Stages of Relaxation of Patterns and the Role of Stochasticity on the Final Stage

Abstract

The disorder function formalism [Gunaratne et.al., Phys. Rev. E, 57, 5146 (1998)]M is used to show that pattern relaxation in an experiment on a vibrated layer of brass beadsM occurs in three distinct stages. During stage I, all lengthscales associated with M moments of the disorder grow at a single universal rate, given by L(t) t0.5. In stage II, pattern evolution is non-universal and includes a range of growth indices. Relaxation in the final stage is characterized by a single, non-universal index. We use analysis of patterns from the Swift-Hohenberg equation to argue that mechanisms that underlie the observed pattern evolution are linear spatio-temporal dynamics (stage I), non-linear saturation (stage II), and stochasticity (stage III)

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