Betweenness Centrality in Dense Random Geometric Networks
Abstract
Random geometric networks consist of 1) a set of nodes embedded randomly in a bounded domain and 2) links formed probabilistically according to a function of mutual Euclidean separation. We quantify how often all paths in the network characterisable as topologically `shortest' contain a given node (betweenness centrality), deriving an expression in terms of a known integral whenever 1) the network boundary is the perimeter of a disk and 2) the network is extremely dense. Our method shows how similar formulas can be obtained for any convex geometry. Numerical corroboration is provided, as well as a discussion of our formula's potential use for cluster head election and boundary detection in densely deployed wireless ad hoc networks.
Cite
@article{arxiv.1410.8521,
title = {Betweenness Centrality in Dense Random Geometric Networks},
author = {Alexander P. Kartun-Giles and Orestis Georgiou and Carl P. Dettmann},
journal= {arXiv preprint arXiv:1410.8521},
year = {2016}
}
Comments
6 pages, 3 figures