Dresden 2006 – scientific programme

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DY: Dynamik und Statistische Physik

DY 24: Brownian Motion and Kinetic Theory I

DY 24.7: Talk

Tuesday, March 28, 2006, 16:00–16:15, H\"UL 186

Localization Transition of the 3D Lorentz Model and Continuum Percolation — •Thomas Franosch^1,2, Felix Höfling¹, and Erwin Frey² — ¹Hahn-Meitner-Institut, Abteilung Theorie, Glienicker St. 100, D-14109 Berlin — ²Arnold Sommerfeld Center and CeNS, Department of Physics, Ludwig-Maximilians-Universität München, Theresienstrasse 37, D-80333 München

The Lorentz model has served as a paradigm for transport in disordered media. It describes a structureless test particle moving in a random array of identical obstacles which interact with the test particle via a hard-sphere repulsion. At high densities, the model exhibits a localization transition, i. e., above a critical density, the test particle is always trapped by the obstacles.

It has been a longstanding open question whether the dynamics close to the critical density can be mapped to the transport properties of continuum percolation (“Swiss cheese model”). The fractal nature of the void space between the overlapping spheres in the Lorentz model suggested to use a description in terms of an equivalent random resistor network model.

We present extensive Molecular Dynamics simulations and provide the first unambiguous evidence for an intimate connection between the Lorentz model and continuum percolation [1]. In particular, we show the validity of a generalized dynamic scaling theory employing two divergent length scales, and discuss corrections to scaling. The non-Gaussian parameter is predicted to diverge close to the transition.

[1] F. Höfling, T. Franosch, and E. Frey, cond-mat/0510442.