English

Hypergraph universality via branching random walks

Combinatorics 2024-12-02 v1 Probability

Abstract

Given a family of hypergraphs H\mathcal{H}, we say that a hypergraph Γ\Gamma is H\mathcal{H}-universal if it contains every HHH \in \mathcal{H} as a subgraph. For D,rND, r \in \mathbb{N}, we construct an rr-uniform hypergraph with Θ(nrr/Dlogr/D(n))\Theta\left(n^{r - r/D} \log^{r/D}(n)\right) edges which is universal for the family of all rr-uniform hypergraphs with nn vertices and maximum degree at most DD. This almost matches a trivial lower bound Ω(nrr/D)\Omega(n^{r - r/D}) coming from the number of such hypergraphs. On a high level, we follow the strategy of Alon and Capalbo used in the graph case, that is r=2r = 2. The construction of Γ\Gamma is deterministic and based on a bespoke product of expanders, whereas showing that Γ\Gamma is universal is probabilistic. Two key new ingredients are a decomposition result for hypergraphs of bounded density, based on Edmond's matroid partitioning theorem, and a tail bound for branching random walks on expanders.

Keywords

Cite

@article{arxiv.2411.19432,
  title  = {Hypergraph universality via branching random walks},
  author = {Rajko Nenadov},
  journal= {arXiv preprint arXiv:2411.19432},
  year   = {2024}
}

Comments

15 pages

R2 v1 2026-06-28T20:16:22.823Z