Nonequilibrium dynamics of random field Ising spin chains: Exact results via real space renormalization group

Abstract

The nonequilibrium dynamics of classical random Ising spin chains with nonconserved magnetization are studied using an asymptotically exact real space renormalization group (RSRG). We focus on random field Ising model (RFIM) spin chains with and without a uniform applied field, as well as on Ising spin glass chains in an applied field. For the RFIM we consider a universal regime where the random field and the temperature are both much smaller than the exchange coupling. In this regime, the Imry-Ma length that sets the scale of the equilibrium correlations is large and the coarsening of domains from random initial conditions (e.g., a quench from high temperature) occurs over a wide range of length scales. The two types of domain walls that occur diffuse in opposite random potentials, of the form studied by Sinai, and domain walls annihilate when they meet. Using the RSRG we compute many universal asymptotic properties of both the nonequilibrium dynamics and the equilibrium limit. We find that the configurations of the domain walls converge rapidly toward a set of system-specific time-dependent positions that are independent of the initial conditions. Thus the behavior of this nonequilibrium system is pseudodeterministic at long times because of the broad distributions of barriers that occur on the long length scales involved. Specifically, we obtain the time dependence of the energy, the magnetization, and the distribution of domain sizes (found to be statistically independent). The equilibrium limits agree with known exact results. We obtain the exact scaling form of the two-point equal time correlation function $\overline{〈S_0{\mathrm{}\left(t\right)S}_x\mathrm{}\left(t\right)\mathrm{}〉}$ and the two-time autocorrelations $\overline{〈S_0{(t}^{\prime }{)S}_0\mathrm{}\left(t\right)\mathrm{}〉}.$ We also compute the persistence properties of a single spin, of local magnetization, and of domains. The analogous quantities for the $\pm J$ Ising spin glass in an applied field are obtained from the RFIM via a gauge transformation. In addition to these we compute the two-point two-time correlation function $\overline{〈S_0{\mathrm{}\left(t\right)S}_x\mathrm{}\left(t\right)\mathrm{}〉〈S_0{(t}^{\prime }{)S}_x{(t}^{\prime })〉}$ which can in principle be measured by experiments on spin-glass-like systems. The thermal fluctuations are studied and found to be dominated by rare events; in particular all moments of truncated equal time correlations are computed. Physical properties which are typically measured in aging experiments are also studied, focusing on the response to a small magnetic field which is applied after waiting for the system to equilibrate for a time $t_w.$ The nonequilibrium fluctuation-dissipation ratio ${X(t,t}_w)$ is computed. We find that for $\left(t-t_w\right)\sim t_w^{\hat{\alpha }}$ with $\hat{\alpha }<1,$ the ratio equal to its equilibrium value $X=1,$ although time translational invariance does not hold in this regime. For $t-t_w\sim t_w$ the ratio exhibits an aging regime with a nontrivial ${X=X(t/t}_w)\ne 1,$ but the behavior is markedly different...