Behavior of the Minimum Degree Throughout the d-process

Abstract

The d-process generates a graph at random by starting with an empty graph with n vertices, then adding edges one at a time uniformly at random among all pairs of vertices which have degrees at most d-1 and are not mutually joined. We show that, in the evolution of a random graph with n vertices under the d-process with d fixed, with high probability, for each j ∈ \0,1,…,d-2\, the minimum degree jumps from j to j+1 when the number of steps left is on the order of (n)d-j-1. This answers a question of Ruci\'nski and Wormald. More specifically, we show that, when the last vertex of degree j disappears, the number of steps left divided by (n)d-j-1 converges in distribution to the exponential random variable of mean j!2(d-1)!; furthermore, these d-1 distributions are independent.