Connectivity of inhomogeneous random K-out graphs

Abstract

We propose inhomogeneous random K-out graphs H(n; μ, Kn), where each of the n nodes is assigned to one of r classes independently with a probability distribution μ = \μ1, …, μr\. In particular, each node is classified as class-i with probability μi>0, independently. Each class-i node selects Ki,n distinct nodes uniformly at random from among all other nodes. A pair of nodes are adjacent in H(n; μ, Kn) if at least one selects the other. Without loss of generality, we assume that K1,n ≤ K2,n ≤ … ≤ Kr,n. Earlier results on homogeneous random K-out graphs H(n; Kn), where all nodes select the same number K of other nodes, reveal that H(n; Kn) is connected with high probability (whp) if Kn ≥ 2 which implies that H(n; μ, Kn) is connected whp if K1,n ≥ 2. In this paper, we investigate the connectivity of inhomogeneous random K-out graphs H(n; μ, Kn) for the special case when K1,n=1, i.e., when each class-1 node selects only one other node. We show that H(n;μ,Kn) is connected whp if Kr,n is chosen such that n ∞ Kr,n = ∞. However, any bounded choice of the sequence Kr,n gives a positive probability of H(n;μ,Kn) being not connected. Simulation results are provided to validate our results in the finite node regime.