English

When is a scale-free graph ultra-small?

Probability 2017-09-20 v2 Combinatorics

Abstract

In this paper we study typical distances in the configuration model, when the degrees have asymptotically infinite variance. We assume that the empirical degree distribution follows a power law with exponent τ(2,3)\tau\in (2,3), up to value nβnn^{\beta_n} for some βn(logn)γ\beta_n\gg (\log n)^{-\gamma} and γ(0,1)\gamma\in(0,1). This assumption is satisfied for power law i.i.d. degrees, and also includes truncated power-law distributions where the (possibly exponential) truncation happens at nβnn^{\beta_n}. We show that the graph distance between two uniformly chosen vertices centers around 2loglog(nβn)/log(τ2)+1/(βn(3τ))2 \log \log (n^{\beta_n}) / |\log (\tau-2)| + 1/(\beta_n(3-\tau)), with tight fluctuations. Thus, the graph is an \emph{ultrasmall world} whenever 1/βn=o(loglogn)1/\beta_n=o(\log\log n). We determine the distribution of the fluctuations around this value, in particular we prove that these are non-converging tight random variables that show loglog\log \log-periodicity. We describe the topology and number of shortest paths: We show that the number of shortest paths is of order nfnβnn^{f_n\beta_n}, where fn(0,1)f_n \in (0,1) is a random variable that oscillates with nn. The two end-segments of any shortest path have length loglog(nβn)/log(τ2)\log \log (n^{\beta_n}) / |\log (\tau-2)|+tight, and the total degree is increasing towards the middle of the path on these segments. The connecting middle segment has length 1/(βn(3τ))1/(\beta_n(3-\tau))+tight, and it contains only vertices with degree at least of order n(1fn)βnn^{(1-f_n)\beta_n}, thus all the degrees on this segment are comparable to the maximal degree. Our theorems also apply when instead of truncating the degrees, we start with a configuration model and we remove every vertex with degree at least nβnn^{\beta_n}, and the edges attached to these vertices. This sheds light on the attack vulnerability of the configuration model with infinite variance degrees.

Keywords

Cite

@article{arxiv.1611.03639,
  title  = {When is a scale-free graph ultra-small?},
  author = {Remco van der Hofstad and Julia Komjathy},
  journal= {arXiv preprint arXiv:1611.03639},
  year   = {2017}
}

Comments

36 pages, 1 figure

R2 v1 2026-06-22T16:49:12.976Z