Derivation of low-temperature expansions for Ising model. IX. High-field polynomials for the honeycomb-triangular system
- 1 September 1975
- journal article
- Published by IOP Publishing in Journal of Physics A: General Physics
- Vol. 8 (9) , 1461-1468
- https://doi.org/10.1088/0305-4470/8/9/015
Abstract
For pt.VIII see ibid., vol.8, no.9, p.1448 of 1975. The derivation of high-field expansions for the honeycomb and triangular lattices is described briefly. New results are given for the high-field polynomials L11 and L12 on the triangular lattice and L22, L23, L24, L25 on the honeycomb lattice. The complete codes (partial generating functions) F11 and F12 which determine the corresponding sublattice polynomials are also derived.Keywords
This publication has 10 references indexed in Scilit:
- Derivation of low-temperature expansions for Ising model. VII. The honeycomb-triangular code systemJournal of Physics A: General Physics, 1975
- Derivation of low-temperature expansions for Ising model. VIII. Ferromagnetic and antiferromagnetic polynomials for the honeycomb-triangular systemJournal of Physics A: General Physics, 1975
- Derivation of low-temperature expansions for Ising model. VI. Three-dimensional lattices-temperature groupingJournal of Physics A: Mathematical, Nuclear and General, 1973
- Derivation of low-temperature expansions for Ising model. V. Three-dimensional lattices-field groupingJournal of Physics A: Mathematical, Nuclear and General, 1973
- Derivation of low-temperature expansions for Ising model. IV. Two-dimensional lattices-temperature groupingJournal of Mathematical Physics, 1973
- 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
- High temperature series for the susceptibility of the Ising model. I. Two dimensional latticesJournal of Physics A: General Physics, 1972
- Derivation of Low-Temperature Expansions for the Ising Model of a Ferromagnet and an AntiferromagnetJournal of Mathematical Physics, 1965
- Order-disorder statistics. II. A two-dimensional modelProceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences, 1949