A growing family of random graphs is called robust if it retains a giant component after percolation with arbitrary positive retention probability. We study robustness for graphs, in which new vertices are given a spatial position on the d-dimensional torus and are connected to existing vertices with a probability favouring short spatial distances and high degrees. In this model of a scale-free network with clustering we can independently tune the power law exponent τ of the degree distribution and the rate −δd at which the connection probability decreases with the distance of two vertices. We show that the network is robust if τ 3. In the case of one-dimensional space we also show that the network is not robust if τ > 2 + 1 δ−1. This impl...
In this paper, we present a simple model of scale-free networks that incorporates both preferential ...
Random graphs with power-law degrees can model scale-free networks as sparse topologies with strong ...
2007-2008 > Academic research: refereed > Publication in refereed journalVersion of RecordPublishe
A growing family of random graphs is called robust if it retains a giant component after percolation...
Scale-free networks with small power law exponent are known to be robust, meaning that their qualita...
Spatial random graphs capture several important properties of real-world networks. We prove quenched...
Complex network theory crucially depends on the assumptions made about the degree distribution, whil...
AbstractAlthough the scale invariance is a main feature of growing networks, evidence from a few mod...
We derive the finite-size dependence of the clustering coefficient of scale-free random graphs gener...
AbstractIn this paper, we investigate the connectivity of the scale-free networks and introduce degr...
In this paper we introduce a new model of spatial network growth in which nodes are placed at random...
Many real-world networks of interest are embedded in physical space. We present a new random graph m...
In this paper, we explore the relationship between the topological characteristics of a complex netw...
Two common features of many large real networks are that they are sparse and that they have strong c...
Scale-free networks have been studied mostly as non-spatially embedded systems. However, in many rea...
In this paper, we present a simple model of scale-free networks that incorporates both preferential ...
Random graphs with power-law degrees can model scale-free networks as sparse topologies with strong ...
2007-2008 > Academic research: refereed > Publication in refereed journalVersion of RecordPublishe
A growing family of random graphs is called robust if it retains a giant component after percolation...
Scale-free networks with small power law exponent are known to be robust, meaning that their qualita...
Spatial random graphs capture several important properties of real-world networks. We prove quenched...
Complex network theory crucially depends on the assumptions made about the degree distribution, whil...
AbstractAlthough the scale invariance is a main feature of growing networks, evidence from a few mod...
We derive the finite-size dependence of the clustering coefficient of scale-free random graphs gener...
AbstractIn this paper, we investigate the connectivity of the scale-free networks and introduce degr...
In this paper we introduce a new model of spatial network growth in which nodes are placed at random...
Many real-world networks of interest are embedded in physical space. We present a new random graph m...
In this paper, we explore the relationship between the topological characteristics of a complex netw...
Two common features of many large real networks are that they are sparse and that they have strong c...
Scale-free networks have been studied mostly as non-spatially embedded systems. However, in many rea...
In this paper, we present a simple model of scale-free networks that incorporates both preferential ...
Random graphs with power-law degrees can model scale-free networks as sparse topologies with strong ...
2007-2008 > Academic research: refereed > Publication in refereed journalVersion of RecordPublishe