English

Triadic closure in configuration models with unbounded degree fluctuations

Probability 2018-03-15 v1

Abstract

The configuration model generates random graphs with any given degree distribution, and thus serves as a null model for scale-free networks with power-law degrees and unbounded degree fluctuations. For this setting, we study the local clustering c(k)c(k), i.e., the probability that two neighbors of a degree-kk node are neighbors themselves. We show that c(k) c(k) progressively falls off with kk and eventually for k=Ω(n)k=\Omega(\sqrt{n}) settles on a power law c(k)k2(3τ)c(k)\sim k^{-2(3-\tau)} with τ(2,3)\tau\in(2,3) the power-law exponent of the degree distribution. This fall-off has been observed in the majority of real-world networks and signals the presence of modular or hierarchical structure. Our results agree with recent results for the hidden-variable model and also give the expected number of triangles in the configuration model when counting triangles only once despite the presence of multi-edges. We show that only triangles consisting of triplets with uniquely specified degrees contribute to the triangle counting.

Keywords

Cite

@article{arxiv.1710.02027,
  title  = {Triadic closure in configuration models with unbounded degree fluctuations},
  author = {Remco van der Hofstad and Johan S. H. van Leeuwaarden and Clara Stegehuis},
  journal= {arXiv preprint arXiv:1710.02027},
  year   = {2018}
}
R2 v1 2026-06-22T22:04:41.888Z