Polytopes with large transversal ratio

Abstract

The transversal ratio of a polytope P is the minimum proportion of vertices of P required to intersect each facet of P. The weak chromatic number of P is the minimum number of colors required to color the vertices of P so that no facet is monochromatic. We will construct an infinite family of d-polytopes for each d≥ 5 whose transversal ratio approaches 1 as the number of vertices grows. In particular, this implies that the weak chromatic number for d-polytopes is unbounded for each d≥ 5. The previous best known lower bounds on the supremum of the transversal ratio for d-polytopes for d≥ 5 were 2/5 for odd d by Novik and Zheng, and 1/2 for even d by Holmsen, Pach, and Tverberg. In the case of simplicial (d-1)-spheres, the best known lower bounds were 1/2 for d=5 and 6/11 for d=6 by Novik and Zheng.

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