中文

Universal aging properties at a disordered critical point

无序系统与神经网络 2009-11-10 v2

摘要

We investigate, analytically near the dimension duc=4d_{uc}=4 and numerically in d=3d=3, the non equilibrium relaxational dynamics of the randomly diluted Ising model at criticality. Using the Exact Renormalization Group Method to one loop, we compute the two times t,twt,t_w correlation function and Fluctuation Dissipation Ratio (FDR) for any Fourier mode of the order parameter, of finite wave vector qq. In the large time separation limit, the FDR is found to reach a non trivial value XX^{\infty} independently of (small) qq and coincide with the FDR associated to the the {\it total} magnetization obtained previously. Explicit calculations in real space show that the FDR associated to the {\it local} magnetization converges, in the asymptotic limit, to this same value XX^{\infty}. Through a Monte Carlo simulation, we compute the autocorrelation function in three dimensions, for different values of the dilution fraction pp at Tc(p)T_c(p). Taking properly into account the corrections to scaling, we find, according to the Renormalization Group predictions, that the autocorrelation exponent λc\lambda_c is independent on pp. The analysis is complemented by a study of the non equilibrium critical dynamics following a quench from a completely ordered state.

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引用

@article{arxiv.cond-mat/0412447,
  title  = {Universal aging properties at a disordered critical point},
  author = {Gregory Schehr and Raja Paul},
  journal= {arXiv preprint arXiv:cond-mat/0412447},
  year   = {2009}
}

备注

8 pages, 5 figures