Dynamic critical behavior of the Swendsen--Wang Algorithm for the three-dimensional Ising model
Abstract
We have performed a high-precision Monte Carlo study of the dynamic critical behavior of the Swendsen-Wang algorithm for the three-dimensional Ising model at the critical point. For the dynamic critical exponents associated to the integrated autocorrelation times of the "energy-like" observables, we find zint,N = zint,E = zint,E' = 0.459 +- 0.005 +- 0.025, where the first error bar represents statistical error (68% confidence interval) and the second error bar represents possible systematic error due to corrections to scaling (68% subjective confidence interval). For the "susceptibility-like" observables, we find zint,M2 = zint,S2 = 0.443 +- 0.005 +- 0.030. For the dynamic critical exponent associated to the exponential autocorrelation time, we find zexp ≈ 0.481. Our data are consistent with the Coddington-Baillie conjecture zSW = β/ ≈ 0.5183, especially if it is interpreted as referring to zexp.
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