Proof. Let $p(n)\, :\!= \frac{C\log n}{n^{s-1}}$ be as in the statement of Theorem2.1. Then, for every $n\equiv 1 \text{ }(\text{mod }s)$ chosen large enough, by Theorem2.1 we have

(1) \begin{equation} \mathbb{P}(\mathcal{H}_s(n-1,p(n-1))\text{ has a perfect matching})\ge \frac{1}{2}. \end{equation}

Now, define $q(n)\, :\!= \lceil 2\log _2(n)\rceil p(n-1)=\Theta \left (\frac{\log ^2 n}{n^{s-1}}\right )$ . In the following, we show that $\mathcal{H}_s(n,q(n))$ satisfies both (i) and (ii) w.h.p. provided $n\equiv 1 \text{ }(\text{mod }s)$ , which will then imply the statement of the lemma.

Consider sprinkling $l\, :\!= \lceil 2\log _2(n)\rceil$ independently generated copies $H_1,\ldots, H_l$ of $\mathcal{H}_s(n,p(n-1))$ on vertex-set $[n]$ . Their union $\tilde{H}$ forms a binomial random hypergraph with edge-probability $q'(n)\le l\cdot p(n-1)=q(n)$ . Now fix a vertex $v \in [n]$ . From the above we have

\begin{align*} &\mathbb{P}(\mathcal{H}_s(n,q(n))-v \text{ has no perfect matching}) \\ \le \: & \mathbb{P}(\mathcal{H}_s(n,q'(n))-v \text{ has no perfect matching}) \\ = \: & \mathbb{P}(\tilde{H}-v \text{ has no perfect matching})\\ \le \: & \prod _{i=1}^{l}{\mathbb{P}(H_i-v\text{ has no perfect matching})}. \end{align*}

By inequality 1, we have that $\mathbb{P}(H_i-v\text{ has no perfect matching})\le \frac{1}{2}$ for $i=1,\ldots, l$ . Altogether, it follows that the probability that $\mathcal{H}_s(n,q(n))-v$ has no perfect matching is at most $\left (\frac{1}{2}\right )^{2\log _2(n)}=\frac{1}{n^2}$ . Hence, by a union bound over all choices of $v$ , the probability that there exists a vertex $v$ for which $\mathcal{H}_s(n,q(n))-v$ has no perfect matching is at most $\frac{1}{n}$ . Thus, w.h.p. $\mathcal{H}_s(n,q(n))$ satisfies property (i).

Let us now move on to property (ii). For that purpose, we want to show that w.h.p. for every number $f=1,\ldots, m$ , no subset of $[n]$ of size $(s-1)f-1$ contains $f$ hyperedges from $\mathcal{H}_s(n,q(n))$ . By a union bound over all configurations containing $(s-1)f-1$ vertices and $f$ hyperedges, we obtain that the probability that there exist $f$ hyperedges in $\mathcal{H}_s(n,q(n))$ spanning less than $(s-1)f$ vertices is at most

\begin{equation*}\binom {n}{(s-1)f-1}\cdot O(1) \cdot q(n)^f=O\left (n^{(s-1)f-1}\cdot \left (\frac {\log ^2 n}{n^{s-1}}\right )^f\right )=O\left (\frac {\log ^{2f}n}{n}\right ).\end{equation*}

Thus, w.h.p. we have that $\mathcal{H}_s(n,q(n))$ also satisfies item (ii) of the lemma. This concludes the proof.

Proof. Let $T$ be a spanning tree of $G_2^H$ . For every edge $t \in E(T)$ , assign a hyperedge $e(t) \in E$ such that $t \subseteq e(t)$ . For each $e \in E$ , let $T_e\subseteq T$ be the forest induced by the edges $\{t \in E(T)|e(t)=e\}$ . Clearly, $V(T_e)\subseteq e$ for every $e \in E$ , and thus

\begin{equation*}|V|-1=|E(T)|=\sum _{e \in E}{|E(T_e)|}\le \sum _{e\in E}{\max \{0,|V(T_e)|-1\}}\le \sum _{e \in E}{(|e|-1)},\end{equation*}

as desired.

