Widom scaling

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Widom scaling is a hypothesis in Statistical mechanics regarding the free energy of a magnetic system near its critical point which leads to the critical exponents becoming no longer independent so that they can be paramaterized in terms of two values.

[edit] Definitions

The critical exponents α,α',β,γ,γ' and δ are defined in terms of the behaviour of the order parameters and response functions near the critical point as follows

, for

, for

where

measures the temperature relative to the critical point.

[edit] Derivation

The scaling hypothesis is that near the critical point, the free energy f(t,H) can be written as the sum of a slowly varying regular part f_r and a singular part f_s, with the singular part being a scaling function, ie, a homogeneous function, so that

f_s(λ^pt,λ^qH) = λf_s(t,H)

Then taking the partial derivative with respect to H and the form of M(t,H) gives

λ^qM(λ^pt,λ^qH) = λM(t,H)

Setting H = 0 and λ = ( − t) ^{− 1 / p} in the preceding equation yields

for

Comparing this with the definition of β yields its value,

Similarly, putting t = 0 and λ = H ^{− 1 / q} into the scaling relation for M yields

Applying the expression for the isothermal susceptibility χ_T in terms of M to the scaling relation yields

λ^2qχ_T(λ^pt,λ^qH) = λχ_T(t,H)

Setting H=0 and λ = (t) ^{− 1 / p} for (resp. λ = ( − t) ^{− 1 / p} for ) yields

Similarly for the expression for specific heat c_H in terms of M to the scaling relation yields

λ^2pc_H(λ^pt,λ^qH) = λc_H(t,H)

Taking H=0 and λ = (t) ^{− 1 / p} for (or λ = ( − t) ^{− 1 / p} for yields

As a consequence of Widom scaling, not all critical exponents are independent but they can be parameterized by two numbers with the relations expressed as

γ = γ' = β(δ − 1)

The relations are experimentally well verified for magnetic systems and fluids.

[edit] Reference

H.E. Stanley, Introduction to Phase Transitions and Critical Phenomena

Retrieved from "http://en.wikipedia.org../../../w/i/d/Widom_scaling.html"

Category: Statistical mechanics

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