On Cellular Automata Models of Single Lane Traffic
Abstract
The jamming transition in the stochastic cellular automaton model (Nagel-Schreckenberg model) of highway traffic is analyzed in detail, by studying the relaxation time, a mapping to surface growth problems and the investigation of correlation functions. Three different classes of behavior can be distinguished depending on the speed limit vmax. For vmax = 1 the model is closely related to KPZ class of surface growth. For 1<vmax < ∞ the relaxation time has a well defined peak at a density of cars somewhat lower than position of the maximum in the fundamental diagram: This density can be identified with the jamming point. At the jamming point the properties of the correlations also change significantly. In the vmax=∞ limit the model undergoes a first order transition at 0. It seems that in the relevant cases 1<vmax < ∞ the jamming transition is under the influence of second order phase transition in the deterministic model and of the first order transition at vmax=∞ .
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