论文信息 - On three new cluster variation approximations

On three new cluster variation approximations

We discuss in some detail three new cluster variation approximations we used in a previous paper in connection with Pade approximants to investigate critical behaviour of classical spin models on various lattices. The approximations are applied to the Ising model on the simple cubic, face centered cubic, and semi-infinite simple cubic lattices. The natural iteration equations and estimates for the critical temperatures and for the range of validity of the approximations are given.

Alessandro Pelizzola | A. Pelizzola

[1] Alan M. Ferrenberg,et al. Critical behavior of the three-dimensional Ising model: A high-resolution Monte Carlo study. , 1991, Physical review. B, Condensed matter.

[2] Stephen G. Brush,et al. Improvement of the Cluster‐Variation Method , 1967 .

[3] Application of the cluster variation method to the fcc Ising ferromagnet , 1977 .

[4] Binder,et al. Monte Carlo study of surface phase transitions in the three-dimensional Ising model. , 1990, Physical review. B, Condensed matter.

[5] Tohru Morita,et al. Cluster variation method and Möbius inversion formula , 1990 .

[6] L. M. Falicov,et al. Magnetic Properties of Low-Dimensional Systems , 1986 .

[7] Guozhong An. A note on the cluster variation method , 1988 .

[8] R. Kubo. GENERALIZED CUMULANT EXPANSION METHOD , 1962 .

[9] Pelizzola. Cluster variation method, Padé approximants, and critical behavior. , 1994, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[10] D. Fontaine,et al. The two-dimensional ANNNI model in the CVM approximation , 1986 .

[11] Ryoichi Kikuchi,et al. Natural iteration method and boundary free energy , 1976 .

[12] Ryoichi Kikuchi,et al. Superposition approximation and natural iteration calculation in cluster‐variation method , 1974 .

[13] R. Kikuchi. A Theory of Cooperative Phenomena , 1951 .