Exact results for curvature-driven coarsening in two dimensions
Abstract
We consider the statistics of the areas enclosed by domain boundaries (`hulls') during the curvature-driven coarsening dynamics of a two-dimensional nonconserved scalar field from a disordered initial state. We show that the number of hulls per unit area that enclose an area greater than A has, for large time t, the scaling form Nh(A,t) = 2c/(A+λ t), demonstrating the validity of dynamical scaling in this system, where c=1/8π3 is a universal constant. Domain areas (regions of aligned spins) have a similar distribution up to very large values of A/λ t. Identical forms are obtained for coarsening from a critical initial state, but with c replaced by c/2.
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