Editing Kirkwood-Buff theory of solutions
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====Kirkwood-Buff integrals==== | |||
:<math>G_{\alpha \beta} = \int_0^\infty \left[{\mathrm g}_{\alpha \beta}^{(2)}({\mathbf r})-1\right] 4\pi r^2 ~d{\mathbf r}</math> | :<math>G_{\alpha \beta} = \int_0^\infty \left[{\mathrm g}_{\alpha \beta}^{(2)}({\mathbf r})-1\right] 4\pi r^2 ~d{\mathbf r}</math> | ||
where <math>{\mathrm g}_{\alpha \beta}({\mathbf r})</math> is the [[pair distribution function]]. | where <math>{\mathrm g}_{\alpha \beta}({\mathbf r})</math> is the [[pair distribution function]]. | ||
==References== | ==References== | ||
#[http://dx.doi.org/10.1063/1.1748352 John G. Kirkwood and Frank P. Buff "The Statistical Mechanical Theory of Solutions. I", Journal of Chemical Physics '''19''' pp. 774-777 (1951)] | |||
''' | #[http://dx.doi.org/10.1063/1.434669 A. Ben-Naim "Inversion of the Kirkwood–Buff theory of solutions: Application to the water–ethanol system", Journal of Chemical Physics '''67''' pp. 4884-4890 (1977)] | ||
#[http://dx.doi.org/10.1063/1.2938859 Arieh Ben-Naim "The Kirkwood–Buff integrals for one-component liquids" Journal of Chemical Physics '''128''' 234501 (2008)] | |||
[[category: statistical mechanics]] | [[category: statistical mechanics]] |