Hypercube drawings with no long plane paths

Abstract

We study the existence of plane substructures in drawings of the d-dimensional hypercube graph Qd. We construct drawings of Qd which contain no plane subgraph with more than 2d-2 edges, no plane path with more than 2d-3 edges, and no plane matching of size more than 2d-4. On the other hand, we prove that every rectilinear drawing of Qd with vertices in convex position contains a plane path of length d (if d is odd) or d-1 (if d is even). We also prove that if a graph G is a plane subgraph of every drawing of Qd for a sufficiently large d, then G is necessarily a forest of caterpillars. Lastly, we give a short proof of a generalization of a result by Alpert et al. [Cong. Numerantium, 2009] on the maximum rectilinear crossing number of Qd.

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