Ornstein-Zernike relation

Notation:

• ${\displaystyle g(r)}$ is the pair distribution function.
• ${\displaystyle \Phi (r)}$ is the pair potential acting between pairs.
• ${\displaystyle h(1,2)}$ is the total correlation function ${\displaystyle h(1,2)\equiv g(r)-1}$.
• ${\displaystyle c(1,2)}$ is the direct correlation function.
• ${\displaystyle \gamma (r)}$ is the indirect (or series or chain) correlation function ${\displaystyle \gamma (r)\equiv h(r)-c(r)}$.
• ${\displaystyle y(r_{12})}$ is the cavity correlation function${\displaystyle y(r)\equiv g(r)/e^{-\beta \Phi (r)}}$
• ${\displaystyle B(r)}$ is the bridge function.
• ${\displaystyle \omega (r)}$ is the thermal potential, ${\displaystyle \omega (r)\equiv \gamma (r)+B(r)}$.
• ${\displaystyle f(r)}$ is the [[Mayer ${\displaystyle f}$-function]], defined as ${\displaystyle f(r)\equiv e^{-\beta \Phi (r)}-1}$.

The Ornstein-Zernike relation (OZ) integral equation is

${\displaystyle h=h[c]}$

where ${\displaystyle h[c]}$ denotes a functional of ${\displaystyle c}$. This relation is exact. This is complemented by the closure relation

${\displaystyle c=c[h]}$

Note that ${\displaystyle h}$ depends on ${\displaystyle c}$, and ${\displaystyle c}$ depends on ${\displaystyle h}$. Because of this ${\displaystyle h}$ must be determined self-consistently. This need for self-consistency is characteristic of all many-body problems. (Hansen \& McDonald \S 5.2 p. 106) For a system in an external field, the OZ has the form (5.2.7)

${\displaystyle h(1,2)=c(1,2)+\int \rho ^{(1)}(3)c(1,3)h(3,2)d3}$

If the system is both homogeneous and isotropic, the OZ relation becomes (\cite{KNAW_1914_17_0793} Eq. 6)

${\displaystyle \gamma ({\bf {r}})\equiv h({\bf {r}})-c({\bf {r}})=\rho \int h({\bf {r'}})~c(|{\bf {r}}-{\bf {r'}}|){\rm {d}}{\bf {r'}}}$ In words, this equation (Hansen \& McDonald \S 5.2 p. 107)

``...describes the fact that the total correlation between particles 1 and 2, represented by ${\displaystyle h(1,2)}$, 
is due in part to the direct correlation between 1 and 2, represented by ${\displaystyle c(1,2)}$, but also to the indirect correlation,  
${\displaystyle \gamma (r)}$, propagated via increasingly large numbers of intermediate particles."

Notice that this equation is basically a convolution, i.e. ${\displaystyle h\equiv c+\rho h\otimes c}$

(Note: the convolution operation written here as $ \otimes$ is more frequently written as $*$)\\ This can be seen by expanding the integral in terms of $h({\bf r})$ (here truncated at the fourth iteration): \begin{eqnarray*} h({\bf r}) = c({\bf r}) &+& \rho \int c(|{\bf r} - {\bf r'}|) c({\bf r'}) {\rm d}{\bf r'} \\ &+& \rho^2 \int \int c(|{\bf r} - {\bf r'}|) c(|{\bf r'} - {\bf r}|) c({\bf r}) {\rm d}{\bf r}{\rm d}{\bf r'} \\ &+& \rho^3 \int\int\int c(|{\bf r} - {\bf r'}|) c(|{\bf r'} - {\bf r}|) c(|{\bf r} - {\bf r'}|) c({\bf r}) {\rm d}{\bf r}{\rm d}{\bf r}{\rm d}{\bf r'}\\ &+& \rho^4 \int \int\int\int c(|{\bf r} - {\bf r'}|) c(|{\bf r'} - {\bf r}|) c(|{\bf r} - {\bf r}|) c(|{\bf r} - {\bf r'}|) h({\bf r'}) {\rm d}{\bf r'} {\rm d}{\bf r}{\rm d}{\bf r}{\rm d}{\bf r'} \end{eqnarray*} {\it etc.}\\ Diagrammatically this expression can be written as \cite{PRA_1992_45_000816}: \begin{figure}[H] \begin{center} \includegraphics[clip,height=30pt,width=350pt]{oz_diag.eps} \end{center} \end{figure} \noindent where the bold lines connecting root points denote $c$ functions, the blobs denote $h$ functions. An arrow pointing from left to right indicates an uphill path from one root point to another. An `uphill path' is a sequence of Mayer bonds passing through increasing particle labels.\\ The OZ relation can be derived by performing a functional differentiation of the grand canonical distribution function (HM check this).