Contagion dynamics on hypergraphs with nested hyperedges
Abstract
In complex social systems encoded as hypergraphs, higher-order (i.e., group) interactions taking place among more than two individuals are represented by hyperedges. One of the higher-order correlation structures native to hypergraphs is the nestedness: Some hyperedges can be entirely contained (that is, nested) within another larger hyperedge, which itself can also be nested further in a hierarchical manner. Yet the effect of such hierarchical structure of hyperedges on the dynamics has remained unexplored. In this context, here we propose a random nested-hypergraph model with a tunable level of nestedness and investigate the effects of nestedness on a higher-order susceptible-infected-susceptible process. By developing an analytic framework called the facet approximation, we obtain the steady-state fraction of infected nodes on the random nested-hypergraph model more accurately than existing methods. Our results show that the hyperedge-nestedness affects the phase diagram significantly. Monte Carlo simulations support the analytical results.
Cite
@article{arxiv.2303.00224,
title = {Contagion dynamics on hypergraphs with nested hyperedges},
author = {Jihye Kim and Deok-Sun Lee and Kwang-Il Goh},
journal= {arXiv preprint arXiv:2303.00224},
year = {2023}
}
Comments
8 pages, 6 figures