Growth Exponent in the Domany-Kinzel Cellular Automaton

Abstract

In a roughening process, the growth exponent β describes how the roughness w grows with the time t: w tβ. We determine the exponent β of a growth process generated by the spatiotemporal patterns of the one dimensional Domany-Kinzel cellular automaton. The values obtained for β shows a cusp at the frozen/active transition which permits determination of the transition line. The β value at the transition depends on the scheme used: symmetric (β 0.83) or non-symmetric (β 0.61). Using damage spreading ideas, we also determine the active/chaotic transition line; this line depends on how the replicas are updated.

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