English

The phase transition in the multi-type binomial random graph $G(\mathbf{n},P)$

Probability 2015-08-14 v3 Combinatorics

Abstract

We determine the asymptotic size of the largest component in the 22-type binomial random graph G(n,P)G(\mathbf{n},P) near criticality using a refined branching process approach. In G(n,P)G(\mathbf{n},P) every vertex has one of two types, the vector n\mathbf{n} describes the number of vertices of each type, and any edge {u,v}\{u,v\} is present independently with a probability that is given by an entry of the probability matrix PP according to the types of uu and v.v. We prove that in the weakly supercritical regime, i.e. if the distance to the critical point of the phase transition is given by an ε=ε(n)0,\varepsilon=\varepsilon(\mathbf{n})\to0, with probability 1o(1),1-o(1), the largest component in G(n,P)G(\mathbf{n},P) contains asymptotically 2εn12\varepsilon \|\mathbf{n}\|_1 vertices and all other components are of size o(εn1).o(\varepsilon \|\mathbf{n}\|_1).

Keywords

Cite

@article{arxiv.1407.6248,
  title  = {The phase transition in the multi-type binomial random graph $G(\mathbf{n},P)$},
  author = {Mihyun Kang and Christoph Koch and Angélica Pachón},
  journal= {arXiv preprint arXiv:1407.6248},
  year   = {2015}
}

Comments

27 pages

R2 v1 2026-06-22T05:11:05.012Z