【 摘 要 】

Using two sets of high-precision Monte Carlo data for the two-dimensional XY model in the Villain formulation on square L x L lattices, the scaling behavior of the susceptibility chi and correlation length xi at the Kosterlitz-Thouless phase transition is analyzed with emphasis on multiplicative logarithmic corrections (lnL)(-2r) in the finite-size scaling region and (in xi)(-2r) in the high-temperature phase near criticality, respectively. By analyzing the susceptibility at criticality on lattices of size up to 512(2) we obtain r=-0.0270(10), in agreement with recent work of Kenna and Irving on the finite-size scaling of Lee-Yang zeros in the cosine formulation of the XY model. By studying susceptibilities ana correlation lengths up to xi approximate to 140 in the high-temperature phase, however, we arrive at quite a different estimate of r=0.0560(17), which is in good agreement with recent analyses of thermodynamic Monte Carlo data and high-temperature series expansions of the cosine formulation.

【 授权许可】

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