Damage Spreading During Domain Growth
Abstract
We study damage spreading in models of two-dimensional systems undergoing first order phase transitions. We consider several models from the same non-conserved order parameter universality class, and find unexpected differences between them. An exact solution of the Ohta-Jasnow-Kawasaki model yields the damage growth law D tφ, where φ = td/4 in d dimensions. In contrast, time-dependent Ginzburg-Landau simulations and Ising simulations in d= 2 using heat-bath dynamics show power-law growth, but with an exponent of approximately 0.36, independent of the system sizes studied. In marked contrast, Metropolis dynamics shows damage growing via φ 1, although the damage difference grows as t0.4. PACS: 64.60.-i, 05.50.+q
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