We present exact analytical results for properties of anomalous diffusion on a fractal mesh. The fractal mesh structure is a direct product of two fractal sets, one belonging to a main branch of backbones, the other to the side branches of fingers. Both fractal sets are constructed on the entire (infinite) y and x axes. We suggest a special algorithm in order to construct such sets out of standard Cantor sets embedded in the unit interval. The transport properties of the fractal mesh are studied, in particular, subdiffusion along the backbones is obtained with the dispersion relation similar or equal to t(beta), where the transport exponent beta 1 has been observed as well when the environment is controlled by means of a memory kernel
We show that the generalized diffusion coefficient of a subdiffusive intermittent map is a fractal f...
We focus on the Brownian motion within channels with varying cross – section as well as on the diffu...
Using Monte Carlo simulations we have modeled the diffusion of a single particle in twoand three-dim...
We present exact analytical results for properties of anomalous diffusion on a fractal mesh. The fra...
AbstractThis paper makes an attempt to develop a fractal derivative model of anomalous diffusion. We...
The known properties of diffusion on fractals are reviewed in order to give a general outlook of the...
This paper pays attention to develop a variable-order fractal derivative model for anomalous diff...
MasterAnomalous diffusion in random polymeric geometries, including fractal globules, is studied as ...
Abstract: The recent interest in fractals in the geosciences literature has led to several proposed ...
The purpose of this research is to investigate properties of diffusion processes in porous media. Po...
Renormalization analysis discussed in Giona et al. (1996a, Chem. Engng Sci., 51, 4717 4729) is appli...
A paradigmatic nonhyperbolic dynamical system exhibiting deterministic diffusion is the smooth nonli...
Deterministic diffusion is studied in simple, parameter-dependent dy- namical systems. The diffusion...
We give exact analytical results for diffusion with a power-law position dependent diffusion coeffic...
Using a two dimensional simulation, a diffusion front is shown to have a fractal geometry in a range...
We show that the generalized diffusion coefficient of a subdiffusive intermittent map is a fractal f...
We focus on the Brownian motion within channels with varying cross – section as well as on the diffu...
Using Monte Carlo simulations we have modeled the diffusion of a single particle in twoand three-dim...
We present exact analytical results for properties of anomalous diffusion on a fractal mesh. The fra...
AbstractThis paper makes an attempt to develop a fractal derivative model of anomalous diffusion. We...
The known properties of diffusion on fractals are reviewed in order to give a general outlook of the...
This paper pays attention to develop a variable-order fractal derivative model for anomalous diff...
MasterAnomalous diffusion in random polymeric geometries, including fractal globules, is studied as ...
Abstract: The recent interest in fractals in the geosciences literature has led to several proposed ...
The purpose of this research is to investigate properties of diffusion processes in porous media. Po...
Renormalization analysis discussed in Giona et al. (1996a, Chem. Engng Sci., 51, 4717 4729) is appli...
A paradigmatic nonhyperbolic dynamical system exhibiting deterministic diffusion is the smooth nonli...
Deterministic diffusion is studied in simple, parameter-dependent dy- namical systems. The diffusion...
We give exact analytical results for diffusion with a power-law position dependent diffusion coeffic...
Using a two dimensional simulation, a diffusion front is shown to have a fractal geometry in a range...
We show that the generalized diffusion coefficient of a subdiffusive intermittent map is a fractal f...
We focus on the Brownian motion within channels with varying cross – section as well as on the diffu...
Using Monte Carlo simulations we have modeled the diffusion of a single particle in twoand three-dim...