English

Modified Scaling Relation for the Random-Field Ising Model

Disordered Systems and Neural Networks 2015-06-25 v1 Statistical Mechanics

Abstract

We investigate the low-temperature critical behavior of the three dimensional random-field Ising ferromagnet. By a scaling analysis we find that in the limit of temperature T0T \to 0 the usual scaling relations have to be modified as far as the exponent α\alpha of the specific heat is concerned. At zero temperature, the Rushbrooke equation is modified to α+2β+γ=1\alpha + 2 \beta + \gamma = 1, an equation which we expect to be valid also for other systems with similar critical behavior. We test the scaling theory numerically for the three dimensional random field Ising system with Gaussian probability distribution of the random fields by a combination of calculations of exact ground states with an integer optimization algorithm and Monte Carlo methods. By a finite size scaling analysis we calculate the critical exponents ν1.0\nu \approx 1.0, β0.05\beta \approx 0.05, γˉ2.9\bar{\gamma} \approx 2.9 γ1.5\gamma \approx 1.5 and α0.55\alpha \approx -0.55.

Keywords

Cite

@article{arxiv.cond-mat/9708142,
  title  = {Modified Scaling Relation for the Random-Field Ising Model},
  author = {U. Nowak and K. D. Usadel and J. Esser},
  journal= {arXiv preprint arXiv:cond-mat/9708142},
  year   = {2015}
}

Comments

4 pages, Latex, Postscript Figures included