Nonlinear Sciences – Chaotic Dynamics
Scientific paper
1997-10-27
Nonlinear Sciences
Chaotic Dynamics
4 pages, RevTeX, 2 Figures (encapsulated postscript). Submitted to Phys. Rev. Lett
Scientific paper
10.1103/PhysRevLett.80.2035
The largest Lyapunov exponent $\lambda^+$ for a dilute gas with short range interactions in equilibrium is studied by a mapping to a clock model, in which every particle carries a watch, with a discrete time that is advanced at collisions. This model has a propagating front solution with a speed that determines $\lambda^+$, for which we find a density dependence as predicted by Krylov, but with a larger prefactor. Simulations for the clock model and for hard sphere and hard disk systems confirm these results and are in excellent mutual agreement. They show a slow convergence of $\lambda^+$ with increasing particle number, in good agreement with a prediction by Brunet and Derrida.
Beijeren Henk van
Dellago Ch.
Zon Ramses van
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