On the Phase Transition and Critical Behaviour in the Two-Dimensional Anisotropic Heisenberg Model

概要

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The anisotropic Heisenberg model has been investigated by interpolating anisotropy between the Ising and isotropic Heisenberg limits via general spin high temperature series (HTS) for the zero-field susceptibility of the ferromagnets for the square lattice. This is done by locating the critical temperature ($T{_{c}}^{(2)}$) and the susceptibility exponent ($\gamma$) from the analysis of the series by Pade approximant and ratio methods. The critical temperature is found to be spin dependent. It decreases as anisotropy changes from the Ising limit towards the isotropic limit and remains finite (lower than that of Stanley and Kaplan) for all the spins except for $S{=}1/2$ at the isotropic limit. Exponent $\gamma$ is almost Ising like for the anisotropic system and anomalous jump in it occurs for the isotropic case. In addition, expressions for the magnetization are derived by using spin-wave theory. The limit of complete isotropy has been found not to be a special case for the susceptibility, in contrast to magnetization.
社団法人日本物理学会の論文
1976-03-15