Thermodynamic calculation of spin scaling functions

Abstract

Critical phenomena theory centers on the scaled thermodynamic potential per spin φ(β, h)=|t|pY(h|t|-q), with inverse temperature β=1/T, h=-β H, ordering field H, reduced temperature t=t(β), critical exponents p and q, and function Y(z) of z=h|t|-q. I discuss calculating Y(z) with the information geometry of thermodynamics. Scaled solutions obtain with three admissible functions t(β): 1) t=e-Jβ, 2) t=β-1, and 3) t=βC-β, where J and βC are constants. For p=q, information geometry yields Y(z)=1+z2, consistent with the one-dimensional (1D) ferromagnetic Ising model.