) introduce critical facet-graphs (which again produce facet-defining inequalities for their stable set polytopes) and they establish a finite basis theorem. Second, Koppen (1995) describes a construction that delivers from any alpha-critical graph a facet-defining inequality for the linear ordering polytope. Doignon, Fiorini and Joret (2006) handle the weighted case and thus define facet-defining graphs. Here we investigate relationships between the two weighted generalizations of alpha-critical graphs. We show that facet-defining graphs (for the linear ordering polytope) are obtainable from 1-critical facet-graphs (linked with stable set polytopes). We then use this connection to derive various results on facet-defining graphs, the most prominent one being derived from Lipt\'ak and Lov\'asz's finite basis theorem for critical facet-graphs. At the end of the paper we offer an alternative proof of Lov\'asz's finite basis theorem for alpha-critical graphs.