MOZ: Difference between revisions

Latest revision as of 17:17, 10 July 2007

The Ornstein-Zernike equations for mixtures (MOZ) of monomers with coincident oligomers (coincident dimers, trimers,...,n-mers).

h_{an}({\mathbf {r} })-c_{an}({\mathbf {r} })=\int h_{aa}({\mathbf {r} '})~\rho _{a}~c_{an}(|{\mathbf {r} }-{\mathbf {r} '}|){\rm {d}}{\mathbf {r} '}~~~~~n=a,2,3,...

Since all oligomers are at infinite dilution, the OZ's for all $n>1$ are decoupled. The first member is for the bulk monomer fluid a (with size $\sigma$ and energy $\epsilon$ )

h_{aa}({\mathbf {r} })-c_{aa}({\mathbf {r} })=\int h_{aa}({\mathbf {r} '})~\rho _{a}~c_{aa}(|{\mathbf {r} }-{\mathbf {r} '}|){\rm {d}}{\mathbf {r} '}

For a coincident dimer ( $n=2$ ) of size $\sigma$ and energy $2\epsilon$ at infinite dilution in the bulk a-monomers:

h_{a2}({\mathbf {r} })-c_{a2}({\mathbf {r} })=\int h_{aa}({\mathbf {r} '})~\rho _{a}~c_{a2}(|{\mathbf {r} }-{\mathbf {r} '}|){\rm {d}}{\mathbf {r} '}

For a coincident trimer ( $n=3$ ) of size $\sigma$ and energy $3\epsilon$ at infinite dilution in the bulk a-monomers:

h_{a3}({\mathbf {r} })-c_{a3}({\mathbf {r} })=\int h_{aa}({\mathbf {r} '})~\rho _{a}~c_{a3}(|{\mathbf {r} }-{\mathbf {r} '}|){\rm {d}}{\mathbf {r} '}

References[edit]

@@ Line 1: / Line 1: @@
-The [[Ornstein-Zernike relation | Ornstein-Zernike]]  equations for mixtures of monomers with coincident oligomers
+The [[Ornstein-Zernike relation | Ornstein-Zernike]]  equations for mixtures (MOZ) of monomers with coincident oligomers
 (coincident dimers, trimers,...,''n''-mers).
-:<math>h_{an}(r) - c_{an}(r) =  \int  h_{aa} (r')~\rho_a ~c_{an}(|r - r'|) dr'~~~~~n=a,2,3,...</math>
+:<math>h_{an}({\mathbf r}) - c_{an}({\mathbf r}) =  \int  h_{aa} ({\mathbf r'})~\rho_a ~c_{an}(|{\mathbf r} - {\mathbf r'}|) {\rm d}{\mathbf r'}~~~~~n=a,2,3,...</math>
-Since all oligomers are at infinite dilution, the OZ's for all $n>1$ are decoupled. The first member is for the bulk monomer fluid ''a'' (with size <math>\sigma</math> and
+Since all oligomers are at infinite dilution, the OZ's for all <math>n>1</math> are decoupled. The first member is for the bulk monomer fluid ''a'' (with size <math>\sigma</math> and
 energy <math>\epsilon</math>)
-:<math>h_{aa}(r) - c_{aa}(r) =  \int  h_{aa} (r')~\rho_a ~c_{aa}(|r - r'|) dr'</math>
+:<math>h_{aa}({\mathbf r}) - c_{aa}({\mathbf r}) =  \int  h_{aa} ({\mathbf r'})~\rho_a ~c_{aa}(|{\mathbf r} - {\mathbf r'}|) {\rm d}{\mathbf r'}</math>
 For a coincident dimer (<math>n=2</math>) of size <math>\sigma</math> and
 energy <math>2\epsilon</math> at infinite dilution in the bulk ''a''-monomers:
-:<math>h_{a2}(r) - c_{a2}(r) =  \int  h_{aa} (r')~\rho_a ~c_{a2}(|r - r'|) dr'</math>
+:<math>h_{a2}({\mathbf r}) - c_{a2}({\mathbf r}) =  \int  h_{aa} ({\mathbf r'})~\rho_a ~c_{a2}(|{\mathbf r} - {\mathbf r'}|) {\rm d}{\mathbf r'}</math>
 For a coincident trimer (<math>n=3</math>) of size <math>\sigma</math> and
 energy <math>3\epsilon</math> at infinite dilution in the bulk ''a''-monomers:
-:<math>h_{a3}(r) - c_{a3}(r) =  \int  h_{aa} (r')~\rho_a ~c_{a3}(|r - r'|) dr'</math>
+:<math>h_{a3}({\mathbf r}) - c_{a3}({\mathbf r}) =  \int  h_{aa} ({\mathbf r'})~\rho_a ~c_{a3}(|{\mathbf r} - {\mathbf r'}|) {\rm d}{\mathbf r'}</math>
+==References==
+[[Category: Integral equations]]

MOZ: Difference between revisions

Latest revision as of 17:17, 10 July 2007

References[edit]

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