Proof. Suppose first that there exists at least one hyperedge $e_0 \in E$ with $|e_0|\ge 3$ . By assumption, $V \notin E$ , and thus there exists some vertex $v \in V\setminus e_0$ . Let us now consider the graph $G=G_2^{H-e_0}$ , the $2$ -shadow of the hypergraph $H-e_0$ obtained from $H$ by deleting $e_0$ . Let $C$ be the vertex-set of the unique connected component of $G$ that contains $v$ . We claim that $|C \cap e_0|\le 2$ . To that end, define $F$ as the set of hyperedges of $H-e_0$ that are contained in $C$ . Note that, since every hyperedge $e\in E\setminus \{e_0\}$ induces a clique in $G$ , we have that $\bigcup _{e\in F}{e}=C$ and that the hypergraph $H'=(C,F)$ is connected. These facts imply via Observation 2.4 that

\begin{equation*}\left |\bigcup _{e\in F}{e}\right |=|C|\le 1+\sum _{e \in F}{(|e|-1)}.\end{equation*}

On the other hand, by applying the assumption of the lemma to the edge-set $F \cup \{e_0\}$ , we find

\begin{equation*}\sum _{e \in F\cup \{e_0\}}{(|e|-1)}\le \left |e_0 \cup \bigcup _{e\in F}{e}\right |=|e_0 \cup C|=|e_0|+|C|-|e_0 \cap C|.\end{equation*}

Subtracting $(|e_0|-1)$ from both sides yields

\begin{equation*}\sum _{e\in F}{(|e|-1)}\le |C|+1-|e_0 \cap C|.\end{equation*}

Plugging the above into the first inequality we get $|C|\le |C|+2-|e_0 \cap C|,$ and thus $|e_0 \cap C|\le 2$ , as claimed. We now set $W\, :\!= e_0\cap C$ and claim that $G_2^H-W$ is disconnected. Indeed, it follows readily from the definition of $C$ that no edge in $G_2^H-W$ connects a vertex in $C\setminus W=C\setminus e_0$ to a vertex in $V\setminus C$ . Further, since $v \in C\setminus e_0$ we have that the first set is non-empty, and since $|V\setminus C|\ge |e_0\setminus C|=|e_0|-|e_0\cap C|\ge 3-2=1\gt 0$ , the second set is also non-empty. Thus, $G_2^H-W$ is indeed disconnected, which concludes the proof in this case.

For the second case, assume that $|e|\le 2$ for every $e \in E$ . W.l.o.g. (since they do not have an effect on $G_2^H$ ) we may assume that $H$ contains no hyperedges of size $1$ , i.e., $H$ is a graph and $G_2^H=H$ . If $H$ has a vertex of degree at most $1$ , then the statement of the lemma trivially holds, so suppose that $H$ has minimum degree at least $2$ . The condition of the lemma now yields $|E|=\sum _{e\in E}{(|e|-1)}\le |\bigcup _{e\in E}{e}|\le |V|$ . This directly implies via the handshake-lemma that $H$ is a $2$ -regular graph. It is trivial to see that every such graph on at least $4$ vertices contains a cut-set $W$ consisting of at most $2$ vertices, and this concludes the proof.

Proof of Lemma 2.3. The statement of the lemma holds trivially when $s\in \{1,2\}$ , so suppose $s\ge 3$ in the following. Let us consider the hypergraph $H_X$ obtained by restricting $H$ to $X$ , and note that the $2$ -shadow of $H_X$ equals $G[X]$ . Further note that for every subset $F \subseteq E(H)$ of size less than $2^{s+1}$ , it holds that

\begin{equation*}\left |\bigcup _{e \in F}{(e\cap X)}\right |\ge \left |\bigcup _{e \in F}{e}\right |-\sum _{e \in F}{|e\setminus X|}\end{equation*}

\begin{equation*}\ge (s-1)|F|-\sum _{e \in F}{|e\setminus X|}=\sum _{e \in F}{(s-1-|e\setminus X|)}=\sum _{e \in F}{(|e\cap X|-1)}.\end{equation*}

