English

Inversions in split trees and conditional Galton--Watson trees

Probability 2020-04-21 v2 Combinatorics

Abstract

We study I(T)I(T), the number of inversions in a tree TT with its vertices labeled uniformly at random, which is a generalization of inversions in permutations. We first show that the cumulants of I(T)I(T) have explicit formulas involving the kk-total common ancestors of TT (an extension of the total path length). Then we consider XnX_n, the normalized version of I(Tn)I(T_n), for a sequence of trees TnT_n. For fixed TnT_{n}'s, we prove a sufficient condition for XnX_n to converge in distribution. As an application, we identify the limit of XnX_n for complete bb-ary trees. For TnT_n being split trees, we show that XnX_n converges to the unique solution of a distributional equation. Finally, when TnT_n's are conditional Galton--Watson trees, we show that XnX_n converges to a random variable defined in terms of Brownian excursions. By exploiting the connection between inversions and the total path length, we are able to give results that are stronger and much broader compared to previous work by Panholzer and Seitz.

Keywords

Cite

@article{arxiv.1709.00216,
  title  = {Inversions in split trees and conditional Galton--Watson trees},
  author = {Xing Shi Cai and Cecilia Holmgren and Svante Janson and Tony Johansson and Fiona Skerman},
  journal= {arXiv preprint arXiv:1709.00216},
  year   = {2020}
}

Comments

28 pages, 1 figure

R2 v1 2026-06-22T21:30:07.318Z