High Degree Vertices, Eigenvalues and Diameter of Random Apollonian Networks

TL;DR

This paper analyzes the degree distribution, eigenvalues, and diameter growth of Random Apollonian Networks, revealing their power law properties, spectral characteristics, and logarithmic diameter bounds.

Contribution

It provides new probabilistic bounds on the maximum degrees, eigenvalues, and diameter of Random Apollonian Networks, advancing understanding of their structural properties.

Findings

Maximum degree scales as t^{1/2} with high probability.

Top eigenvalues relate closely to maximum degrees.

Diameter grows logarithmically with network size.

Abstract

In this work we analyze basic properties of Random Apollonian Networks \cite{zhang,zhou}, a popular stochastic model which generates planar graphs with power law properties. Specifically, let $k$ be a constant and $\Delta_1 \geq \Delta_2 \geq .. \geq \Delta_k$ be the degrees of the $k$ highest degree vertices. We prove that at time $t$, for any function $f$ with $f(t) \rightarrow +\infty$ as $t \rightarrow +\infty$, $\frac{t^{1/2}}{f(t)} \leq \Delta_1 \leq f(t)t^{1/2}$ and for $i=2,...,k=O(1)$, $\frac{t^{1/2}}{f(t)} \leq \Delta_i \leq \Delta_{i-1} - \frac{t^{1/2}}{f(t)}$ with high probability (\whp). Then, we show that the $k$ largest eigenvalues of the adjacency matrix of this graph satisfy $\lambda_k = (1\pm o(1))\Delta_k^{1/2}$ \whp. Furthermore, we prove a refined upper bound on the asymptotic growth of the diameter, i.e., that \whp the diameter $d(G_t)$ at time $t$ satisfies $d(G_t) \leq \rho \log{t}$ where $\frac{1}{\rho}=\eta$ is the unique solution greater than 1 of the equation $\eta - 1 - \log{\eta} = \log{3}$. Finally, we investigate other properties of the model.