English

Hypernetwork Science via High-Order Hypergraph Walks

Physics and Society 2020-06-09 v2 Social and Information Networks Data Analysis, Statistics and Probability

Abstract

We propose high-order hypergraph walks as a framework to generalize graph-based network science techniques to hypergraphs. Edge incidence in hypergraphs is quantitative, yielding hypergraph walks with both length and width. Graph methods which then generalize to hypergraphs include connected component analyses, graph distance-based metrics such as closeness centrality, and motif-based measures such as clustering coefficients. We apply high-order analogs of these methods to real world hypernetworks, and show they reveal nuanced and interpretable structure that cannot be detected by graph-based methods. Lastly, we apply three generative models to the data and find that basic hypergraph properties, such as density and degree distributions, do not necessarily control these new structural measurements. Our work demonstrates how analyses of hypergraph-structured data are richer when utilizing tools tailored to capture hypergraph-native phenomena, and suggests one possible avenue towards that end.

Keywords

Cite

@article{arxiv.1906.11295,
  title  = {Hypernetwork Science via High-Order Hypergraph Walks},
  author = {Sinan G. Aksoy and Cliff Joslyn and Carlos Ortiz Marrero and Brenda Praggastis and Emilie Purvine},
  journal= {arXiv preprint arXiv:1906.11295},
  year   = {2020}
}

Comments

Updated to address referee comments, to appear in EPJ Data Science

R2 v1 2026-06-23T10:04:40.295Z