Multi-Grid Monte Carlo via XY Embedding I. General Theory and Two-Dimensional O(N)-Symmetric Nonlinear σ-Models
Abstract
We introduce a variant of the multi-grid Monte Carlo (MGMC) method, based on the embedding of an XY model into the target model, and we study its mathematical properties for a variety of nonlinear σ-models. We then apply the method to the two-dimensional O(N)-symmetric nonlinear σ-models (also called N-vector models) with N=3,4,8 and study its dynamic critical behavior. Using lattices up to 256 × 256, we find dynamic critical exponents zint, M2 ≈ 0.70 0.08, 0.60 0.07, 0.52 0.10 for N=3,4,8, respectively (subjective 68\% confidence intervals). Thus, for these asymptotically free models, critical slowing-down is greatly reduced compared to local algorithms, but not completely eliminated; and the dynamic critical exponent does apparently vary with N. We also analyze the static data for N=8 using a finite-size-scaling extrapolation method. The correlation length agrees with the four-loop asymptotic-freedom prediction to within ≈ 1\% over the interval 12 < < 650.
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