Cluster simulations of loop models on two-dimensional lattices
Youjin Deng, Timothy M. Garoni, Wenan Guo, Henk W.J. Blote, Alan D. Sokal
Abstract
We develop cluster algorithms for a broad class of loop models on two-dimensional lattices, including several standard O(n) loop models at n \ge 1. We show that our algorithm has little or no critical slowing-down when 1 \le n \le 2. We use this algorithm to investigate the honeycomb-lattice O(n) loop model, for which we determine several new critical exponents, and a square-lattice O(n) loop model, for which we obtain new information on the phase diagram.