Halfspace separation in geodesic convexity

Abstract

Let G = V, E be a simple connected undirected graph. A set X ⊂eq V is geodesically convex if for any pair of vertices x, y ∈ X, all vertices on all shortest paths in G from x to y are contained in X. A set H ⊂eq V is said to be a halfspace if both H and its complement (denoted by Hc) are convex. Given two sets A, B ⊂eq V, the halfspace separation problem asks if there exist complementary halfspaces H, Hc such that A ⊂eq H and B ⊂eq Hc. The halfspace separation problem is known to be NP-complete for the geodesic convexity of general graphs. We show that geodesic halfspace separation is polynomial for weakly bridged graphs, pseudo-modular graphs, and the basis graphs of matroids.