Fractal (or transfractal) features are common in real-life networks and are known to in uence the dynamic processes taking place in the network itself. Here we consider a class of scale-free deterministic networks, called (u; v)-owers, whose topological properties can be controlled by tuning the parameters u and v; in particular, for u > 1, they are fractals endowed with a fractal dimension df , while for u = 1, they are transfractal endowed with a transfractal dimension ~ df . In this work we investigate dynamic processes (i.e., random walks) and topological properties (i.e., the Laplacian spectrum) and we show that, under proper conditions, the same scalings (ruled by the related dimensions), emerge for both fractal and transfra...
We settle a long-standing controversy about the exactness of the fractal Einstein and Alexander-Orba...
We derive a renormalization method to calculate the spectral dimension d̄ of deterministic self-simi...
Diffusion on a T fractal lattice under the influence of topological biasing fields is studied by fin...
Fractal dimension is central to understanding dynamical processes occurring on networks; h...
Real networks can be classified into two categories: fractal networks and non-fractal networks. Here...
It is known that the heterogeneity of scale-free networks helps enhancing the efficiency of trapping...
doi:10.1088/1367-2630/9/6/175 Abstract. We explore the concepts of self-similarity, dimensionality, ...
Diffusion on a T fractal lattice under the influence of topological biasing fields is studied by fin...
The probability that a random walker returns to its origin for large times scales as t(-d/2), where ...
We demonstrate analytically and numerically the possibility that the fractal property of a scale-fre...
doi:10.1088/1367-2630/9/6/177 Abstract. Fractal scaling and self-similar connectivity behaviour of s...
The global first passage time density of a network is the probability that a random walker released ...
We propose a general model of unweighted and undirected networks having the scale-free property and ...
Numerous network models have been investigated to gain insights into the origins of fractality. In t...
Methods connecting dynamical systems and graph theory have attracted increasing interest in the past...
We settle a long-standing controversy about the exactness of the fractal Einstein and Alexander-Orba...
We derive a renormalization method to calculate the spectral dimension d̄ of deterministic self-simi...
Diffusion on a T fractal lattice under the influence of topological biasing fields is studied by fin...
Fractal dimension is central to understanding dynamical processes occurring on networks; h...
Real networks can be classified into two categories: fractal networks and non-fractal networks. Here...
It is known that the heterogeneity of scale-free networks helps enhancing the efficiency of trapping...
doi:10.1088/1367-2630/9/6/175 Abstract. We explore the concepts of self-similarity, dimensionality, ...
Diffusion on a T fractal lattice under the influence of topological biasing fields is studied by fin...
The probability that a random walker returns to its origin for large times scales as t(-d/2), where ...
We demonstrate analytically and numerically the possibility that the fractal property of a scale-fre...
doi:10.1088/1367-2630/9/6/177 Abstract. Fractal scaling and self-similar connectivity behaviour of s...
The global first passage time density of a network is the probability that a random walker released ...
We propose a general model of unweighted and undirected networks having the scale-free property and ...
Numerous network models have been investigated to gain insights into the origins of fractality. In t...
Methods connecting dynamical systems and graph theory have attracted increasing interest in the past...
We settle a long-standing controversy about the exactness of the fractal Einstein and Alexander-Orba...
We derive a renormalization method to calculate the spectral dimension d̄ of deterministic self-simi...
Diffusion on a T fractal lattice under the influence of topological biasing fields is studied by fin...