English

Maximum Rectilinear Crossing Number of Uniform Hypergraphs

Combinatorics 2023-09-21 v6

Abstract

We improve the lower bound on the dd-dimensional rectilinear crossing number of the complete dd-uniform hypergraph having 2d2d vertices to Ω((42/33/4)dd)\Omega\left(\dfrac{(4\sqrt{2}/3^{3/4})^d}{d}\right) from Ω(2dd)\Omega(2^d \sqrt{d}). We also establish that the 33-dimensional rectilinear crossing number of a complete 33-uniform hypergraph having n9n \geq 9 vertices is at least 4342(n6)\dfrac{43}{42}\dbinom{n}{6}. We prove that the maximum number of crossing pairs of hyperedges in a 44-dimensional rectilinear drawing of the complete 44-uniform hypergraph having nn vertices is 13(n8)13\dbinom{n}{8}. We also prove that among all 44-dimensional rectilinear drawings of a complete 44-uniform hypergraph having nn vertices, the number of crossing pairs of hyperedges is maximized if all its vertices are placed at the vertices of a 44-dimensional neighborly polytope. Our result proves the conjecture by Anshu et al. [Anshu, Gangopadhyay, Shannigrahi, and Vusirikala, 2017] for d=4d=4. We prove that the maximum dd-dimensional rectilinear crossing number of a complete dd-partite dd-uniform balanced hypergraph is (2d11)(n2)d(2^{d-1}-1){\dbinom{n}{2}}^d. We then prove that finding the maximum dd-dimensional rectilinear crossing number of an arbitrary dd-uniform hypergraph is NP-hard. We give a randomized scheme to create a dd-dimensional rectilinear drawing of a dd-uniform hypergraph HH such that, in expectation the total number of crossing pairs of hyperedges is a constant fraction of the maximum dd-dimensional rectilinear crossing number of HH.

Keywords

Cite

@article{arxiv.1908.04654,
  title  = {Maximum Rectilinear Crossing Number of Uniform Hypergraphs},
  author = {Rahul Gangopadhyay and Ayan},
  journal= {arXiv preprint arXiv:1908.04654},
  year   = {2023}
}

Comments

Accepted for publication in Graphs and Combinatorics

R2 v1 2026-06-23T10:46:21.336Z