2.1. The set of discrete trees

We denote by $\mathbb{N} = \{0,1,2,\ldots\}$ the set of nonnegative integers and by $\mathbb{N}^{*} = \{1,2,\ldots\}$ the set of positive integers. We recall Neveu’s formalism [Reference Neveu7] for ordered rooted trees. Let $\mathcal{U} = \bigcup_{n\geq 0} (\mathbb{N}^{*})^{n}$ be the set of finite sequences of positive integers with the convention $(\mathbb{N}^{*})^{0} = \{\emptyset\}$ . For $u\in \mathcal{U}$ , its length or generation $|u| \in \mathbb{N}$ is defined by $u \in(\mathbb{N}^{*})^{|u|}$ . If u and v are two sequences of $\mathcal{U}$ , we denote by uv the concatenation of the two sequences, with the convention that $uv = u$ if $v = \emptyset$ and $uv = v$ if $u = \emptyset$ . The set of ancestors of u is $\textrm{An}(u) = \{v \in \mathcal{U};$ there exists $w \in \mathcal{U}$ such that $u = vw\}$ . The most recent common ancestor of a subset s of $\mathcal{U}$ , denoted by R(s), is the unique element u of $\cap_{u \in s} \textrm{An}(u)$ with maximal length $|u|$ . For two distinct elements u and v of $\mathcal{U}$ , we denote by $u<v$ the lexicographic order on $\mathcal{U}$ , i.e. $u<v$ if $u \in \textrm{An}(v)$ and $u \neq v$ , or if $u=wiu'$ and $v=wjv'$ for some $i,j \in \mathbb{N}^{*}$ with $i<j$ . We write $u \leq v$ if $u=v$ or $u<v$ .

A tree $\mathbf{t}$ is a subset of $\mathcal{U}$ that satisfies:

• • $\emptyset \in \mathbf{t}$ ;

• • if $u \in \mathbf{t}$ , then $\textrm{An}(u) \subset \mathbf{t}$ ;

• • for every $u \in \mathbf{t}$ , there exists $k_{u}(\mathbf{t}) \in \mathbb{N}$ such that, for every $i \in \mathbb{N}^*$ , $ui \in \mathbf{t}$ if and only if $1 \leq i \leq k_{u}(\mathbf{t})$ .

The vertex $\emptyset$ is called the root of $\mathbf{t}$ . The integer $k_{u}(\mathbf{t})$ represents the number of offspring of the vertex $u \in \mathbf{t}$ , and we call it the outdegree of the node u in the tree $\mathbf{t}$ . The maximal outdegree $M(\mathbf{t})$ of a tree $\mathbf{t}$ is defined by $M(\mathbf{t}) = \sup\{k_{u}(\mathbf{t}),\, u \in \mathbf{t} \}$ . The set of children of a vertex $u \in \mathbf{t}$ is given by $C_u(\mathbf{t}) = \{ui ;\, 1 \leq i \leq k_u(\mathbf{t})\}$ . By convention, we set $k_u(\mathbf{t}) = -1$ if $u \not \in \mathbf{t}$ .

A vertex $u \in \mathbf{t}$ is called a leaf if $k_{u}(\mathbf{t}) = 0$ . We denote by $\mathcal{L}_0(\mathbf{t})$ the set of leaves of $\mathbf{t}$ . A vertex $u \in \mathbf{t}$ is called a protected node if $C_u(\mathbf{t}) \neq \emptyset$ and $C_u(\mathbf{t}) \bigcap \mathcal{L}_{0}(\mathbf{t}) = \emptyset$ , i.e. u is not a leaf and none of its children are leaves.

For a tree $\mathbf{t}$ , we denote by $\mathcal{Z}_{n}(\mathbf{t}) = \textrm{Card}(\{u \in \mathbf{t}, \vert u \vert = n \})$ the size of the nth generation of $\mathbf{t}$ , and the height of $\mathbf{t}$ is defined by $H(\mathbf{t}) = \sup \{|u|,\, u \in \mathbf{t} \}$ and can be infinite. We define the width $L(\mathbf{t})$ of $\mathbf{t}$ as $L(\mathbf{t}) = \sup_{k \geq 0} \mathcal{Z}_{k}(\mathbf{t})$ .

We denote by $\mathbb{T}$ the set of trees, by $\mathbb{T}_{0} = \{\mathbf{t} \in \mathbb{T};\,\textrm{Card}(\mathbf{t}) < +\infty\}$ the subset of finite trees, and by $\mathbb{T}_{1} = \{\mathbf{t} \in \mathbb{T};\,\lim_{n \rightarrow + \infty}|M(\{u \in \mathbf{t};\, |u| = n\})| = + \infty\}$ the subset of trees with a unique infinite spine.

For $h \in \mathbb{N}$ , the restriction function $r_{h}$ from $\mathbb{T}$ to $\mathbb{T}$ is defined by $r_{h}(\mathbf{t}) = \{u \in \mathbf{t},\, \vert u \vert \leq h \}$ . We endow the set $\mathbb{T}$ with the ultrametric distance

\[d(\mathbf{t},\mathbf{t}') = 2^{- \sup \{h \in \mathbb{N}, r_{h}(\mathbf{t}) = r_{h}(\mathbf{t}')\}}. \]

A sequence $(\mathbf{t}_n,\, n \in \mathbb{N})$ of trees converges to a tree $\mathbf{t}$ with respect to the distance d if and only if, for every $h \in \mathbb{N}$ , $r_{h}(\mathbf{t}_{n}) = r_{h}(\mathbf{t})$ for n large enough.

