k-Sets and Rectilinear Crossings in Complete Uniform Hypergraphs

Abstract

In this paper, we study the d-dimensional rectilinear drawings of the complete d-uniform hypergraph K2dd. Anshu et al. [Computational Geometry: Theory and Applications, 2017] used Gale transform and Ham-Sandwich theorem to prove that there exist (2d) crossing pairs of hyperedges in such a drawing of K2dd. We improve this lower bound by showing that there exist (2d d) crossing pairs of hyperedges in a d-dimensional rectilinear drawing of K2dd. We also prove the following results. 1. There are (2d d3/2) crossing pairs of hyperedges in a d-dimensional rectilinear drawing of K2dd when its 2d vertices are either not in convex position in Rd or form the vertices of a d-dimensional convex polytope that is t-neighborly but not (t+1)-neighborly for some constant t≥1 independent of d. 2. There are (2d d5/2) crossing pairs of hyperedges in a d-dimensional rectilinear drawing of K2dd when its 2d vertices form the vertices of a d-dimensional convex polytope that is (d/2-t')-neighborly for some constant t' ≥ 0 independent of d.