The notions of subgraph centrality and communicability, based on the exponential of the adjacency matrix of the underlying graph, have been effectively used in the analysis of undirected networks. In this paper we propose an extension of these measures to directed networks, and we apply them to the problem of ranking hubs and authorities. The extension is achieved by bipartization, i.e., the directed network is mapped onto a bipartite undirected network with twice as many nodes in order to obtain a network with a symmetric adjacency matrix. We explicitly determine the exponential of this adjacency matrix in terms of the adjacency matrix of the original, directed network, and we give an interpretation of centrality and communicability in thi...
Bounds for entries of matrix functions based on Gauss-type quadrature rules are applied to adjacency...
Many scholars have tried to address the identification of critical nodes in complex networks from di...
We describe a complete theory for walk-based centrality indices in complex networks defined in terms...
The notions of subgraph centrality and communicability, based on the exponential of the adjacency ma...
We consider a broad class of walk-based, parameterized node centrality measures for network analysis...
The relative importance of nodes in a network can be quantified via functions of the adjacency matri...
The emerging field of network science deals with the tasks of modeling, comparing, and summarizing l...
Complex networks are characterized by heterogeneous distributions of the degree of nodes, which prod...
The relative importance of nodes in a network can be quantified via functions of the adjacency matri...
In complex network analysis it is essential to investigate the alteration of network structures that...
We propose and discuss a new centrality index for urban street patterns represented as networks in g...
Centrality is widely used to measure which nodes are important in a network. In recent decades, nume...
We define several novel centrality metrics: the high-order degree and combined degree of undirected ...
© 2016. This version is made available under the CC-BY-NC-ND 4.0 license http://creativecommons.org/...
Identifying the influential nodes in complex networks is a fundamental and practical topic at the mo...
Bounds for entries of matrix functions based on Gauss-type quadrature rules are applied to adjacency...
Many scholars have tried to address the identification of critical nodes in complex networks from di...
We describe a complete theory for walk-based centrality indices in complex networks defined in terms...
The notions of subgraph centrality and communicability, based on the exponential of the adjacency ma...
We consider a broad class of walk-based, parameterized node centrality measures for network analysis...
The relative importance of nodes in a network can be quantified via functions of the adjacency matri...
The emerging field of network science deals with the tasks of modeling, comparing, and summarizing l...
Complex networks are characterized by heterogeneous distributions of the degree of nodes, which prod...
The relative importance of nodes in a network can be quantified via functions of the adjacency matri...
In complex network analysis it is essential to investigate the alteration of network structures that...
We propose and discuss a new centrality index for urban street patterns represented as networks in g...
Centrality is widely used to measure which nodes are important in a network. In recent decades, nume...
We define several novel centrality metrics: the high-order degree and combined degree of undirected ...
© 2016. This version is made available under the CC-BY-NC-ND 4.0 license http://creativecommons.org/...
Identifying the influential nodes in complex networks is a fundamental and practical topic at the mo...
Bounds for entries of matrix functions based on Gauss-type quadrature rules are applied to adjacency...
Many scholars have tried to address the identification of critical nodes in complex networks from di...
We describe a complete theory for walk-based centrality indices in complex networks defined in terms...