# Centrality measures in simplicial complexes: applications of Topological   Data Analysis to Network Science

**Authors:** Daniel Hern\'andez Serrano, Dar\'io S\'anchez G\'omez

arXiv: 1908.02967 · 2020-04-16

## TL;DR

This paper introduces new centrality measures, connectivity notions, and clustering coefficients for simplicial complexes, enabling better analysis of higher-order interactions in complex networks across various scientific fields.

## Contribution

It proposes novel degree-based centrality measures, connectivity concepts, and a new clustering coefficient specifically designed for simplicial complexes, extending classical network analysis tools.

## Key findings

- New degree centrality measures for simplices
- Generalized closeness and betweenness centralities for simplicial networks
- A novel clustering coefficient for simplices

## Abstract

Many real networks in social sciences, biological and biomedical sciences or computer science have an inherent structure of simplicial complexes reflecting many-body interactions. Therefore, to analyse topological and dynamical properties of simplicial complex networks centrality measures for simplices need to be proposed. Many of the classical complex networks centralities are based on the degree of a node, so in order to define degree centrality measures for simplices (which would characterise the relevance of a simplicial community in a simplicial network), a different definition of adjacency between simplices is required. The aim of these notes is threefold: first we will use the recently introduced notions of higher order simplicial degrees to propose new degree based centrality measures in simplicial complexes. These theoretical centrality measures, such as the simplicial degree centrality or the eigenvector centrality would allow not only to study the relevance of a simplicial community and the quality of its higher-order connections in a simplicial network, but also they might help to elucidate topological and dynamical properties of simplicial networks; sencond, we define notions of walks and distances in simplicial complexes in order to study connectivity of simplicial networks and to generalise, to the simplicial case, the well known closeness and betweenness centralities (needed for instance to study the relevance of a simplicial community in terms of its ability of transmitting information); third, we propose a new clustering coefficient for simplices in a simplicial network, different from the one knows so far and which generalises the standard graph clustering of a vertex. This measure should be essential to know the density of a simplicial network in terms of its simplicial communities.

## Full text

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## Figures

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## References

41 references — full list in the complete paper: https://tomesphere.com/paper/1908.02967/full.md

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Source: https://tomesphere.com/paper/1908.02967