A paradigmatic nonhyperbolic dynamical system exhibiting deterministic diffusion is the smooth nonlinear climbing sine map. We find that this map generates fractal hierarchies of normal and anomalous diffusive regions as functions of the control parameter. The measure of these self-similar sets is positive, parameter dependent, and in case of normal diffusion it shows a fractal diffusion coefficient. By using a Green-Kubo formula we link these fractal structures to the nonlinear microscopic dynamics in terms of fractal Takagi-like functions
MasterAnomalous diffusion in random polymeric geometries, including fractal globules, is studied as ...
This paper pays attention to develop a variable-order fractal derivative model for anomalous diff...
The known properties of diffusion on fractals are reviewed in order to give a general outlook of the...
A paradigmatic nonhyperbolic dynamical system exhibiting deterministic diffusion is the smooth nonli...
The way in which macroscopic transport results from microscopic dynamics is one of the important que...
Deterministic diffusion is studied in simple, parameter-dependent dy- namical systems. The diffusion...
We have introduced to the problem of chaotic diffusion generated by deterministic dynamical systems....
Setting the scene ergodic hypothesis Gibbs ensembles dynamical systems statistical mechanics thermod...
none1noDynamical zeta functions provide a powerful method to analyse low-dimensional dynamical syste...
We show that the generalized diffusion coefficient of a subdiffusive intermittent map is a fractal f...
We present exact analytical results for properties of anomalous diffusion on a fractal mesh. The fra...
The impact of quenched disorder on deterministic diffusion in chaotic dynamical systems is studied. ...
AbstractThis paper makes an attempt to develop a fractal derivative model of anomalous diffusion. We...
PhDDeterministic diffusion is studied in simple, parameter-dependent dynamical systems. The diffusi...
Contents: Introduction 191 6. Quantitative characteristics of chaos 274 1. Self-organization and sta...
MasterAnomalous diffusion in random polymeric geometries, including fractal globules, is studied as ...
This paper pays attention to develop a variable-order fractal derivative model for anomalous diff...
The known properties of diffusion on fractals are reviewed in order to give a general outlook of the...
A paradigmatic nonhyperbolic dynamical system exhibiting deterministic diffusion is the smooth nonli...
The way in which macroscopic transport results from microscopic dynamics is one of the important que...
Deterministic diffusion is studied in simple, parameter-dependent dy- namical systems. The diffusion...
We have introduced to the problem of chaotic diffusion generated by deterministic dynamical systems....
Setting the scene ergodic hypothesis Gibbs ensembles dynamical systems statistical mechanics thermod...
none1noDynamical zeta functions provide a powerful method to analyse low-dimensional dynamical syste...
We show that the generalized diffusion coefficient of a subdiffusive intermittent map is a fractal f...
We present exact analytical results for properties of anomalous diffusion on a fractal mesh. The fra...
The impact of quenched disorder on deterministic diffusion in chaotic dynamical systems is studied. ...
AbstractThis paper makes an attempt to develop a fractal derivative model of anomalous diffusion. We...
PhDDeterministic diffusion is studied in simple, parameter-dependent dynamical systems. The diffusi...
Contents: Introduction 191 6. Quantitative characteristics of chaos 274 1. Self-organization and sta...
MasterAnomalous diffusion in random polymeric geometries, including fractal globules, is studied as ...
This paper pays attention to develop a variable-order fractal derivative model for anomalous diff...
The known properties of diffusion on fractals are reviewed in order to give a general outlook of the...