A counterexample to Hickingbotham's conjecture about k-ghost-edges

Abstract

Fix k∈ N and let G be a connected graph with tw(G)≤ k. We say that xy∈ E(Gc) is a k-ghost-edge of G if for every tree decomposition (T,) of G with width at most k, the set \x,y\ is contained in a bag of (T,). Although a k-ghost-edge of G is not an edge of G, but it behaves like real edges with respect to tree decomposition of G with width at most k. For any graph G with treewidth k and xy∈ E(Gc), when there are at least k+1 internally vertex disjoint (x,y)-paths, Hickingbotham proved that xy is a k-ghost-edge of G; while when there are at most k internally vertex disjoint (x,y)-paths, he conjectured that it is not a k-ghost-edge of G. In this paper, we prove that this conjecture is wrong.