The Q2-free process in the hypercube

Abstract

The generation of a random triangle-saturated graph via the triangle-free process has been studied extensively. In this short note our aim is to introduce an analogous process in the hypercube. Specifically, we consider the Q2-free process in Qd and the random subgraph of Qd it generates. Our main result is that with high probability the graph resulting from this process has at least cd2/3 2d edges. We also discuss a heuristic argument based on the differential equations method which suggests a stronger conjecture, and discuss the issues with making this rigorous. We conclude with some open questions related to this process.