On random trees obtained from permutation graphs

TL;DR

This paper investigates the properties of random trees derived from permutation graphs, revealing their distributional characteristics and asymptotic behaviors for various graph parameters.

Contribution

It provides a detailed analysis of the distribution and asymptotic properties of random trees from permutation graphs, including degree, diameter, and domination number.

Findings

Number of trees among permutation graphs with n vertices is 2^{n-2} for n≥2.

Degree counts in the random trees are asymptotically normal.

Diameter shifted by -2 follows a binomial distribution.

Abstract

A permutation $\boldsymbol w$ gives rise to a graph $G_{\boldsymbol w}$; the vertices of $G_{\boldsymbol w}$ are the letters in the permutation and the edges of $G_{\boldsymbol w}$ are the inversions of $\boldsymbol w$. We find that the number of trees among permutation graphs with $n$ vertices is $2^{n-2}$ for $n\ge 2$. We then study $T_n$, a uniformly random tree from this set of trees. In particular, we study the number of vertices of a given degree in $T_n$, the maximum degree in $T_n$, the diameter of $T_n$, and the domination number of $T_n$. Denoting the number of degree-$k$ vertices in $T_n$ by $D_k$, we find that $(D_1,\dots,D_m)$ converges to a normal distribution for any fixed $m$ as $n\to \infty$. The vertex domination number of $T_n$ is also asymptotically normally distributed as $n\to \infty$. The diameter of $T_n$ shifted by $-2$ is binomially distributed with parameters $n-3$ and $1/2$. Finally, we find the asymptotic distribution of the maximum degree in $T_n$, which is concentrated around $\log_2n$.