Universal diameter bounds for random graphs with given degrees
Abstract
Given a graph , let be the greatest distance between any two vertices of which lie in the same connected component, and let be the greatest distance between any two vertices of ; so if is not connected. Fix a sequence of positive integers, and let be a uniformly random connected simple graph with such that for all . We show that, unless a proportion of vertices have degree , then . It is not hard to see that this bound is best possible for general degree sequences (and in particular in the case of trees, in which ). We also prove that this bound holds without the connectivity constraint. As a key input to the proofs, we show that graphs with minimum degree are with high probability connected and have logarithmic diameter: if and is a uniformly random simple graph with such that for all , then ; this bound is also best possible.
Keywords
Cite
@article{arxiv.2507.10759,
title = {Universal diameter bounds for random graphs with given degrees},
author = {Louigi Addario-Berry and Gabriel Crudele},
journal= {arXiv preprint arXiv:2507.10759},
year = {2025}
}
Comments
48 pages, 2 figures