Hysteresis, Avalanches, and Disorder Induced Critical Scaling: A Renormalization Group Approach
arXiv:cond-mat/9507118 · doi:10.1103/PhysRevB.53.14872
Abstract
We study the zero temperature random field Ising model as a model for noise and avalanches in hysteretic systems. Tuning the amount of disorder in the system, we find an ordinary critical point with avalanches on all length scales. Using a mapping to the pure Ising model, we Borel sum the $6-ε$ expansion to $O(ε^5)$ for the correlation length exponent. We sketch a new method for directly calculating avalanche exponents, which we perform to $O(ε)$. Numerical exponents in 3, 4, and 5 dimensions are in good agreement with the analytical predictions.
134 pages in REVTEX, plus 21 figures. The first two figures can be obtained from the references quoted in their respective figure captions, the remaining 19 figures are supplied separately in uuencoded format