Non-uniform random graphs on the plane: A scaling study
Abstract
We consider random geometric graphs on the plane characterized by a non-uniform density of vertices. In particular, we introduce a graph model where vertices are independently distributed in the unit disc with positions, in polar coordinates , obeying the probability density functions and . Here we choose as a normal distribution with zero mean and variance and as an uniform distribution in the interval . Then, two vertices are connected by an edge if their Euclidian distance is less or equal than the connection radius . We characterize the topological properties of this random graph model, which depends on the parameter set , by the use of the average degree and the number of non-isolated vertices ; while we approach their spectral properties with two measures on the graph adjacency matrix: the ratio of consecutive eigenvalue spacings and the Shannon entropy of eigenvectors. First we propose a heuristic expression for . Then, we look for the scaling properties of the normalized average measure (where stands for , and ) over graph ensembles. We demonstrate that the scaling parameter of is indeed ; with . Meanwhile, the scaling parameter of both and is proportional to with .
Cite
@article{arxiv.2109.03369,
title = {Non-uniform random graphs on the plane: A scaling study},
author = {C. T. Martinez-Martinez and J. A. Mendez-Bermudez and Francisco A. Rodrigues and Ernesto Estrada},
journal= {arXiv preprint arXiv:2109.03369},
year = {2022}
}
Comments
15 pages, 14 figures