Pattern Formation Near Onset of a Convecting Fluid In an Annulus
Abstract
Numerical simulations of the time-dependent Swift-Hohenberg equation are used to test predictions of Cross [Phys. Rev. A 25:1065-1076 (1982)] that Rayleigh-Benard convection in the form of straight rolls or of an array of dislocations may be observed in an annular domain depending on the values of inner radius r1, outer radius r2, reduced Rayleigh number epsilon, and the initial state. As r1 is decreased for a fixed r2 and for different choices of epsilon and initial states, we find that there are indeed ranges of these parameters for which the predictions of Cross are qualitatively correct. However, when the radius difference r2-r1 becomes larger than a few roll diameters, a new pattern is observed consisting of stripe domains separated by radially-oriented grain boundaries. The relative stabilities of the various patterns are compared by evaluating their Lypunov functional densities.
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