Complex networks can often exhibit a high degree of bipartivity. There are many well-known ways for testing this, and in this article, we give a systematic analysis of characterizations based on the spectra of the adjacency matrix and various graph Laplacians. We show that measures based on these characterizations can be drastically different results and leads us to distinguish between local and global loss of bipartivity. We test several methods for finding approximate bipartitions based on analysing eigenvectors and show that several alternatives seem to work well (and can work better than more complex methods) when augmented with local improvement
Network robustness plays a critical role in the proper functioning of modern society. It is common p...
In recent years, many network perturbation techniques, such as topological perturbations and service...
Community detection in bipartite networks is a popular topic. Two widely used methods to capture com...
Complex networks can often exhibit a high degree of bipartivity. There are many well-known ways for ...
We report our experiments on identifying large bipartite subgraphs of simple connected graphs which ...
Relations between discrete quantities such as people, genes, or streets can be described by networks...
AbstractWe have revisited the Szeged index (Sz) and the revised Szeged index (Sz∗), both of which re...
Determining the effect of structural perturbations on the eigenvalue spectra of networks is an impor...
We formulate a spectral graph-partitioning algorithm that uses the two leading eigenvectors of the m...
We consider the problem of testing bipartiteness in the adjacency matrix model. The best known algor...
Network representations are useful for describing the structure of a large variety of complex system...
To study dynamical systems, graphs are often used to capture the interactions among their components...
Using spectral graph theory and especially its graph comparison techniques, we propose new methodolo...
Spectral embedding finds vector representations of the nodes of a network, based on the eigenvectors...
Abstract. In the first part of this paper, we survey results that are associated with three types of...
Network robustness plays a critical role in the proper functioning of modern society. It is common p...
In recent years, many network perturbation techniques, such as topological perturbations and service...
Community detection in bipartite networks is a popular topic. Two widely used methods to capture com...
Complex networks can often exhibit a high degree of bipartivity. There are many well-known ways for ...
We report our experiments on identifying large bipartite subgraphs of simple connected graphs which ...
Relations between discrete quantities such as people, genes, or streets can be described by networks...
AbstractWe have revisited the Szeged index (Sz) and the revised Szeged index (Sz∗), both of which re...
Determining the effect of structural perturbations on the eigenvalue spectra of networks is an impor...
We formulate a spectral graph-partitioning algorithm that uses the two leading eigenvectors of the m...
We consider the problem of testing bipartiteness in the adjacency matrix model. The best known algor...
Network representations are useful for describing the structure of a large variety of complex system...
To study dynamical systems, graphs are often used to capture the interactions among their components...
Using spectral graph theory and especially its graph comparison techniques, we propose new methodolo...
Spectral embedding finds vector representations of the nodes of a network, based on the eigenvectors...
Abstract. In the first part of this paper, we survey results that are associated with three types of...
Network robustness plays a critical role in the proper functioning of modern society. It is common p...
In recent years, many network perturbation techniques, such as topological perturbations and service...
Community detection in bipartite networks is a popular topic. Two widely used methods to capture com...