English

On the shape of random P\'olya structures

Combinatorics 2019-11-25 v2

Abstract

Panagiotou and Stufler recently proved an important fact on their way to establish the scaling limits of random P\'olya trees: a uniform random P\'olya tree of size nn consists of a conditioned critical Galton-Watson tree CnC_n and many small forests, where with probability tending to one, as nn tends to infinity, any forest Fn(v)F_n(v), that is attached to a node vv in CnC_n, is maximally of size Fn(v)=O(logn)\vert F_n(v)\vert=O(\log n). Their proof used the framework of a Boltzmann sampler and deviation inequalities. In this paper, first, we employ a unified framework in analytic combinatorics to prove this fact with additional improvements for Fn(v)\vert F_n(v)\vert, namely Fn(v)=Θ(logn)\vert F_n(v)\vert=\Theta(\log n). Second, we give a combinatorial interpretation of the rational weights of these forests and the defining substitution process in terms of automorphisms associated to a given P\'olya tree. Third, we derive the limit probability that for a random node vv the attached forest Fn(v)F_n(v) is of a given size. Moreover, structural properties of those forests like the number of their components are studied. Finally, we extend all results to other P\'olya structures.

Keywords

Cite

@article{arxiv.1707.02144,
  title  = {On the shape of random P\'olya structures},
  author = {Bernhard Gittenberger and Emma Yu Jin and Michael Wallner},
  journal= {arXiv preprint arXiv:1707.02144},
  year   = {2019}
}

Comments

22 pp., 4 figures Some explanations clarified, typos corrected

R2 v1 2026-06-22T20:40:37.976Z