This directly implies that $\left |\bigcup _{e \in F}{e}\right |\ge \sum _{e \in F}{(|e|-1)}$ for every subset $F \subseteq E(H_X)$ . We can therefore apply Lemma 2.5, which implies that there exists a set $W\subseteq X$ of size at most $2$ such that $G[X]-W$ is disconnected. Thus, there exist disjoint non-empty sets $A, B$ such that $A\cup B=X\setminus W$ and no edge in $G[X]$ connects $A$ and $B$ . Note that as $|A|,|B|\ge 1$ and $|A|+|B|=|X|-|W|\ge (s+1)-2=s-1$ , we have $|A||B|\ge s-2$ . We conclude that

\begin{equation*}|E(G[X])|\le \binom {s+1}{2}-|A||B|\le \binom {s+1}{2}-(s-2)=\binom {s}{2}+2.\end{equation*}

This concludes the proof.

Proof of Theorem 1.1. Let an integer $r \ge 1$ be given. Define $s\, :\!= r+3$ and $m\, :\!= 2^{s+1}$ . By Lemma 2.3 there exists some $n_0 \in \mathbb{N}$ such that for every integer $n \ge n_0$ with $n \equiv 1 \text{ }(\text{mod }s)$ , there exists an $s$ -uniform hypergraph $H$ on $n$ vertices with the following properties.

• • For every $v \in V(H)$ , the hypergraph $H-v$ admits a perfect matching.

• • For every set $F\subseteq E(H)$ of hyperedges with $|F|\le m=2^{s+1}$ , we have

  \begin{equation*}\left |\bigcup _{e \in F}{e}\right |\ge (s-1)|F|.\end{equation*}

Define $k_0\, :\!= \lceil \frac{n_0-1}{s}\rceil +1$ and let $k \ge k_0$ be any given integer. Let $H$ be an $s$ -uniform hypergraph on $n\, :\!= s(k-1)+1\ge n_0$ vertices satisfying the properties above. Finally, we define a graph $G$ as the complement of the $2$ -shadow $G_2^H$ of $H$ . We claim that it satisfies the properties required by the theorem, that is,

• • $G-v$ is $(k-1)$ -colourable for every $v \in V(G)$ , and

• • for every set $R \subseteq E(G)$ of edges with $|R|\le r$ , we have $\chi (G-R)\ge k$ .

To verify the first statement, consider any vertex $v$ and a perfect matching of $H-v$ . Since $H$ is $s$ -uniform, the perfect matching forms a partition of $V(H)\setminus \{v\}=V(G)\setminus \{v\}$ into $\frac{n-1}{s}=k-1$ sets, each inducing a hyperedge in $H$ and thus an independent set in $G$ . Hence we have $\chi (G-v)\le k-1$ .

Now let $R \subseteq E(G)$ with $|R|\le r$ be given. We claim that $\alpha (G-R)\le s$ , i.e., that there exists no independent set in $G-R$ of size $s+1$ , which will then imply $\chi (G-R)\ge \frac{n}{\alpha (G-R)}\ge \frac{n}{s}\gt k-1$ , as desired. Suppose towards a contradiction that there is some $X\subseteq V(G)$ of size $s+1$ that is independent in $G-R$ . Then $G[X]$ contains at most $r$ edges, and thus its complement graph, namely $G_2^H[X]$ , contains at least $\binom{s+1}{2}-r=\binom{s}{2}+s-r=\binom{s}{2}+3$ edges. However, by Lemma 2.3 applied to $H$ , we find that $|E(G_2^H[X])|\le \binom{s}{2}+2$ , a contradiction. This shows that indeed, $\alpha (G-R)\le s$ for every $R \subseteq E(G)$ with $|R|\le r$ , concluding the proof.