English

The threshold for stacked triangulations

Combinatorics 2022-01-11 v2 Probability

Abstract

A \emph{stacked triangulation} of a dd-simplex o={1,,d+1}\mathbf{o}=\{1,\ldots,d+1\} (d2d\geq 2) is a triangulation obtained by repeatedly subdividing a dd-simplex into d+1d+1 new ones via a new vertex (the case d=2d=2 is known as an Appolonian network). We study the occurrence of such a triangulation in the Linial--Meshulam model, i.e., for which pp does the random simplicial complex YYd(n,p)Y\sim \mathcal{Y}_d(n,p) contain the faces of a stacked triangulation of the dd-simplex o\mathbf{o}, with its internal vertices labeled in [n][n]. In the language of bootstrap percolation in hypergraphs, it pertains to the threshold for Kd+2d+1K_{d+2}^{d+1}, the (d+1)(d+1)-uniform clique on d+2d+2 vertices. Our main result identifies this threshold for every d2d\geq 2, showing it is asymptotically (αdn)1/d(\alpha_d n)^{-1/d}, where αd\alpha_d is the growth rate of the Fuss--Catalan numbers of order dd. The proof hinges on a second moment argument in the supercritical regime, and on Kalai's algebraic shifting in the subcritical regime.

Keywords

Cite

@article{arxiv.2112.12780,
  title  = {The threshold for stacked triangulations},
  author = {Eyal Lubetzky and Yuval Peled},
  journal= {arXiv preprint arXiv:2112.12780},
  year   = {2022}
}

Comments

29 pages, 7 figures

R2 v1 2026-06-24T08:30:14.841Z