Let $(T_{n},\, n \in \mathbb{N})$ and T be $\mathbb{T}$ -valued random variables. We denote by $\textrm{dist}(T)$ the distribution of the random variable T, and write $\lim_{n \rightarrow + \infty} \textrm{dist}(T_{n}) = \textrm{dist}(T)$ for the convergence in distribution of the sequence $(T_{n},\, n \in \mathbb{N})$ to T.

If $\mathbf{t},\mathbf{t}' \in \mathbb{T}$ and $x \in \mathcal{L}_{0}(\mathbf{t})$ we denote by $\mathbf{t} \circledast_x \mathbf{t}' = \{u \in \mathbf{t}\} \cup \{xv;\, v \in \mathbf{t}'\}$ the tree obtained by grafting the tree $\mathbf{t}'$ on the leaf x of the tree $\mathbf{t}$ . For every $\mathbf{t} \in \mathbb{T}$ and every $x \in \mathcal{L}_0(\mathbf{t})$ , we shall consider the set of trees obtained by grafting a tree on the leaf x of $\mathbf{t}$ : $\mathbb{T}(\mathbf{t},x) = \{\mathbf{t} \circledast_x \mathbf{t}';\, \mathbf{t}' \in \mathbb{T}\}$ .

For convergence in distribution in the set $\mathbb{T}_{0} \cup \mathbb{T}_{1}$ , we recall the following key characterization in [Reference Abraham and Delmas3].

2.2. Galton–Watson trees

Let $p = (p(n),\, n \in \mathbb{N})$ be a probability distribution on $\mathbb{N}$ . We assume that

(1) \begin{equation}p(0)>0, \qquad p(0)+p(1)<1, \qquad \mu \;:\!=\; \sum_{n=0}^{+\infty} n p(n) < +\infty.\end{equation}

A $\mathbb{T}$ -valued random variable $\tau$ is a GW tree with offspring distribution p if the distribution of $k_{\emptyset}(\tau)$ is p and it enjoys the branching property: for $n \in \mathbb{N}^{*}$ , conditionally on $\{k_{\emptyset}(\tau) = n \}$ , the subtrees $(S_{1}(\tau),\ldots,S_{n}(\tau))$ are independent and distributed as the original tree $\tau$ .

The GW tree and the offspring distribution are called critical (resp. subcritical, supercritical) if $\mu =1$ (resp. $\mu <1,\ \mu >1$ ). In the critical and subcritical cases, we have that, almost surely (a.s.), $\tau$ belongs to $\mathbb{T}_{0}$ .

2.3. Kesten’s tree

Let p be an offspring distribution satisfying (1) with $\mu \leq 1$ (i.e. the associated GW process is critical or subcritical). We denote by $ p^{*}=(p^{*}(n)=np(n)/\mu,\, n\in \mathbb{N})$ the corresponding size-biased distribution.

We define an infinite random tree $\tau ^{*}$ (the size-biased tree that we call Kesten’s tree in this paper) whose distribution is described in the following:

There exists a unique infinite sequence $(v_{k},\, k \in \mathbb{N}^{*})$ of positive integers such that, for every $h \in\mathbb{N}$ , $v_{1}\cdots v_{h} \in \tau^{*}$ , with the convention that $v_{1}\cdots v_{h}=\emptyset$ if $h=0$ . The joint distribution of $(v_{k},\, k \in \mathbb{N}^{*})$ and $\tau^{*}$ is determined recursively as follows. For each $h \in \mathbb{N}$ , conditionally given $(v_{1},\ldots,v_{h})$ and $\{u\in \tau^*;\, |u|\leq h\}$ the tree $\tau^*$ up to level h, we have:

• • The number of children $(k_{u}(\tau^{*}),\, u \in \tau^{*},\, |u|=h)$ are independent and distributed according to p if $u\neq v_{1}\cdots v_{h}$ and according to $p^{*}$ if $u = v_{1}\ldots v_{h}$ .

• • Given $\{u\in \tau^*;\, |u|\leq h+1\}$ and $(v_1, \ldots, v_h)$ , the integer $v_{h+1}$ is uniformly distributed on the set of integers $\{1,\ldots,k_{v_{1}\cdots v_{h}}(\tau^{*})\}$ .

Remark 1. Notice that, by construction, a.s. $\tau^{*} \in \mathbb{T}_{1}$ . And, following Kesten [Reference Kesten6], the random tree $\tau^{*}$ can be viewed as the tree $\tau$ conditioned on nonextinction. Following [Reference Abraham and Delmas3], for $\mathbf{t} \in \mathbb{T}_{0}$ and $x \in \mathcal{L}_0(\mathbf{t})$ ,

(2) \begin{equation} \mathbb{P}(\tau^{*} \in \mathbb{T}(\mathbf{t},x)) = \frac{\mathbb{P}(\tau = \mathbf{t})}{\mu^{\vert x \vert}p(0)} = \mu^{- \vert x \vert} \mathbb{P}(\tau \in \mathbb{T}(\mathbf{t},x)). \end{equation}

In the particular case of a critical offspring distribution ( $\mu = 1$ ) we get, for all $\mathbf{t} \in \mathbb{T}_{0}$ and $x \in \mathcal{L}_0(\mathbf{t})$ , $\mathbb{P}(\tau^{*} \in \mathbb{T}(\mathbf{t},x)) = \mathbb{P}(\tau \in \mathbb{T}(\mathbf{t},x))$ .