On exponentially height-penalized random trees

Abstract

Given n ∈ N and μ ∈ R, a μ-height-biased tree of size n is a random plane tree Tn with n vertices with law given by P(T=t) e-μ h(t), where t ranges over fixed plane trees with n vertices, and h(t) is the height of t. Fix a sequence (μn)n 1 of real numbers, and for n 1 let Tn be a μ-height-biased tree of size n. Durhuus and \"Unel (2023) described the asymptotic behaviour of h(Tn) when μn μ ∈ R is fixed. In this work, we extend their results to arbitrary sequences of positive parameters depending on n. Most notably, we show that such a tree behaves like a height-biased Continuum Random Tree (CRT) when μn is of order 1/n; that its height is asymptotically (2π2n/μn)1/3 when μn is of larger order than 1/n and of smaller order than n; and that its height converges to a fixed constant when μn is of order at least n, with some random jumps under specific conditions on μn. We additionally prove various results on second order behaviours, and large deviation principles for the height, for different regimes of μn. Finally, we describe new statistics of these trees, covering their widths, their root degrees, and the local structure around their roots.

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