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Literature DB >> 29034062

Brownian motion in confined geometries.

S M Bezrukov¹, L Schimansky-Geier², G Schmid³.

Abstract

In a great number of technologically and biologically relevant cases, transport of micro- or nanosized objects is governed by both omnipresent thermal fluctuations and confining walls or constrictions limiting the available phase space. The present Topical Issue covers the most recent applications and theoretical findings devoted to studies of Brownian motion under confinement of channel-like geometries.

Entities: Chemical Disease Gene Species

Year: 2014 PMID： 29034062 PMCID： PMC5635657 DOI： 10.1140/epjst/e2014-02316-6

Source DB: PubMed Journal: Eur Phys J Spec Top ISSN： 1951-6355 Impact factor: 2.707

19 in total

1. Kinetic equations for diffusion in the presence of entropic barriers.

Authors: D Reguera; J M Rubí
Journal: Phys Rev E Stat Nonlin Soft Matter Phys Date: 2001-11-21

2. Driven Brownian transport through arrays of symmetric obstacles.

Authors: P K Ghosh; P Hänggi; F Marchesoni; S Martens; F Nori; L Schimansky-Geier; G Schmid
Journal: Phys Rev E Stat Nonlin Soft Matter Phys Date: 2012-01-03

3. Diffusion in the presence of cylindrical obstacles arranged in a square lattice analyzed with generalized Fick-Jacobs equation.

Authors: Leonardo Dagdug; Marco-Vinicio Vazquez; Alexander M Berezhkovskii; Vladimir Yu Zitserman; Sergey M Bezrukov
Journal: J Chem Phys Date: 2012-05-28 Impact factor: 3.488

4. Diffusion in a two-dimensional channel with curved midline and varying width: reduction to an effective one-dimensional description.

Authors: R Mark Bradley
Journal: Phys Rev E Stat Nonlin Soft Matter Phys Date: 2009-12-31

5. Corrections to the Fick-Jacobs equation.

Authors: P Kalinay; J K Percus
Journal: Phys Rev E Stat Nonlin Soft Matter Phys Date: 2006-10-05

6. Diffusion in a tube of varying cross section: numerical study of reduction to effective one-dimensional description.

Authors: A M Berezhkovskii; M A Pustovoit; S M Bezrukov
Journal: J Chem Phys Date: 2007-04-07 Impact factor: 3.488

Review 7. Diffusion in confined geometries.

Authors: P Sekhar Burada; Peter Hänggi; Fabio Marchesoni; Gerhard Schmid; Peter Talkner
Journal: Chemphyschem Date: 2009-01-12 Impact factor: 3.102

1. Mapping Intrachannel Diffusive Dynamics of Interacting Molecules onto a Two-Site Model: Crossover in Flux Concentration Dependence.

Authors: Alexander M Berezhkovskii; Sergey M Bezrukov
Journal: J Phys Chem B Date: 2018-06-29 Impact factor: 2.991

1 in total