Complete matchings in random subgraphs of the cube

In this article it is shown that for almost every random cube process the hitting time of a complete matching equals the hitting time of having minimal degree (at least) one and also the hitting time of connectedness. It follows from this that if t = (n + c + o(1))2^n?2 for some constant c, then the probability that a random subgraph of the n-cube having precisely t edges has a complete matching tends to e.