616 Critical phenomena
Table 16.1Comparison of thermodynamic variables and relations between gas–liquid and
magnetic systems.
Quantity Gas–Liquid Magnetic Quantity
Pressure P h Magnetic field
Volume V −M=−Nm Magnetization
Isothermal Magnetic
compressibility κT=−(1/V)(∂P/∂V) χ=∂m/∂h susceptibility
Helmholtz Helmholtz
free energy A(N,V,T) A(N,M,T) free energy
Gibbs Gibbs
free energy G(N,P,T) G(N,h,T) free energy
Pressure Magnetic field
relation P=−∂A/∂V h=∂A/∂M relation
Volume Magnetization
relation V=∂G/∂P M=−∂G/∂h relation
Const. Const.
volume magnetization
heat capacity CV=−T(
∂^2 A/∂T^2)
V CM=−T(
∂^2 A/∂T^2)
M heat capacity
Const. pressure Const. field
heat capacity CP=−T(
∂^2 G/∂T^2)
P Ch=−T(
∂^2 G/∂T^2)
h heat capacityAlong the critical isotherm, the behavior of the equation of state near the inflection
point is
h∼|m|δsign(m). (16.3.8)
Finally, asT →Tcfrom below, the discontinuity in the magnetization depends on
temperature according to the power-law
m∼|Tc−T|β. (16.3.9)In this way, a perfect analogy is established between the magnetic and gas–liquid
systems. Before proceeding to analyze the magnetic system model, however, we first
clarify the concept of universality and provide a definition of universality classes.
16.4 Universality classes
In a perfectly ordered magnetic state, the magnetization per spinmcan take one of
two values,m= 1 orm=−1, depending on the direction in which the spins point.
In the former case,σ 1 = 1,...,σN= 1, while in the latterσ 1 =− 1 ,...,σN=−1. If we
perform a variable transformation
σi′=−σi, (16.4.1)