Block persistence

Abstract

We define a block persistence probability pl(t) as the probability that the order parameter integrated on a block of linear size l has never changed sign since the initial time in a phase ordering process at finite temperature T<Tc. We argue that pl(t) l-zθ0f(t/lz) in the scaling limit of large blocks, where θ0 is the global (magnetization) persistence exponent and f(x) decays with the local (single spin) exponent θ for large x. This scaling is demonstrated at zero temperature for the diffusion equation and the large n model, and generically it can be used to determine easily θ0 from simulations of coarsening models. We also argue that θ0 and the scaling function do not depend on temperature, leading to a definition of θ at finite temperature, whereas the local persistence probability decays exponentially due to thermal fluctuations. We also discuss conserved models for which different scaling are shown to arise depending on the value of the autocorrelation exponent λ. We illustrate our discussion by extensive numerical results. We also comment on the relation between this method and an alternative definition of θ at finite temperature recently introduced by Derrida [Phys. Rev. E 55, 3705 (1997)].

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