English

Criticality in Fiber Bundle Model

Statistical Mechanics 2014-12-04 v1 Disordered Systems and Neural Networks

Abstract

We report a novel critical behavior in the breakdown of an equal load sharing fiber bundle model at a dispersion δc\delta_c of the breaking threshold of the fibers. For δ<δc\delta < \delta_c, there is a finite probability PbP_b, that rupturing of the weakest fiber leads to the failure of the entire system. For δδc\delta \geq \delta_c, Pb=0P_b = 0. At δc,PbLη\delta_c, P_b \sim L^{-\eta}, with η1/3\eta \approx 1/3, where LL is the size of the system. As δδc\delta \rightarrow \delta_c, the relaxation time τ\tau diverges obeying the finite size scaling law: τLβ(δδcLα)\tau \sim L^{\beta}(|\delta-\delta_c| L^{\alpha}) with α,β=0.33±0.05\alpha, \beta = 0.33 \pm 0.05. At δc\delta_c, the system fails, at the critical load, in avalanches (of rupturing fibers) of all sizes ss following the distribution P(s)sκP(s) \sim s^{-\kappa}, with κ=0.50±0.01\kappa = 0.50 \pm 0.01. We relate this critical behavior to brittle to quasi-brittle transition.

Keywords

Cite

@article{arxiv.1412.1211,
  title  = {Criticality in Fiber Bundle Model},
  author = {Subhadeep Roy and Purusattam Ray},
  journal= {arXiv preprint arXiv:1412.1211},
  year   = {2014}
}

Comments

4 pages, 5 figures

R2 v1 2026-06-22T07:18:47.747Z