Coarsening Dynamics of a Nonconserved Field Advected by a Uniform Shear Flow
Abstract
We consider the ordering kinetics of a nonconserved scalar field advected by a uniform shear flow. Using the Ohta-Jasnow-Kawasaki approximation, modified to allow for shear-induced anisotropy, we calculate the asymptotic time dependence of the characteristic length scales, Lparallel and Lperp, that describe the growth of order parallel and perpendicular to the mean domain orientation. In space dimension d=3 we find, up to constants, Lparallel = gamma t3/2, Lperp = t1/2, where gamma is the shear rate, while for d = 2 we find Lparallel = gamma1/2 t (ln t)1/4, Lperp = gamma-1/2(ln t)-1/4 . Our predictions for d=2 can be tested by experiments on twisted nematic liquid crystals.
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