Emilio N. M. Cirillo, Giuseppe Gonnella, Sebastiano Stramaglia
Published 1998-09-23Version 1
We measure the persistence exponent in a phase separating two-dimensional spin system with non-conserved dynamics quenched in a region with four coexisting stripe phases. The system is an Ising model with nearest neighbor, next-to-the-nearest neighbor and plaquette interactions. Due the particular nature of the ground states, the order parameter is defined in terms of blocks of spins. Our estimate of the persistence exponent, $\theta=0.42$, differs from those of the two-dimensional Ising and four state Potts models. Our procedure allows the study of persistence properties also at finite temperature $T$: our results are compatible with the hypothesis that $\theta$ does not depend on $T$ below the critical point.
Comments: LaTeX file with postscript figures
Journal: Physica A 265, 43-52, 1999
Nature of phase transitions in $F$ coupled $q$-state Potts models
A roughening transition indicated by the behaviour of ground states
Persistence Exponent for the Simple Diffusion Equation: The Exact Solution for any Integer Dimension
