Extension complexity of stable set polytopes of bipartite graphs

Abstract

The extension complexity xc(P) of a polytope P is the minimum number of facets of a polytope that affinely projects to P. Let G be a bipartite graph with n vertices, m edges, and no isolated vertices. Let STAB(G) be the convex hull of the stable sets of G. It is easy to see that n ≤slant xc (STAB(G)) ≤slant n+m. We improve both of these bounds. For the upper bound, we show that xc (STAB(G)) is O(n2 n), which is an improvement when G has quadratically many edges. For the lower bound, we prove that xc (STAB(G)) is (n n) when G is the incidence graph of a finite projective plane. We also provide examples of 3-regular bipartite graphs G such that the edge vs stable set matrix of G has a fooling set of size |E(G)|.