Connectivity of the k-out Hypercube

Abstract

In this paper we study the connectivity properties of the random subgraph of the n-cube generated by the k-out model and denoted by Qn(k). Let k be an integer, 1≤ k ≤ n-1. We let Qn(k) be the graph that is generated by independently including for every v∈ V(Qn) a set of k distinct edges chosen uniformly from all the nk sets of distinct edges that are incident to v. We study connectivity the properties of Qn(k) as k varies. We show that w.h.p. Qn(1) does not contain a giant component i.e. a component that spans (2n) vertices. Thereafter we show that such a component emerges when k=2. In addition the giant component spans all but o(2n) vertices and hence it is unique. We then establish the connectivity threshold found at k0= 2 n -222 n . The threshold is sharp in the sense that Qn( k0 ) is disconnected but Qn( k0+1) is connected w.h.p. Furthermore we show that w.h.p. Qn(k) is k-connected for every k≥ k0+1.