English

Saturation in the Hypercube and Bootstrap Percolation

Combinatorics 2016-04-06 v2 Discrete Mathematics

Abstract

Let QdQ_d denote the hypercube of dimension dd. Given dmd\geq m, a spanning subgraph GG of QdQ_d is said to be (Qd,Qm)(Q_d,Q_m)-saturated if it does not contain QmQ_m as a subgraph but adding any edge of E(Qd)E(G)E(Q_d)\setminus E(G) creates a copy of QmQ_m in GG. Answering a question of Johnson and Pinto, we show that for every fixed m2m\geq2 the minimum number of edges in a (Qd,Qm)(Q_d,Q_m)-saturated graph is Θ(2d)\Theta(2^d). We also study weak saturation, which is a form of bootstrap percolation. A spanning subgraph of QdQ_d is said to be weakly (Qd,Qm)(Q_d,Q_m)-saturated if the edges of E(Qd)E(G)E(Q_d)\setminus E(G) can be added to GG one at a time so that each added edge creates a new copy of QmQ_m. Answering another question of Johnson and Pinto, we determine the minimum number of edges in a weakly (Qd,Qm)(Q_d,Q_m)-saturated graph for all dm1d\geq m\geq1. More generally, we determine the minimum number of edges in a subgraph of the dd-dimensional grid PkdP_k^d which is weakly saturated with respect to `axis aligned' copies of a smaller grid PrmP_r^m. We also study weak saturation of cycles in the grid.

Keywords

Cite

@article{arxiv.1408.5488,
  title  = {Saturation in the Hypercube and Bootstrap Percolation},
  author = {Natasha Morrison and Jonathan A. Noel and Alex Scott},
  journal= {arXiv preprint arXiv:1408.5488},
  year   = {2016}
}

Comments

21 pages, 2 figures. To appear in Combinatorics, Probability and Computing

R2 v1 2026-06-22T05:37:31.764Z