Add to ORKGThe diffusive motion of Brownian particles near irregular interfaces plays a crucial role in various transport phenomena in nature and industry. Most diffusion-reaction processes in confining inter- facial systems involve a sequence of Brownian flights in the bulk, connecting successive hits with the interface (Brownian bridges). The statistics of times and displacements separating two interface encounters are then determinant in the overall transport. We present a theoretical and numerical analysis of this complex first passage problem. We show that the bridge statistics is directly related to the Minkowski content of the surface within the usual diffusion length. In the case of self-similar or self-affine interfaces, we show and we check ...
Main text: 5 pages + 3 Figs, Supp. Mat.: 20 pages + 7 FigsInternational audienceWe present an exact ...
International audienceHeight fluctuations are studied in the one-dimensional totally asymmetric simp...
In the plane, we define a fractal known as the Vicsek snowflake in terms of a family of affine contr...
The diffusive motion of Brownian particles near irregular interfaces plays a crucial role in various...
Diffusive transport across a semi-permeable interface is ubiquitous in physics, biology, chem-istry ...
The article of record may be found at: http://dx.doi.org/10.1016/j.spl.2015.02.006We calculate sever...
24 pagesInternational audienceConsider a negatively drifted one dimensional Brownian motion starting...
I will try to define a non-trivial stochastic process on the Sierpinski gasket by looking at the lim...
The diffusion-limited reaction rate is determined on an approximately self-affine corrugated (random...
Diffusive transport across irregular interfaces is ubiquitous in physics, biology, chemistry and mat...
We focus on the Brownian motion within channels with varying cross – section as well as on the diffu...
First-passage properties in general, and the mean first-passage time (MFPT) in particular, are widel...
International audienceLet K be a compact subset of ${\mathbb R}^n$. We choose at random with uniform...
We developed a theoretical method based on limited scale power law form of the interfacial roughness...
Brownian motion, fractional Brownian motion (fBm) and Levy motion are stochastic processes with stat...
Main text: 5 pages + 3 Figs, Supp. Mat.: 20 pages + 7 FigsInternational audienceWe present an exact ...
International audienceHeight fluctuations are studied in the one-dimensional totally asymmetric simp...
In the plane, we define a fractal known as the Vicsek snowflake in terms of a family of affine contr...
The diffusive motion of Brownian particles near irregular interfaces plays a crucial role in various...
Diffusive transport across a semi-permeable interface is ubiquitous in physics, biology, chem-istry ...
The article of record may be found at: http://dx.doi.org/10.1016/j.spl.2015.02.006We calculate sever...
24 pagesInternational audienceConsider a negatively drifted one dimensional Brownian motion starting...
I will try to define a non-trivial stochastic process on the Sierpinski gasket by looking at the lim...
The diffusion-limited reaction rate is determined on an approximately self-affine corrugated (random...
Diffusive transport across irregular interfaces is ubiquitous in physics, biology, chemistry and mat...
We focus on the Brownian motion within channels with varying cross – section as well as on the diffu...
First-passage properties in general, and the mean first-passage time (MFPT) in particular, are widel...
International audienceLet K be a compact subset of ${\mathbb R}^n$. We choose at random with uniform...
We developed a theoretical method based on limited scale power law form of the interfacial roughness...
Brownian motion, fractional Brownian motion (fBm) and Levy motion are stochastic processes with stat...
Main text: 5 pages + 3 Figs, Supp. Mat.: 20 pages + 7 FigsInternational audienceWe present an exact ...
International audienceHeight fluctuations are studied in the one-dimensional totally asymmetric simp...
In the plane, we define a fractal known as the Vicsek snowflake in terms of a family of affine contr...