English

Random walks on dynamic configuration models: a trichotomy

Probability 2018-03-14 v1

Abstract

We consider a dynamic random graph on nn vertices that is obtained by starting from a random graph generated according to the configuration model with a prescribed degree sequence and at each unit of time randomly rewiring a fraction αn\alpha_n of the edges. We are interested in the mixing time of a random walk without backtracking on this dynamic random graph in the limit as nn\to\infty, when αn\alpha_n is chosen such that limnαn(logn)2=β[0,]\lim_{n\to\infty} \alpha_n (\log n)^2 = \beta \in [0,\infty]. In [1] we found that, under mild regularity conditions on the degree sequence, the mixing time is of order 1/αn1/\sqrt{\alpha_n} when β=\beta=\infty. In the present paper we investigate what happens when β[0,)\beta \in [0,\infty). It turns out that the mixing time is of order logn\log n, with the scaled mixing time exhibiting a one-sided cutoff when β(0,)\beta \in (0,\infty) and a two-sided cutoff when β=0\beta=0. The occurrence of a one-sided cutoff is a rare phenomenon. In our setting it comes from a competition between the time scales of mixing on the static graph, as identified by Ben-Hamou and Salez [4], and the regeneration time of first stepping across a rewired edge.

Keywords

Cite

@article{arxiv.1803.04824,
  title  = {Random walks on dynamic configuration models: a trichotomy},
  author = {Luca Avena and Hakan Guldas and Remco van der Hofstad and Frank den Hollander},
  journal= {arXiv preprint arXiv:1803.04824},
  year   = {2018}
}

Comments

14 pages, 5 figures

R2 v1 2026-06-23T00:51:36.134Z