English

Distance evolutions in growing preferential attachment graphs

Probability 2023-08-15 v2 Combinatorics

Abstract

We study the evolution of the graph distance and weighted distance between two fixed vertices in dynamically growing random graph models. More precisely, we consider preferential attachment models with power-law exponent τ(2,3)\tau\in(2,3), sample two vertices ut,vtu_t,v_t uniformly at random when the graph has tt vertices, and study the evolution of the graph distance between these two fixed vertices as the surrounding graph grows. This yields a discrete-time stochastic process in ttt'\geq t, called the distance evolution. We show that there is a tight strip around the function 4loglog(t)log(log(t/t)1)log(τ2)24\frac{\log\log(t)-\log(\log(t'/t)\vee1)}{|\log(\tau-2)|}\vee 2 that the distance evolution never leaves with high probability as tt tends to infinity. We extend our results to weighted distances, where every edge is equipped with an i.i.d. copy of a non-negative random variable LL.

Keywords

Cite

@article{arxiv.2003.08856,
  title  = {Distance evolutions in growing preferential attachment graphs},
  author = {Joost Jorritsma and Júlia Komjáthy},
  journal= {arXiv preprint arXiv:2003.08856},
  year   = {2023}
}

Comments

42 pages, 4 figures. Revised version with corrected typos and more elaborate proofs. Includes correction of an error in Theorem 2.5 that required a shift of indices in the summation

R2 v1 2026-06-23T14:20:21.515Z