English

Voronoi cells in random split trees

Probability 2021-03-18 v1

Abstract

We study the sizes of the Voronoi cells of kk uniformly chosen vertices in a random split tree of size nn. We prove that, for nn large, the largest of these kk Voronoi cells contains most of the vertices, while the sizes of the remaining ones are essentially all of order nexp(constlogn)n\exp(-\mathrm{const}\sqrt{\log n}). This discrepancy persists if we modify the definition of the Voronoi cells by (a) introducing random edge lengths (with suitable moment assumptions), and (b) assigning different "influence" parameters (called "speeds" in the paper) to each of the kk vertices. Our findings are in contrast to corresponding results on random uniform trees and on the continuum random tree, where it is known that the vector of the relative sizes of the kk Voronoi cells is asymptotically uniformly distributed on the (k1)(k-1)-dimensional simplex.

Keywords

Cite

@article{arxiv.2103.09784,
  title  = {Voronoi cells in random split trees},
  author = {Alexander Drewitz and Markus Heydenreich and Cécile Mailler},
  journal= {arXiv preprint arXiv:2103.09784},
  year   = {2021}
}
R2 v1 2026-06-24T00:17:00.549Z