Mean spherical approximation: Difference between revisions

Latest revision as of 14:07, 16 February 2012

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

c(r)=-\beta \omega (r),~~~~r>\sigma .

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

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

and

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

where $h_{ij}(r)$ and $c_{ij}(r)$ are the total and the direct correlation functions for two spherical molecules of $i$ and $j$ species, $\sigma _{i}$ is the diameter of Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "https://wikimedia.org/api/rest_v1/":): {\displaystyle i} species of molecule. Duh and Haymet (Eq. 9 in ^[4]) write the MSA approximation as

Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "https://wikimedia.org/api/rest_v1/":): {\displaystyle g(r) = \frac{c(r) + \beta \Phi_2(r)}{1-e^{\beta \Phi_1(r)}}}

where Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "https://wikimedia.org/api/rest_v1/":): {\displaystyle \Phi_1} and Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "https://wikimedia.org/api/rest_v1/":): {\displaystyle \Phi_2} comes from the Weeks-Chandler-Andersen division of the Lennard-Jones potential. By introducing the definition (Eq. 10 in ^[4])

Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "https://wikimedia.org/api/rest_v1/":): {\displaystyle \left.s(r)\right. = h(r) -c(r) -\beta \Phi_2 (r)}

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

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

The Percus Yevick approximation may be recovered from the above equation by setting Failed to parse (SVG (MathML can be enabled via browser plugin): Invalid response ("Math extension cannot connect to Restbase.") from server "https://wikimedia.org/api/rest_v1/":): {\displaystyle \Phi_2=0} .

Thermodynamic consistency[edit]

^[5]

References[edit]

[1] J. L. Lebowitz and J. K. Percus "Mean Spherical Model for Lattice Gases with Extended Hard Cores and Continuum Fluids", Physical Review 144 pp. 251-258 (1966)

[2] L. Blum and J. S. Høye "Solution of the Ornstein-Zernike equation with Yukawa closure for a mixture", Journal of Statistical Physics, 19 pp. 317-324 (1978)

[3] Lesser Blum "Solution of the Ornstein-Zernike equation for a mixture of hard ions and Yukawa closure" Journal of Statistical Physics, 22 pp. 661-672 (1980)

[Duh_and_Haymet-4] 4.0 ^4.1 ^4.2 Der-Ming Duh and A. D. J. Haymet "Integral equation theory for uncharged liquids: The Lennard-Jones fluid and the bridge function", Journal of Chemical Physics 103 pp. 2625-2633 (1995)

[5] Andrés Santos "Thermodynamic consistency between the energy and virial routes in the mean spherical approximation for soft potentials" Journal of Chemical Physics 126 116101 (2007)

[1]

[2]

[3]

[4]

[5]

