A framework for second order eigenvector centralities and clustering coefficients
Francesca Arrigo,
Desmond J. Higham,
Francesco Tudisco,
Proceedings Royal Society A,
476 :
20190724
(2020)
Abstract
We propose and analyse a general tensor-based framework for incorporating second order features into network measures. This approach allows us to combine traditional pairwise links with information that records whether triples of nodes are involved in wedges or triangles. Our treatment covers classical spectral methods and recently proposed cases from the literature, but we also identify many interesting extensions. In particular, we define a mutually-reinforcing (spectral) version of the classical clustering coefficient. The underlying object of study is a constrained nonlinear eigenvalue problem associated with a cubic tensor. Using recent results from nonlinear Perron-Frobenius theory, we establish existence and uniqueness under appropriate conditions, and show that the new spectral measures can be computed efficiently with a nonlinear power method. To illustrate the added value of the new formulation, we analyse the measures on a class of synthetic networks. We also give computational results on centrality and link prediction for real-world networks.
Please cite this paper as:
@article{arrigo2019framework,
title={A framework for second order eigenvector centralities and clustering coefficients},
author={Arrigo, Francesca and Higham, Desmond J and Tudisco, Francesco},
journal={Proceedings Royal Society A},
volume = {476},
issue={2236},
pages={20190724},
year={2020}
}
Links:
arxiv
doi-open
code
Keywords:
networks
Perron-Frobenius theory
nonnegative tensors
power method
clustering coefficient
network centrality
power method
higher-order networks