Persistence and the Random Bond Ising Model in Two Dimensions

Abstract

We study the zero-temperature persistence phenomenon in the random bond J Ising model on a square lattice via extensive numerical simulations. We find strong evidence for ` blocking regardless of the amount disorder present in the system. The fraction of spins which never flips displays interesting non-monotonic, double-humped behaviour as the concentration of ferromagnetic bonds p is varied from zero to one. The peak is identified with the onset of the zero-temperature spin glass transition in the model. The residual persistence is found to decay algebraically and the persistence exponent θ (p)≈ 0.9 over the range 0.1 p 0.9. Our results are completely consistent with the result of Gandolfi, Newman and Stein for infinite systems that this model has ` mixed behaviour, namely positive fractions of spins that flip finitely and infinitely often, respectively. [Gandolfi, Newman and Stein, Commun. Math. Phys. 214 373, (2000).]

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