English

Random Electrical Networks on Complete Graphs II: Proofs

Probability 2016-09-07 v1

Abstract

This paper contains the proofs of Theorems 2 and 3 of the article entitled Random Electrical Networks on Complete Graphs, written by the same authors and published in the Journal of the London Mathematical Society, vol. 30 (1984), pp. 171-192. The current paper was written in 1983 but was not published in a journal, although its existence was announced in the LMS paper. This TeX version was created on 9 July 2001. It incorporates minor improvements to formatting and punctuation, but no change has been made to the mathematics. We study the effective electrical resistance of the complete graph Kn+2K_{n+2} when each edge is allocated a random resistance. These resistances are assumed independent with distribution P(R=)=1n1γ(n)P(R=\infty)=1-n^{-1}\gamma(n), P(Rx)=n1γ(n)F(x)P(R\le x) = n^{-1}\gamma(n)F(x) for 0x<0\le x < \infty, where FF is a fixed distribution function and γ(n)γ0\gamma(n)\to\gamma\ge 0 as nn\to\infty. The asymptotic effective resistance between two chosen vertices is identified in the two cases γ1\gamma\le 1 and γ>1\gamma>1, and the case γ=\gamma=\infty is considered. The analysis proceeds via detailed estimates based on the theory of branching processes.

Keywords

Cite

@article{arxiv.math/0107068,
  title  = {Random Electrical Networks on Complete Graphs II: Proofs},
  author = {Geoffrey Grimmett and Harry Kesten},
  journal= {arXiv preprint arXiv:math/0107068},
  year   = {2016}
}

Comments

51 pages, 9 figures. This paper was first circulated in 1983 and has never been submitted to a journal