Percolation of averages in the stochastic mean field model: the near-supercritical regime

Abstract

For a complete graph of size n, assign each edge an i.i.d.\ exponential variable with mean n. For λ>0, consider the length of the longest path whose average weight is at most λ. It was shown by Aldous (1998) that the length is of order n for λ < 1/e and of order n for λ > 1/e. In this paper, we study the near-supercritical regime where λ = e-1 +η with η>0 a small fixed number. We show that there exist two absolute constants c*, C*>0 such that with high probability the length is in between n e-C*/η and n e-c*/η. Our result corrects a non-rigorous prediction of Aldous (2005).