High degrees of random recursive trees

TL;DR

This paper investigates the degree distribution of random recursive trees using Kingman's coalescent, revealing detailed asymptotic behaviors and convergence properties of degrees, extending prior maximal degree results.

Contribution

The authors introduce a coalescent-based approach to analyze the fine structure of degree distributions in random recursive trees, providing new asymptotics and distributional convergence results.

Findings

Weak convergence of degree counts to a Poisson process

Asymptotic normality of degree counts for low degrees

Precise asymptotics for the tail distribution of maximum degree

Abstract

For $n\ge 1$, let $T_n$ be a random recursive tree on the vertex set $[n]=\{1,\ldots,n\}$. Let $\mathrm{deg}_{T_n}(v)$ be the degree of vertex $v$ in $T_n$, that is, the number of children of $v$ in $T_n$. Devroye and Lu showed that the maximum degree $\Delta_n$ of $T_n$ satisfies $\Delta_n/\lfloor \log_2 n\rfloor \to 1$ almost surely; Goh and Schmutz showed distributional convergence of $\Delta_n - \lfloor \log_2 n \rfloor$ along suitable subsequences. In this work we show how a version of Kingman's coalescent can be used to access much finer properties of the degree distribution in $T_n$. For any $i\in \mathbb{Z}$, let $X_i^{(n)}=|\{v\in [n]: \mathrm{deg}_{T_n}(v)= \lfloor \log n\rfloor +i\}|$. Also, let $\mathcal{P}$ be a Poisson point process on $\mathbb{R}$ with rate function $\lambda(x)=2^{-x}\cdot \ln 2$. We show that, up to lattice effects, the vectors $(X_i^{(n)},\, i\in \mathbb{Z})$ converge weakly in distribution to $(\mathcal{P}[i,i+1),\, i\in \mathbb{Z})$. We also prove asymptotic normality of $X_i^{(n)}$ when $i=i(n) \to -\infty$ slowly, and obtain precise asymptotics for $\mathbb{P}(\Delta_n - \log_2 n > i)$ when $ i(n) \to \infty$ and $i(n)/\log n$ is not too large. Our results recover and extends the previous results on maximal and near-maximal degrees in random recursive trees.