The isoperimetric constant of the random graph process

The isoperimetric constant of a graph G on n vertices, i(G), is the minimum of $|\partial S| \over |S|$, taken over all nonempty subsets S ⊂ V (G) of size at most n/2, where ∂S denotes the set of edges with precisely one end in S. A random graph process on n vertices, $\tilde{G}(t)$, is a sequence of $n \choose 2$ graphs, where $\tilde{G}(0)$ is the edgeless graph on n vertices, and $\tilde{G}(t)$ is the result of adding an edge to $\tilde{G}(t-1)$, uniformly distributed over all the missing edges. The authors show that in almost every graph process $i(\tilde{G}(t))$ equals the minimal degree of $\tilde{G}(t)$ as long as the minimal degree is o(log n). Furthermore, it is shown that this result is essentially best possible, by demonstrating that along the period in which the minimum degree is typically Θ(log n), the ratio between the isoperimetric constant and the minimum degree falls from 1 to $1\over 2$, its final value. © 2007 Wiley Periodicals, Inc. Random Struct. Alg., 2008