Corrections to Scaling in Phase-Ordering Kinetics
Abstract
The leading correction to scaling associated with departures of the initial condition from the scaling morphology is determined for some soluble models of phase-ordering kinetics. The result for the pair correlation function has the form C(r,t) = f0(r/L) + L-ω f1(r/L) + ..., where L is a characteristic length scale extracted from the energy. The correction-to-scaling exponent ω has the value ω=4 for the d=1 Glauber model, the n-vector model with n=∞, and the approximate theory of Ohta, Jasnow and Kawasaki. For the approximate Mazenko theory, however, ω has a non-trivial value: omega = 3.8836... for d=2, and ω = 3.9030... for d=3. The correction-to-scaling functions f1(x) are also calculated.
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