The bulk, surface and corner free energies of the square lattice Ising model

We use Kaufman's spinor method to calculate the bulk, surface and corner free energies f_b, f_s, f_s', f_c of the anisotropic square lattice zero-field Ising model for the ordered ferromagnetic case. For f_b, f_s, f_s' our results of course agree with the early work of Onsager, McCoy and Wu. We also find agreement with the conjectures made by Vernier and Jacobsen (VJ) for the isotropic case. We note that the corner free energy f_c depends only on the elliptic modulus k that enters the working, and not on the argument v, which means that VJ's conjecture applies for the full anisotropic model. The only aspect of this paper that is new is the actual derivation of f_c, but by reporting all four free energies together we can see interesting structures linking them.