On the pre- and post-positional semi-random graph processes

Abstract

We study the semi-random graph process, and a variant process recently suggested by Nick Wormald. We show that these two processes are asymptotically equally fast in constructing a semi-random graph G that has property P, for the following examples of P: - P is the set of graphs containing a d-degenerate subgraph, where d 1 is fixed; - P is the set of k-connected graphs, where k 1 is fixed. In particular, our result of the k-connectedness above settles the open case k=2 of the original semi-random graph process. We also prove that there exist properties P where the two semi-random graph processes do not construct a graph in P asymptotically equally fast. We further propose some conjectures on P for which the two processes perform differently.