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Revision as of 20:44, 19 February 2007

(Note: the reference-HNC (RHNC) is somtimes referred to as the modified-HNC (MHNC) Ref.1).

Rosenfeld and Ashcroft (1979) (Ref. 1) proposed the `anzatz of universality':

{\it ``...the bridge functions.. ..constitute the same family of curves, irrespective of the assumed pair potential".}

The basis of the method is to solve the modified HNC equation (with inclusion of the one-parameter bridge functions appropriate to hard spheres), and determine the only free parameter $\eta$ (related to the hard-sphere diameter) by requiring thermodynamic consistency. Fred Lado \cite{PRA_1973_08_002548} and Rosenfeld and Ashcroft (1979) \cite{PRA_1979_20_001208} noticed that the OZ equation can always be written in the form

\gamma _{12}=\rho \int _{V}(h_{13}-\gamma _{13})h_{23}~{\rm {d}}(3)

In view of this a hybrid solution between the HNC approximation and the Malijevsky-Labik formula for hard spheres \cite{MP_1987_60_0663,MP_1989_67_0431} was proposed. The philosophy of this method is that the bridge functional of the liquid is fairly similar to that of the hard sphere fluid. See also \cite{PLA_1982_89_0196,PRA_1983_28_002374}.\\ The RHNC closure is given by (Eq. 17 \cite{PRA_1983_28_002374})

c\left(r\right)=h(r)-\ln[g(r)e^{\beta \phi (r)}]+B_{0}(r)

along with the constraint (Eq. 18 \cite{PRA_1983_28_002374})

\rho \int [g(r)-g_{0}(r)]\delta B_{0}(r)dr_{3}=0

Incorporating a reference potential $\phi_0(r)= \phi_0(r;\sigma,\epsilon)$ this equation becomes (Eqs. 19a and 19b \cite{PRA_1983_28_002374})

\rho \int [g(r)-g_{0}(r)]\sigma {\frac {\partial B_{0}(r)}{\partial \sigma }}dr_{3}=0

and

\rho \int [g(r)-g_{0}(r)]\epsilon {\frac {\partial B_{0}(r)}{\partial \epsilon }}dr_{3}=0

These are the conditions that will determine the optimum values of $\sigma$ and $\epsilon$ that minimise the free energy. The RHNC satisfies the 'Hiroike' termodynamic relation test \cite{PRA_1983_28_002374,JPSJ_1957_12_00326}, i.e.

\left.{\frac {\partial U}{\partial V}}\right\vert _{T}=T\left.{\frac {\partial p}{\partial T}}\right\vert _{V}-p

For highly asymmetric mixtures see \cite{JCP_2005_123_174508}.

References

[PRA_1979_20_001208]

@@ Line 1: / Line 1: @@
-(Note: the reference-HNC (RHNC) is somtimes referred to as the modified-HNC (MHNC) \cite{PRA_1979_20_001208}).
+ (Note: the reference-HNC (RHNC) is somtimes referred to as the modified-HNC (MHNC) Ref.1).
- Rosenfeld and Ashcroft (1979) \cite{PRA_1979_20_001208}
+Rosenfeld and Ashcroft (1979) (Ref. 1) proposed the `anzatz of universality':
-proposed the `anzatz of universality':
-{\it ``...the bridge functions.. ..constitute the same family of curves, irrespective of the assumed pair potential".}
+ {\it ``...the bridge functions.. ..constitute the same family of curves, irrespective of the assumed pair potential".}
 The basis of the method is to solve the modified HNC equation
 (with inclusion of the one-parameter bridge functions
-appropriate to hard spheres), and determine the only free parameter $\eta$
+appropriate to hard spheres), and determine the only free parameter <math>\eta</math>
-(related to the hard-sphere diameter) by requiring thermodynamic consistency.\\
+(related to the hard-sphere diameter) by requiring thermodynamic consistency.
 Fred Lado  \cite{PRA_1973_08_002548} and Rosenfeld and Ashcroft (1979) \cite{PRA_1979_20_001208}
 noticed that the OZ equation can always be written in the form
-\begin{equation}
+:<math>\gamma_{12} =  \rho \int_V (h_{13} - \gamma_{13}) h_{23} ~{\rm d}(3)</math>
-\gamma_{12} =  \rho \int_V (h_{13} - \gamma_{13}) h_{23} ~{\rm d}(3)
-\end{equation}
 In view of this a hybrid solution between the HNC
 approximation and the Malijevsky-Labik formula for hard spheres \cite{MP_1987_60_0663,MP_1989_67_0431}
-was proposed.\\
+was proposed. The philosophy of this method is that the  bridge functional of the
-The philosophy of this method is that the  bridge functional of the
+liquid is fairly similar to that of the hard sphere fluid.
-liquid is fairly similar to that of the
-hard sphere fluid.
 See also \cite{PLA_1982_89_0196,PRA_1983_28_002374}.\\
 The RHNC closure is given by (Eq. 17 \cite{PRA_1983_28_002374})
-\begin{equation}
+:<math> c\left(r\right) = h(r) - \ln [g(r) e^{\beta \phi(r)}] + B_0(r) </math>
-c(r) = h(r) - \ln [g(r) e^{\beta \phi(r)}] + B_0(r)
-\end{equation}
 along with the constraint (Eq. 18 \cite{PRA_1983_28_002374})
-\begin{equation}
+:<math>\rho \int [g(r) - g_0(r)] \delta B_0(r) dr_3 = 0 </math>
-\rho \int [g(r) - g_0(r)] \delta B_0(r) {\rm d}{\bf r}_3 = 0
-\end{equation}
 Incorporating a reference potential $\phi_0(r)= \phi_0(r;\sigma,\epsilon)$
 this equation becomes  (Eqs. 19a and 19b \cite{PRA_1983_28_002374})
-\begin{equation}
+:<math>\rho \int [g(r) - g_0(r)] \sigma \frac{\partial B_0(r)}{\partial \sigma}dr_3 = 0 </math>
-\rho \int [g(r) - g_0(r)] \sigma \frac{\partial B_0(r)}{\partial \sigma} {\rm d}{\bf r}_3 = 0
-\end{equation}
 and
-\begin{equation}
+:<math>\rho \int [g(r) - g_0(r)] \epsilon \frac{\partial B_0(r)}{\partial \epsilon} dr_3 = 0 </math>
-\rho \int [g(r) - g_0(r)] \epsilon \frac{\partial B_0(r)}{\partial \epsilon} {\rm d}{\bf r}_3 = 0
+These are the conditions that will determine the optimum values of <math>\sigma</math> and <math>\epsilon</math>
-\end{equation}
+that minimise the free energy.
-These are the conditions that will determine the optimum values of
-$\sigma$ and $\epsilon$ that minimise the free energy.
 The RHNC satisfies the 'Hiroike' termodynamic relation test \cite{PRA_1983_28_002374,JPSJ_1957_12_00326}, i.e.
-\begin{equation}
+:<math>\left.\frac{\partial U}{\partial V}\right\vert_{T} = T \left.\frac{\partial p}{\partial T}\right\vert_{V} -p</math>
-\left.\frac{\partial U}{\partial V}\right\vert_{T} = T \left.\frac{\partial p}{\partial T}\right\vert_{V} -p
-\end{equation}
 For highly asymmetric mixtures see \cite{JCP_2005_123_174508}.
 ==References==
+#[PRA_1979_20_001208]

Reference hyper-netted chain: Difference between revisions

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