Refined Horton-Strahler numbers I: a discrete bijection

TL;DR

This paper introduces a new bijective proof linking the refined Horton-Strahler number of rooted trees to Dyck path heights, providing a deeper combinatorial understanding and a potential continuum analogue.

Contribution

It presents a novel bijective proof that refines the Horton-Strahler number concept by introducing a sequence of interpolating trees and establishing a direct correspondence with Dyck path heights.

Findings

Establishes a bijection between trees with a given refined Horton-Strahler number and Dyck paths of corresponding height.

Defines the refined Horton-Strahler number as the largest interpolating tree index embedded in a given tree.

Provides a recursive decomposition approach for the bijection, with implications for continuum analogues.

Abstract

The Horton-Strahler number of a rooted tree $T$ is the height of the tallest complete binary tree that can be homeomorphically embedded in $T$. The number of full binary trees with $n$ internal vertices and Horton-Strahler number $s$ is known to be the same as the number of Dyck paths of length $2n$ whose height $h$ satisfies $\lfloor \log_2(1+h)\rfloor=s$. In this paper, we present a new bijective proof of the above result, that in fact strengthens and refines it as follows. We introduce a sequence of trees $(\tau_i,i \ge 0)$ which "interpolates" the complete binary trees, in the sense that $\tau_{2^h-1}$ is the complete binary tree of height $h$ for all $h \ge 0$, and $\tau_{i+1}$ strictly contains $\tau_i$ for all $i \ge 0$. Defining $\mathcal{S}(T)$ to be the largest $i$ for which $\tau_i$ can be homeomorphically embedded in $T$, we then show that the number of full binary trees $T$ with $n$ internal vertices and with $\mathcal{S}(T)=h$ is the same as the number of Dyck paths of length $2n$ with height $h$. (We call $\mathcal{S}(T)$ the refined Horton-Strahler number of $T$.) Our proof is bijective and relies on a recursive decomposition of binary trees (resp. Dyck paths) into subtrees with strictly smaller refined Horton-Strahler number (resp. subpaths with strictly smaller height). In a subsequent paper, we will show that the bijection has a continuum analogue, which transforms a Brownian continuum random tree into a Brownian excursion and under which (a continuous analogue of) the refined Horton-Strahler number of the tree becomes the height of the excursion.