Jaeger-type orientations of random regular graphs

Abstract

We consider p-orientations, which are defined to be orientations of d-regular graphs such that every vertex either has in-degree p or out-degree p. These generalise the orientations considered in Jaeger's conjecture, where d=4p+1. Working with random d-regular graphs using the small subgraph conditioning method, we prove that a d-regular graph has a p-orientation with high probability for several values of (d,p), including the p=3,4 cases of Jaeger's conjecture (known to be deterministically false). Some negative results are obtained by exploiting a connection with maximum bisection size.