Low-temperature series expansions for the spin-1 Ising model

We have calculated the low-temperature series expansions of the spontaneous magnetization and the zero-field susceptibility of the square-lattice ferromagnetic Ising model with first-neighbour interaction J1 and second-neighbour interaction J2 to the 30th and 26th order respectively by computer. Our results extend the previous calculations by Lee and Lin to six more orders. We use the Padé approximants to estimate the critical exponents and the critical temperature for different ratios of R = J2/J1. The estimated critical temperature as a function of R agrees with the estimation by Oitmaa from high-temperature series expansions.

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Derivation of low-temperature series expansions for the Ising model with triplet interactions on the plane triangular lattice

Journal of Physics A General Physics ◽

10.1088/0305-4470/8/9/016 ◽

1975 ◽

Vol 8 (9) ◽

pp. 1469-1479 ◽

Cited By ~ 10

Author(s):

M F Sykes ◽

M G Watts

Keyword(s):

Ising Model ◽

Low Temperature ◽

Triangular Lattice ◽

Temperature Series ◽

Series Expansions

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Low-temperature series expansions for the square lattice Ising model with spin

Journal of Physics A General Physics ◽

10.1088/0305-4470/29/14/009 ◽

1996 ◽

Vol 29 (14) ◽

pp. 3805-3815 ◽

Cited By ~ 14

Author(s):

I Jensen ◽

A J Guttmann ◽

I G Enting

Keyword(s):

Ising Model ◽

Low Temperature ◽

Temperature Series ◽

Square Lattice ◽

Series Expansions

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The bulk, surface and corner free energies of the anisotropic triangular Ising model

Proceedings of The Royal Society A Mathematical Physical and Engineering Sciences ◽

10.1098/rspa.2019.0713 ◽

2020 ◽

Vol 476 (2234) ◽

pp. 20190713

Author(s):

Rodney J. Baxter

Keyword(s):

Free Energy ◽

Ising Model ◽

Partition Function ◽

Temperature Series ◽

Isotropic Case ◽

Series Expansions ◽

Exact Results ◽

Free Energies ◽

Bulk Surface ◽

Bulk Free Energy

We consider the anisotropic Ising model on the triangular lattice with finite boundaries, and use Kaufman’s spinor method to calculate low-temperature series expansions for the partition function to high order. From these, we can obtain 108-term series expansions for the bulk, surface and corner free energies. We extrapolate these to all terms and thereby conjecture the exact results for each. Our results agree with the exactly known bulk-free energy and with Cardy and Peschel’s conformal invariance predictions for the dominant behaviour at criticality. For the isotropic case, they also agree with Vernier and Jacobsen’s conjecture for the 60 ° corners.

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