Connectivity and giant component in random distance graphs
Combinatorics
2015-09-14 v1 Probability
Abstract
Various different random graph models have been proposed in which the vertices of the graph are seen as members of a metric space, and edges between vertices are determined as a function of the distance between the corresponding metric space elements. We here propose a model , in which is a metric space, , and , where is a decreasing function on the set of possible distances in . We consider the case that is the integer lattice in dimension , with the metric, and , and determine a threshold for the emergence of the giant component and connectivity in this model. We compare this model with a traditional Waxman graph. Further, we discuss expected degrees of nodes in detail for dimension 2.
Cite
@article{arxiv.1509.03568,
title = {Connectivity and giant component in random distance graphs},
author = {Joshua Flynn and Briana Oshiro and Mary Radcliffe},
journal= {arXiv preprint arXiv:1509.03568},
year = {2015}
}