High Degree Vertices, Eigenvalues and Diameter of Random Apollonian Networks

Abstract

In this work we analyze basic properties of Random Apollonian Networks zhang,zhou, a popular stochastic model which generates planar graphs with power law properties. Specifically, let k be a constant and 1 ≥ 2 ≥ .. ≥ k be the degrees of the k highest degree vertices. We prove that at time t, for any function f with f(t) → +∞ as t → +∞, t1/2f(t) ≤ 1 ≤ f(t)t1/2 and for i=2,...,k=O(1), t1/2f(t) ≤ i ≤ i-1 - t1/2f(t) with high probability (). Then, we show that the k largest eigenvalues of the adjacency matrix of this graph satisfy λk = (1 o(1))k1/2 . Furthermore, we prove a refined upper bound on the asymptotic growth of the diameter, i.e., that the diameter d(Gt) at time t satisfies d(Gt) ≤ t where 1=η is the unique solution greater than 1 of the equation η - 1 - η = 3. Finally, we investigate other properties of the model.