Many dynamical processes on real world networks display complex temporal patterns as, for instance, a fat-tailed distribution of inter-events times, leading to heterogeneous waiting times between events. In this work, we focus on distributions whose average inter-event time diverges, and study its impact on the dynamics of random walkers on networks. The process can naturally be described, in the long time limit, in terms of Riemann-Liouville fractional derivatives. We show that all the dynamical modes possess, in the asymptotic regime, the same power law relaxation, which implies that the dynamics does not exhibit time-scale separation between modes, and that no mode can be neglected versus another one, even for long times. Our results ar...
It is proved that kinetic equations containing noninteger integrals and derivatives are appeared in ...
In the present Short Note an idea is proposed to explain the emergence and the observation of proces...
Classical dynamics on graphs, like diffusion and random walks, can be defined using the graph Laplac...
Many dynamical processes on real world networks display complex temporal patterns as, for instance,...
Network science investigates the architecture of complex systems to understand their functional and ...
Real-world networks often exhibit complex temporal patterns that affect their dynamics and function....
Abstract. Spreading on networks is influenced by a number of factors including different parts of th...
Spreading on networks is influenced by a number of factors, including different parts of the inter-e...
The interest in non-Markovian dynamics within the complex systems community has recently blossomed, ...
We study individual agents with identical linear dynamics interconnected in a network, and in partic...
We study the effects of mobility on two crucial characteristics in multi-scale dynamic networks: per...
Kochubei AN, Kondratiev Y, da Silva JL. FROM RANDOM TIMES TO FRACTIONAL KINETICS. INTERDISCIPLINARY ...
We introduce a general non-Gaussian, self-similar, stochastic process called the fractional Lévy mot...
We propose a model of random diffusion to investigate flow fluctuations in complex networks. We deri...
Interactions among units in complex systems occur in a specific sequential order, thus affecting the...
It is proved that kinetic equations containing noninteger integrals and derivatives are appeared in ...
In the present Short Note an idea is proposed to explain the emergence and the observation of proces...
Classical dynamics on graphs, like diffusion and random walks, can be defined using the graph Laplac...
Many dynamical processes on real world networks display complex temporal patterns as, for instance,...
Network science investigates the architecture of complex systems to understand their functional and ...
Real-world networks often exhibit complex temporal patterns that affect their dynamics and function....
Abstract. Spreading on networks is influenced by a number of factors including different parts of th...
Spreading on networks is influenced by a number of factors, including different parts of the inter-e...
The interest in non-Markovian dynamics within the complex systems community has recently blossomed, ...
We study individual agents with identical linear dynamics interconnected in a network, and in partic...
We study the effects of mobility on two crucial characteristics in multi-scale dynamic networks: per...
Kochubei AN, Kondratiev Y, da Silva JL. FROM RANDOM TIMES TO FRACTIONAL KINETICS. INTERDISCIPLINARY ...
We introduce a general non-Gaussian, self-similar, stochastic process called the fractional Lévy mot...
We propose a model of random diffusion to investigate flow fluctuations in complex networks. We deri...
Interactions among units in complex systems occur in a specific sequential order, thus affecting the...
It is proved that kinetic equations containing noninteger integrals and derivatives are appeared in ...
In the present Short Note an idea is proposed to explain the emergence and the observation of proces...
Classical dynamics on graphs, like diffusion and random walks, can be defined using the graph Laplac...