Multidimensional persistence behaviour in an Ising system

Abstract

We consider a periodic Ising chain with nearest-neighbour and r-th neighbour interaction and quench it from infinite temperature to zero temperature. The persistence probability P(t), measured as the probability that a spin remains unflipped upto time t, is studied by computer simulation for suitable values of r. We observe that as time progresses, P(t) first decays as t-0.22 (-the first regime), then the P(t)-t curve has a small slope (in log-log scale) for some time (-the second regime) and at last it decays nearly as t-3/8 (-the third regime). We argue that in the first regime, the persistence behaviour is the usual one for a two-dimensional system, in the second regime it is like that of a non-interacting (`zero-dimensional') system and in the third regime the persistence behaviour is like that of a one dimensional Ising model. We also provide explanations for such behaviour.