English

Escape time in anomalous diffusive media

Statistical Mechanics 2009-11-07 v1

Abstract

We investigate the escape behavior of systems governed by the one-dimensional nonlinear diffusion equation tρ=x[xUρ]+Dx2ρν\partial_t \rho = \partial_x[\partial_x U\rho] + D\partial^2_x \rho^\nu, where the potential of the drift, U(x)U(x), presents a double-well and D,νD, \nu are real parameters. For systems close to the steady state we obtain an analytical expression of the mean first passage time, yielding a generalization of Arrhenius law. Analytical predictions are in very good agreement with numerical experiments performed through integration of the associated Ito-Langevin equation. For ν1\nu\neq 1 important anomalies are detected in comparison to the standard Brownian case. These results are compared to those obtained numerically for initial conditions far from the steady state.

Keywords

Cite

@article{arxiv.cond-mat/0102412,
  title  = {Escape time in anomalous diffusive media},
  author = {E. K. Lenzi and C. Anteneodo and L. Borland},
  journal= {arXiv preprint arXiv:cond-mat/0102412},
  year   = {2009}
}

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to appear in PRE