English

Glassy dynamics in the East model

Statistical Mechanics 2007-05-23 v2 Disordered Systems and Neural Networks

Abstract

We study the dynamics of the East model, comprising a chain of uncoupled spins in a downward-pointing field. Glassy effects arise at low temperatures TT from the kinetic constraint that spins can only flip if their left neighbour is up. We give details of our previous solution of the non-equilibrium coarsening dynamics after a quench to low TT (Phys. Rev.\ Lett. 83:3238, 1999), including the anomalous coarsening of down-spin domains with typical size dˉtTln2\bar{d} \sim t^{T \ln 2}, and the pronounced `fragile glass'-divergence of equilibration times as t=exp(1/T2ln2)t_*=\exp(1/T^2\ln 2). We also link the model to the paste-all coarsening model, defining a family of interpolating models that all have the same scaling distribution of domain sizes. We then proceed to the problem of equilibrium dynamics at low TT. Based on a scaling hypothesis for the relation between timescales and lengthscales, we propose a model for the dynamics of `superdomains' which are bounded by up-spins that are frozen on long timescales. From this we deduce that the equilibrium spin correlation and persistence functions should exhibit identical scaling behaviour for low TT, decaying as g(t~)g(\tilde{t}). The scaling variable is t~=(t/t)Tln2\tilde{t}=(t/t_*)^{T\ln 2}, giving strongly stretched behaviour for low TT. The scaling function g()g(\cdot) decays faster than exponential, however, and in the limit T0T\to 0 at fixed t~\tilde{t} reaches zero at a {\em finite} value of t~\tilde{t}.

Keywords

Cite

@article{arxiv.cond-mat/0303318,
  title  = {Glassy dynamics in the East model},
  author = {P. Sollich and M. R. Evans},
  journal= {arXiv preprint arXiv:cond-mat/0303318},
  year   = {2007}
}

Comments

17 pages, revtex4, 8 figures. Minor clarifications, plus new figure 6 to provide simulation support for the notion of superdomain dynamics