Hypernetwork science via high-order hypergraph walks

Aksoy, Sinan; Joslyn, Cliff; Marrero, Carlos Ortiz; Praggastis, Brenda; Purvine, Emilie

doi:10.1140/epjds/s13688-020-00231-0

Cited by 93 publications

(65 citation statements)

References 68 publications

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“…While many hypergraph topological measures are available, either as generalizations of graph measures to account for multi-way interactions or as native hypergraph-only measures, our focus in this paper is applying generalizations of graph centrality measures to hypergraphs built from transcriptomics data to identify important genes. In order to define these hypergraph centrality measures we must first introduce the notions of a hypergraph walk and distance [ 36 ]. Given two hyperedges , an s -walk between e and f is a sequence of hyperedges such that , , and for all .…”

Section: Methodsmentioning

confidence: 99%

“…Continuing to follow Aksoy et al [ 36 ], for a fixed , we define the s -distance between two edges as the shortest length of the possibly many s -walks between them. If there is no s -walk between two edges then the s -distance is infinite.…”

Section: Methodsmentioning

confidence: 99%

“…In order to take into account multiple s values simultaneously in our analysis we developed the average s -betweenness centrality and average harmonic s -closeness centrality , averaging the centrality values defined in [ 36 ] across a range of s values. Our average s -centralities are defined as Computing average s -centralities for each hyperedge provides a ranked list of hyperedges from most central (high value) to least central.…”

Section: Methodsmentioning

confidence: 99%

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Hypergraph models of biological networks to identify genes critical to pathogenic viral response

et al. 2021

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Background Representing biological networks as graphs is a powerful approach to reveal underlying patterns, signatures, and critical components from high-throughput biomolecular data. However, graphs do not natively capture the multi-way relationships present among genes and proteins in biological systems. Hypergraphs are generalizations of graphs that naturally model multi-way relationships and have shown promise in modeling systems such as protein complexes and metabolic reactions. In this paper we seek to understand how hypergraphs can more faithfully identify, and potentially predict, important genes based on complex relationships inferred from genomic expression data sets. Results We compiled a novel data set of transcriptional host response to pathogenic viral infections and formulated relationships between genes as a hypergraph where hyperedges represent significantly perturbed genes, and vertices represent individual biological samples with specific experimental conditions. We find that hypergraph betweenness centrality is a superior method for identification of genes important to viral response when compared with graph centrality. Conclusions Our results demonstrate the utility of using hypergraphs to represent complex biological systems and highlight central important responses in common to a variety of highly pathogenic viruses.

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Section: Methodsmentioning

confidence: 99%

Section: Methodsmentioning

confidence: 99%

Section: Methodsmentioning

confidence: 99%

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Hypergraph models of biological networks to identify genes critical to pathogenic viral response

et al. 2021

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“…Thus it provides a powerful tool to encode highdimensional datasets into various topological and geometric features in a coherent fashion. 2…”

Section: Persistent Spectral Graphsmentioning

confidence: 99%

“…However, traditional graphs only represent the pairwise relationships between entries. Therefore, hypergraphs, a generalization of graphs that describe the multi-way relationships of mathematical structures have been developed to capture the high-level complexity of data [2,6]. Mathematically, graphs and hypergraphs are intrinsically related to the simplicial complexes, which have broader use in computational topology.…”

Section: Introductionmentioning

confidence: 99%

Persistent spectral graph

Wang

Nguyen

Wei

2020

Numer Methods Biomed Eng

106

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Persistent homology is constrained to purely topological persistence, while multiscale graphs account only for geometric information. This work introduces persistent spectral theory to create a unified low‐dimensional multiscale paradigm for revealing topological persistence and extracting geometric shapes from high‐dimensional datasets. For a point‐cloud dataset, a filtration procedure is used to generate a sequence of chain complexes and associated families of simplicial complexes and chains, from which we construct persistent combinatorial Laplacian matrices. We show that a full set of topological persistence can be completely recovered from the harmonic persistent spectra, that is, the spectra that have zero eigenvalues, of the persistent combinatorial Laplacian matrices. However, non‐harmonic spectra of the Laplacian matrices induced by the filtration offer another powerful tool for data analysis, modeling, and prediction. In this work, fullerene stability is predicted by using both harmonic spectra and non‐harmonic persistent spectra, while the latter spectra are successfully devised to analyze the structure of fullerenes and model protein flexibility, which cannot be straightforwardly extracted from the current persistent homology. The proposed method is found to provide excellent predictions of the protein B‐factors for which current popular biophysical models break down.

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Centralities in Complex Networks

Bovet

Makse

2022

Encyclopedia of Complexity and Systems Science Series

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Hypernetwork science via high-order hypergraph walks

Cited by 93 publications

References 68 publications

Hypergraph models of biological networks to identify genes critical to pathogenic viral response

Hypergraph models of biological networks to identify genes critical to pathogenic viral response

Persistent spectral graph

Centralities in Complex Networks

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