English

The scaling window for a random graph with a given degree sequence

Combinatorics 2009-07-27 v1 Probability

Abstract

We consider a random graph on a given degree sequence D{\cal D}, satisfying certain conditions. We focus on two parameters Q=Q(D),R=R(D)Q=Q({\cal D}), R=R({\cal D}). Molloy and Reed proved that Q=0 is the threshold for the random graph to have a giant component. We prove that if Q=O(n1/3R2/3)|Q|=O(n^{-1/3} R^{2/3}) then, with high probability, the size of the largest component of the random graph will be of order Θ(n2/3R1/3)\Theta(n^{2/3}R^{-1/3}). If Q|Q| is asymptotically larger than n1/3R2/3n^{-1/3}R^{2/3} then the size of the largest component is asymptotically smaller or larger than n2/3R1/3n^{2/3}R^{-1/3}. Thus, we establish that the scaling window is Q=O(n1/3R2/3)|Q|=O(n^{-1/3} R^{2/3}).

Keywords

Cite

@article{arxiv.0907.4211,
  title  = {The scaling window for a random graph with a given degree sequence},
  author = {Hamed Hatami and Michael Molloy},
  journal= {arXiv preprint arXiv:0907.4211},
  year   = {2009}
}

Comments

20 Pages

R2 v1 2026-06-21T13:28:31.414Z