Abstract
We present a study of dynamical scaling and domain growth in a nonpotential system that models Rayleigh–Bénard convection in a rotating cell. In d=1, dynamical scaling holds, but the nonpotential terms modify the characteristic growth law with a crossover from logarithmic to linear in time. In d=2 the nonpotential terms prevent coarsening for values of the angular rotation speed below the Küppers–Lortz instability.
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