Derivation of low-temperature expansions for Ising model. V. Three-dimensional lattices-field grouping
- 1 October 1973
- journal article
- Published by IOP Publishing in Journal of Physics A: Mathematical, Nuclear and General
- Vol. 6 (10), 1498-1506
- https://doi.org/10.1088/0305-4470/6/10/008
Abstract
For pt.IV, see J. Math. Phys., vol. 14, 1071 (1973). A brief description is given of the derivation of series expansions for the three-dimensional Ising model of a ferromagnet and antiferromagnet as a high-field grouping. New results are given for the high-field polynomials for the face-centred cubic lattice to order 8, the body-centred cubic lattice to order 11, the simple cubic lattice to order 13 and the diamond lattice to order 17.Keywords
This publication has 12 references indexed in Scilit:
- Derivation of low-temperature expansions for Ising model. III. Two-dimensional lattices-field groupingJournal of Mathematical Physics, 1973
- Derivation of low-temperature expansions for Ising model. II. General theoryJournal of Mathematical Physics, 1973
- The smoothness postulate and the Ising antiferromagnetJournal of Physics C: Solid State Physics, 1971
- Order-Disorder of Nonstoichiometric Binary Alloys and Ising Antiferromagnets in Magnetic FieldsPhysical Review B, 1967
- Hard-Sphere Lattice Gases. II. Plane-Triangular and Three-Dimensional LatticesThe Journal of Chemical Physics, 1967
- Variation of the Critical Temperatures of Ising Antiferromagnets with Applied Magnetic FieldJournal of Applied Physics, 1966
- Hard-Sphere Lattice Gases. I. Plane-Square LatticeThe Journal of Chemical Physics, 1965
- Derivation of Low-Temperature Expansions for the Ising Model of a Ferromagnet and an AntiferromagnetJournal of Mathematical Physics, 1965
- The crystal statistics of the diamond latticePhysica, 1963
- High Temperature Susceptibility Expansions for the Close Packed Hexagonal LatticeProceedings of the Physical Society. Section B, 1957