The linkedness of cubical polytopes: beyond the cube

Abstract

A cubical polytope is a polytope with all its facets being combinatorially equivalent to cubes. The paper is concerned with the linkedness of the graphs of cubical polytopes. A graph with at least 2k vertices is k-linked if, for every set of k disjoint pairs of vertices, there are k vertex-disjoint paths joining the vertices in the pairs. We say that a polytope is k-linked if its graph is k-linked. In a previous paper BuiPinUgo20a we proved that every cubical d-polytope is d/2-linked. Here we strengthen this result by establishing the (d+1)/2-linkedness of cubical d-polytopes, for every d 3. A graph G is strongly k-linked if it has at least 2k+1 vertices and, for every vertex v of G, the subgraph G-v is k-linked. We say that a polytope is (strongly) k-linked if its graph is (strongly) k-linked. In this paper, we also prove that every cubical d-polytope is strongly d/2-linked, for every d 3. These results are best possible for this class of polytopes.