It has been shown that both humanly constructed and natural networks are often characterized by small-world phenomenon and assortative mixing. In this paper, we propose a geometrically growing model for small-world networks. The model displays both tunable small-world phenomenon and tunable assortativity. We obtain analytical solutions of relevant topological properties such as order, size, degree distribution, degree correlation, clustering, transitivity, and diameter. It is also worth noting that the model can be viewed as a generalization for an iterative construction of Farey graphs
Many inherently spatial systems have been represented using networks. This thesis contributes to the...
Abstract We focus on spatially-extended networks during their transition from short-range connectivi...
In this Brief Report we present a version of a network growth model, generalized in order to describ...
permits unrestricted use, distribution, and reproduction in any medium, provided the original work i...
In this paper, we propose a simple rule that generates scale-free small-world networks with tunable ...
In this paper we introduce a model of spatial network growth in which nodes are placed at randomly s...
We propose a model of an underlying mechanism responsible for the formation of assortative mixing in...
Real-world networks process structured connections since they have non-trivial vertex degree correla...
Many real networks, including those in social, technological, and biological realms, are small-world...
© 2016 Elsevier B.V. All rights reserved.In this paper, we propose a model describing the growth and...
Farey graphs are simultaneously small-world, uniquely Hamiltonian, minimally 3-colorable, maximally ...
Real networks can be classified into two categories: fractal networks and non-fractal networks. Here...
Empirical findings have shown that many real-world networks share fascinating features. Indeed, many...
Growing networks have a causal structure. We show that the causality strongly influences the scaling...
International audienceWe introduce an analytic model for directed Watts-Strogatz small-world graphs ...
Many inherently spatial systems have been represented using networks. This thesis contributes to the...
Abstract We focus on spatially-extended networks during their transition from short-range connectivi...
In this Brief Report we present a version of a network growth model, generalized in order to describ...
permits unrestricted use, distribution, and reproduction in any medium, provided the original work i...
In this paper, we propose a simple rule that generates scale-free small-world networks with tunable ...
In this paper we introduce a model of spatial network growth in which nodes are placed at randomly s...
We propose a model of an underlying mechanism responsible for the formation of assortative mixing in...
Real-world networks process structured connections since they have non-trivial vertex degree correla...
Many real networks, including those in social, technological, and biological realms, are small-world...
© 2016 Elsevier B.V. All rights reserved.In this paper, we propose a model describing the growth and...
Farey graphs are simultaneously small-world, uniquely Hamiltonian, minimally 3-colorable, maximally ...
Real networks can be classified into two categories: fractal networks and non-fractal networks. Here...
Empirical findings have shown that many real-world networks share fascinating features. Indeed, many...
Growing networks have a causal structure. We show that the causality strongly influences the scaling...
International audienceWe introduce an analytic model for directed Watts-Strogatz small-world graphs ...
Many inherently spatial systems have been represented using networks. This thesis contributes to the...
Abstract We focus on spatially-extended networks during their transition from short-range connectivi...
In this Brief Report we present a version of a network growth model, generalized in order to describ...