Fractal Dimensions of the Hydrodynamic Modes of Diffusion
arXiv:nlin/0007008 · doi:10.1088/0951-7715/14/2/309
Abstract
We consider the time-dependent statistical distributions of diffusive processes in relaxation to a stationary state for simple, two dimensional chaotic models based upon random walks on a line. We show that the cumulative functions of the hydrodynamic modes of diffusion form fractal curves in the complex plane, with a Hausdorff dimension larger than one. In the limit of vanishing wavenumber, we derive a simple expression of the diffusion coefficient in terms of this Hausdorff dimension and the positive Lyapunov exponent of the chaotic model.
20 pages, 6 figures, submitted to Nonlinearity