Possible loss and recovery of Gibbsianness during the stochastic evolution of Gibbs measures
Abstract
We consider Ising-spin systems starting from an initial Gibbs measure and evolving under a spin-flip dynamics towards a reversible Gibbs measure μ=. Both and μ are assumed to have a finite-range interaction. We study the Gibbsian character of the measure S(t) at time t and show the following: (1) For all and μ, S(t) is Gibbs for small t. (2) If both and μ have a high or infinite temperature, then S(t) is Gibbs for all t>0. (3) If has a low non-zero temperature and a zero magnetic field and μ has a high or infinite temperature, then S(t) is Gibbs for small t and non-Gibbs for large t. (4) If has a low non-zero temperature and a non-zero magnetic field and μ has a high or infinite temperature, then S(t) is Gibbs for small t, non-Gibbs for intermediate t, and Gibbs for large t. The regime where μ has a low or zero temperature and t is not small remains open. This regime presumably allows for many different scenarios.
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