Numerical assessment of the percolation threshold using complement networks
Abstract
Models of percolation processes on networks currently assume locally tree-like structures at low densities, and are derived exactly only in the thermodynamic limit. Finite size effects and the presence of short loops in real systems however cause a deviation between the empirical percolation threshold and its model-predicted value . Here we show the existence of an empirical linear relation between and across a large number of real and model networks. Such a putatively universal relation can then be used to correct the estimated value of . We further show how to obtain a more precise relation using the concept of the complement graph, by investigating on the connection between the percolation threshold of a network, , and that of its complement, .
Cite
@article{arxiv.1812.01316,
title = {Numerical assessment of the percolation threshold using complement networks},
author = {Giacomo Rapisardi and Guido Caldarelli and Giulio Cimini},
journal= {arXiv preprint arXiv:1812.01316},
year = {2018}
}