An empirical partition function for the simple cubic Ising Model with a zero external magnetic field

Abstract

There is no an accepted exact partition function (PF) for the three dimensional (3D) Ising model to our knowledge. Mainly based on the connection between the lattice Green function (LGF) for the simple cubic lattice and that for the honeycomb lattice, we infer an empirical partition function (EPF) for the simple cubic Ising model in the absence of an external magnetic field. This EPF_ 3D=12π 3∫0π ∫0π ∫0π [2(2 32z + 3 22z + 2)12 -2α 2z \ (ω1 + ω2 + ω3)] dω1dω2dω3, α∈[2,3] (where z=εkT, ε the interaction energy, T the temperature, and k Boltzmann constant). When α=2, this EPF is consistent well numerically with the result from high temperature expansions by Guttmann and Enting (1993). The specific heat from this EPF approaches infinity non-logarithmically at the critical temperature Tc. εkTc=-1[14 (17-317)]/2≈ 0.277212, which is greater than 0.221654 from the recent Monte Carlo study.