In a graph or complex network, communities and anti communities are node sets whose modularity attains extremely large values, positive and negative, respectively. We consider the simultaneous detection of communities and anti communities, by looking at spectral methods based on various matrix-based definitions of the modularity of a vertex set. Invariant subspaces associated to extreme eigenvalues of these matrices provide indications on the presence of both kinds of modular structure in the network. The localization of the relevant invariant subspaces can be estimated by looking at particular matrix angles based on Frobenius inner products. (C) 2017 Elsevier Inc. All rights reserved
Networks are a widely used tool for investigating the large-scale connectivity structure in complex ...
International audience—This article proposes a new spectral method for community detection in large ...
The community detection problem in networks consists of determining a clustering of related vertices...
In a graph or complex network, communities and anti-communities are node sets whose modularity attai...
Community detection in bipartite networks is a popular topic. Two widely used methods to capture com...
Many real networks exhibit community structure, whereby nodes tend to form clusters with a higher de...
We consider the problem of detecting communities or modules in networks, groups of vertices with a h...
We analyze the spectral properties of complex networks focusing on their relation to the community s...
Various modularity matrices appeared in the recent literature on network analysis and algebraic grap...
Relations between discrete quantities such as people, genes, or streets can be described by networks...
The study of the sub-structure of complex networks is of major importance to relate topology and fun...
Community detection is of great value for complex networks in understanding their inherent law and p...
summary:We propose a new localization result for the leading eigenvalue and eigenvector of a symmetr...
Revealing a community structure in a network or dataset is a central problem arising in many scienti...
We consider the problem of finding communities or modules in directed networks. In the past, the mos...
Networks are a widely used tool for investigating the large-scale connectivity structure in complex ...
International audience—This article proposes a new spectral method for community detection in large ...
The community detection problem in networks consists of determining a clustering of related vertices...
In a graph or complex network, communities and anti-communities are node sets whose modularity attai...
Community detection in bipartite networks is a popular topic. Two widely used methods to capture com...
Many real networks exhibit community structure, whereby nodes tend to form clusters with a higher de...
We consider the problem of detecting communities or modules in networks, groups of vertices with a h...
We analyze the spectral properties of complex networks focusing on their relation to the community s...
Various modularity matrices appeared in the recent literature on network analysis and algebraic grap...
Relations between discrete quantities such as people, genes, or streets can be described by networks...
The study of the sub-structure of complex networks is of major importance to relate topology and fun...
Community detection is of great value for complex networks in understanding their inherent law and p...
summary:We propose a new localization result for the leading eigenvalue and eigenvector of a symmetr...
Revealing a community structure in a network or dataset is a central problem arising in many scienti...
We consider the problem of finding communities or modules in directed networks. In the past, the mos...
Networks are a widely used tool for investigating the large-scale connectivity structure in complex ...
International audience—This article proposes a new spectral method for community detection in large ...
The community detection problem in networks consists of determining a clustering of related vertices...