Two-dimensional Dilute Ising Models: Defect Lines and the Universality of the Critical Exponent ν
arXiv:cond-mat/9901026
Abstract
We consider two-dimensional Ising models with randomly distributed ferromagnetic bonds and study the local critical behavior at defect lines by extensive Monte Carlo simulations. Both for ladder and chain type defects, non-universal critical behavior is observed: the critical exponent of the defect magnetization is found to be a continuous function of the strength of the defect coupling. Analyzing corresponding stability conditions, we obtain new evidence that the critical exponent $ν$ of the bulk correlation length of the random Ising model does not depend on dilution, i.e. $ν=1$.
4 pages in RevTeX, 4 eps figures included, submitted to J. Stat. Phys