English

Super slowing down in the bond-diluted Ising model

Statistical Mechanics 2020-08-25 v2

Abstract

In models in statistical physics, the dynamics often slows down tremendously near the critical point. Usually, the correlation time τ\tau at the critical point increases with system size LL in power-law fashion: τLz\tau \sim L^z, which defines the critical dynamical exponent zz. We show that this also holds for the 2D bond-diluted Ising model in the regime p>pcp>p_c, where pp is the parameter denoting the bond concentration, but with a dynamical critical exponent z(p)z(p) which shows a strong pp-dependence. Moreover, we show numerically that z(p)z(p), as obtained from the autocorrelation of the total magnetisation, diverges when the percolation threshold pc=1/2p_c=1/2 is approached: z(p)z(1)(ppc)2z(p)-z(1) \sim (p-p_c)^{-2}. We refer to this observed extremely fast increase of the correlation time with size as {\it super slowing down}. Independent measurement data from the mean-square deviation of the total magnetisation, which exhibits anomalous diffusion at the critical point, supports this result.

Keywords

Cite

@article{arxiv.2002.06079,
  title  = {Super slowing down in the bond-diluted Ising model},
  author = {Wei Zhong and Gerard T. Barkema and Debabrata Panja},
  journal= {arXiv preprint arXiv:2002.06079},
  year   = {2020}
}

Comments

14 pages, 8 figures, to appear in Phys. Rev. E

R2 v1 2026-06-23T13:42:03.296Z