Mean spherical approximation

The mean spherical approximation (MSA) closure relation of Lebowitz and Percus is given by ^[1]:

${\displaystyle c(r)=-\beta \omega (r),~~~~r>\sigma .}$

In the Blum and Høye mean spherical approximation for mixtures the closure is given by ^{[2] [3]}:

${\displaystyle {\rm {g}}_{ij}(r)\equiv h_{ij}(r)+1=0~~~~~~~~r<\sigma _{ij}=(\sigma _{i}+\sigma _{j})/2}$

and

${\displaystyle c_{ij}(r)=\sum _{n=1}{\frac {K_{ij}^{(n)}}{r}}e^{-z_{n}r}~~~~~~\sigma _{ij}<r}$

where ${\displaystyle h_{ij}(r)}$ and ${\displaystyle c_{ij}(r)}$ are the total and the direct correlation functions for two spherical molecules of ${\displaystyle i}$ and ${\displaystyle j}$ species, ${\displaystyle \sigma _{i}}$ is the diameter of ${\displaystyle i}$ species of molecule. Duh and Haymet (Eq. 9 in ^[4]) write the MSA approximation as

${\displaystyle g(r)={\frac {c(r)+\beta \Phi _{2}(r)}{1-e^{\beta \Phi _{1}(r)}}}}$

where ${\displaystyle \Phi _{1}}$ and ${\displaystyle \Phi _{2}}$ comes from the Weeks-Chandler-Andersen division of the Lennard-Jones potential. By introducing the definition (Eq. 10 in ^[4])

${\displaystyle \left.s(r)\right.=h(r)-c(r)-\beta \Phi _{2}(r)}$

one can arrive at (Eq. 11 in ^[4])

${\displaystyle B(r)\approx B^{\rm {MSA}}(s)=\ln(1+s)-s}$

The Percus Yevick approximation may be recovered from the above equation by setting ${\displaystyle \Phi _{2}=0}$.

Thermodynamic consistency[edit]

^[5]

References[edit]