On a Tail Bound for Root-Finding in Randomly Growing Trees
Abstract
We re-examine a lower-tail upper bound for the random variable where . This bound has found use in root-finding and seed-finding algorithms for randomly growing trees, and was initially proved as a lemma in the context of the uniform attachment tree model. We first show that has a useful representation as a compound product of uniform random variables that allows us to determine its moments and refine the existing nonasymptotic bound. Next we demonstrate that the lower-tail probability for can equivalently be written as a probability involving two independent Poisson random variables, an equivalence that yields a novel general result regarding indpendent Poissons and that also enables us to obtain tight asymptotic bounds on the tail probability of interest.
Cite
@article{arxiv.1905.07652,
title = {On a Tail Bound for Root-Finding in Randomly Growing Trees},
author = {Sam Justice and N. D. Shyamalkumar},
journal= {arXiv preprint arXiv:1905.07652},
year = {2019}
}