English

Three-dimensional graph products with unbounded stack-number

Combinatorics 2024-04-19 v1 Discrete Mathematics

Abstract

We prove that the stack-number of the strong product of three nn-vertex paths is Θ(n1/3)\Theta(n^{1/3}). The best previously known upper bound was O(n)O(n). No non-trivial lower bound was known. This is the first explicit example of a graph family with bounded maximum degree and unbounded stack-number. The main tool used in our proof of the lower bound is the topological overlap theorem of Gromov. We actually prove a stronger result in terms of so-called triangulations of Cartesian products. We conclude that triangulations of three-dimensional Cartesian products of any sufficiently large connected graphs have large stack-number. The upper bound is a special case of a more general construction based on families of permutations derived from Hadamard matrices. The strong product of three paths is also the first example of a bounded degree graph with bounded queue-number and unbounded stack-number. A natural question that follows from our result is to determine the smallest Δ0\Delta_0 such that there exist a graph family with unbounded stack-number, bounded queue-number and maximum degree Δ0\Delta_0. We show that Δ0{6,7}\Delta_0\in \{6,7\}.

Keywords

Cite

@article{arxiv.2202.05327,
  title  = {Three-dimensional graph products with unbounded stack-number},
  author = {David Eppstein and Robert Hickingbotham and Laura Merker and Sergey Norin and Michał T. Seweryn and David R. Wood},
  journal= {arXiv preprint arXiv:2202.05327},
  year   = {2024}
}
R2 v1 2026-06-24T09:31:06.669Z