High temperature series for the susceptibility of the Ising model. II. Three dimensional lattices

Abstract

For pt. I see ibid., vol. 5, no. 5, 624. Extended series expansions for the high temperature zero-field susceptibility of the Ising model are given in powers of the usual high temperature counting variable v=tanh K for the simple cubic lattice to v¹⁷, the body-centred cubic lattice to v¹⁵, and the face-centred cubic lattice to v¹², inclusive. The coefficients are analysed by the ratio method and it is estimated that, subject to the implicit assumptions thereof, the critical temperatures correspond to v_f=0.21813+or-0.00001 (SC), v_f=0.15612+or-0.00003 (BCC) and v_f=0.10174+or-0.00001 (FCC). The symptotic behaviour of the coefficients is studied in detail; for the loose-packed lattices the decay of the even-odd oscillation in the ratios is found to be consistent with the assumption that the critical index of the high temperature specific heat is very close to 1/8.