Unwinding Scaling Violations in Phase Ordering
Abstract
The one-dimensional O(2) model is the simplest example of a system with topological textures. The model exhibits anomalous ordering dynamics due to the appearance of two characteristic length scales: the phase coherence length, L t1/z, and the phase winding length, Lw L. We derive the scaling law z=2+μ, where μ=0 (μ=2) for nonconserved (conserved) dynamics and =1/2 for uncorrelated initial orientations. From hard-spin equations of motion, we consider the evolution of the topological defect density and recover a simple scaling description. (please email ar@v2.ph.man.ac.uk for a hard copy by mail)
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