@@ Line 1: / Line 1: @@
-The '''Lebowitz and Percus''' mean spherical approximation (MSA) (1966) (Ref. 1) closure is given by
+The '''mean spherical approximation''' (MSA)  [[Closure relations | closure relation]] of Lebowitz and Percus is given by <ref>[http://dx.doi.org/10.1103/PhysRev.144.251  J. L. Lebowitz and J. K. Percus "Mean Spherical Model for Lattice Gases with Extended Hard Cores and Continuum Fluids", Physical Review '''144''' pp. 251-258 (1966)]</ref>:
-:<math>c(r) = -\beta \omega(r), ~~~~ r>\sigma.</math>
+:<math>c(r) = -\beta \omega(r), ~ ~ ~ ~ r>\sigma.</math>
-The '''Blum and Hoye''' mean spherical approximation (MSA) (1978-1980) (Refs 2 and 3) closure is given by
+In the '''Blum and Høye''' mean spherical approximation for [[mixtures]] the closure is given by <ref>[http://dx.doi.org/10.1007/BF01011750 L. Blum and J. S. Høye "Solution of the Ornstein-Zernike equation with Yukawa closure for a mixture", Journal  of Statistical Physics, '''19''' pp. 317-324 (1978)]</ref>
+<ref>[http://dx.doi.org/10.1007/BF01013935   Lesser Blum "Solution of the Ornstein-Zernike equation for a mixture of hard ions and Yukawa closure" Journal  of Statistical Physics, '''22''' pp. 661-672 (1980)]</ref>:
-:<math>{\rm g}_{ij}(r) \equiv h_{ij}(r) +1=0 ~~~~~~~~ r < \sigma_{ij} = (\sigma_i + \sigma_j)/2</math>
+:<math>{\rm g}_{ij}(r) \equiv h_{ij}(r) +1=0 ~ ~ ~ ~ ~ ~ ~ ~ r < \sigma_{ij} = (\sigma_i + \sigma_j)/2</math>
 and
-:<math>c_{ij}(r)= \sum_{n=1} \frac{K_{ij}^{(n)}}{r}e^{-z_nr} ~~~~~~ \sigma_{ij} < r</math>
+:<math>c_{ij}(r)= \sum_{n=1} \frac{K_{ij}^{(n)}}{r}e^{-z_nr} ~ ~ ~ ~  ~ ~ \sigma_{ij} < r</math>
-where <math>h_{ij}(r)</math> and <math>c_{ij}(r)</math> are the total and the direct correlation functions for two spherical
+where <math>h_{ij}(r)</math> and <math>c_{ij}(r)</math> are the [[Total correlation function |total]] and the [[direct correlation function]]s for two spherical
-molecules of ''i'' and ''j'' species, <math>\sigma_i</math> is the diameter of '''i'' species of molecule.
+molecules of <math>i</math> and <math>j</math> species, <math>\sigma_i</math> is the diameter of <math>i</math> species of molecule.
-Duh and Haymet (Eq. 9 Ref. 4) write the MSA approximation as
+Duh and Haymet (Eq. 9 in <ref name="Duh and Haymet">[http://dx.doi.org/10.1063/1.470724      Der-Ming Duh and A. D. J. Haymet "Integral equation theory for uncharged liquids: The Lennard-Jones fluid and the bridge function", Journal of Chemical Physics '''103''' pp. 2625-2633 (1995)]</ref>) write the MSA approximation as
@@ Line 23: / Line 24: @@
-where <math>\Phi_1</math> and <math>\Phi_2</math> comes from the [[WCA division]] of the [[Lennard-Jones]] potential.
+where <math>\Phi_1</math> and <math>\Phi_2</math> comes from the
-By introducing the definition  (Eq. 10 Ref. 4)
+[[Weeks-Chandler-Andersen perturbation theory | Weeks-Chandler-Andersen division]]
+of the [[Lennard-Jones model | Lennard-Jones]] potential.
+By introducing the definition  (Eq. 10 in <ref name="Duh and Haymet"> </ref>)
@@ Line 30: / Line 33: @@
-one can arrive at  (Eq. 11 in Ref. 4)
+one can arrive at  (Eq. 11 in <ref name="Duh and Haymet"> </ref>)
@@ Line 38: / Line 41: @@
 The [[Percus Yevick]] approximation may be recovered from the above equation by setting <math>\Phi_2=0</math>.
+==Thermodynamic consistency==
+<ref>[http://dx.doi.org/10.1063/1.2712181 Andrés Santos "Thermodynamic consistency between the energy and virial routes in the mean spherical approximation for soft potentials" Journal of Chemical Physics '''126''' 116101 (2007)]</ref>
 ==References==
-#[http://dx.doi.org/10.1103/PhysRev.144.251  J. L. Lebowitz and J. K. Percus "Mean Spherical Model for Lattice Gases with Extended Hard Cores and Continuum Fluids", Physical Review '''144''' pp. 251 - 258 (1966)]
+<references/>
-#[http://dx.doi.org/10.1007/BF01011750 L. Blum and J. S. Høye "Solution of the Ornstein-Zernike equation with Yukawa closure for a mixture", Journal  of Statistical Physics, '''19''' pp. 317-324 (1978)]
-#[http://dx.doi.org/10.1007/BF01013935   Lesser Blum "Solution of the Ornstein-Zernike equation for a mixture of hard ions and Yukawa closure" Journal  of Statistical Physics, '''22''' pp. 661-672 (1980)]
-#[http://dx.doi.org/10.1063/1.470724      Der-Ming Duh and A. D. J. Haymet "Integral equation theory for uncharged liquids: The Lennard-Jones fluid and the bridge function", Journal of Chemical Physics '''103''' pp. 2625-2633 (1995)]
 [[Category:Integral equations]]

Mean spherical approximation: Difference between revisions

Latest revision as of 14:07, 16 February 2012

Thermodynamic consistency[edit]

References[edit]

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