On the Hypergraph Nash-Williams' Conjecture

TL;DR

This paper advances the understanding of hypergraph decompositions by proving new degree conditions that guarantee the existence of $K_q^r$-decompositions, confirming a conjecture related to Nash-Williams' conjecture in hypergraphs.

Contribution

It establishes a new degree threshold for hypergraph decompositions, combining fractional and integral results, and introduces refined absorption and non-uniform Turán methods.

Findings

Proves that certain minimum degree conditions ensure $K_q^r$-decomposition.

Confirms the order of $q$ in the Hypergraph Nash-Williams' Conjecture.

Develops new absorption and Turán techniques for hypergraph embeddings.

Abstract

In 2014, Keevash proved the existence of $(n,q,r)$-Steiner systems (equivalently $K_q^r$-decompositions of $K_n^r$) for all large enough $n$ satisfying the necessary divisibility conditions. In 2021, Glock, K\"uhn, and Osthus proposed a generalization of this result. Namely they conjectured a hypergraph version of Nash-Williams' Conjecture positing that if a $K_q^r$-divisible $r$-graph $G$ on $n$ vertices has minimum $(r-1)$-degree (denoted $\delta(G)$ hereafter) at least $\left(1-\Theta_r\left(\frac{1}{q^{r-1}}\right)\right) \cdot n$, then $G$ admits a $K_q^r$-decomposition. The best known progress on this conjecture dates to the second proof of the Existence Conjecture by Glock, K\"uhn, Lo, and Osthus wherein they showed that $\delta(G)\ge \left(1-\frac{c}{q^{2r}}\right)\cdot n$ suffices for large enough $n$, where $c$ is a constant depending on $r$ but not $q$. As for the fractional relaxation, the best known bound is due to Delcourt, Lesgourgues, and the second author, who proved that $\delta(G)\ge \left(1-\frac{c}{q^{r-1 + o(1)}}\right)\cdot n$ guarantees a $K_q^r$-fractional decomposition. We prove that for every integer $r\ge 2$, there exists a real $c>0$ such that if a $K_q^r$-divisible $r$-graph $G$ satisfies $\delta(G)\ge \max\left\{ \delta_{K_q^r}^* + \varepsilon,~~1 -\frac{c}{\binom{q}{r-1}} \right\} \cdot n$, then $G$ admits a $K_q^r$-decomposition for all large enough $n$, where $\delta_{K_q^r}^*$ denotes the fractional $K_q^r$-decomposition threshold. Combined with the fractional result above, this proves that $\left(1-\frac{c}{q^{r-1 + o(1)}}\right)\cdot n$ suffices for the Hypergraph Nash-Williams' Conjecture, approximately confirming the correct order of $q$. Our proof uses the newly developed method of refined absorption; we also develop a non-uniform Tur\'an theory to prove the existence of many embeddings of absorbers which may be of independent interest.