Wolff-Type Embedding Algorithms for General Nonlinear σ-Models

Abstract

We study a class of Monte Carlo algorithms for the nonlinear σ-model, based on a Wolff-type embedding of Ising spins into the target manifold M. We argue heuristically that, at least for an asymptotically free model, such an algorithm can have dynamic critical exponent z 2 only if the embedding is based on an (involutive) isometry of M whose fixed-point manifold has codimension 1. Such an isometry exists only if the manifold is a discrete quotient of a product of spheres. Numerical simulations of the idealized codimension-2 algorithm for the two-dimensional O(4)-symmetric σ-model yield zint, M2 = 1.5 0.5 (subjective 68\% confidence interval), in agreement with our heuristic argument.

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