Canonical ensemble: Difference between revisions
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Carl McBride (talk | contribs) m (Slight tidy.) |
Carl McBride (talk | contribs) m (→Partition Function: Added classical criteria) |
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is given by: | is given by: | ||
:<math> Q_{NVT} = \frac{V^N}{N! \Lambda^{3N} } \int d (R^*)^{3N} \exp \left[ - \beta U \left( V, (R^*)^{3N} \right) \right] </math> | :<math> Q_{NVT} = \frac{V^N}{N! \Lambda^{3N} } \int d (R^*)^{3N} \exp \left[ - \beta U \left( V, (R^*)^{3N} \right) \right] ~~~~~~~~~~ \left( \frac{V}{N\Lambda^3} \gg 1 \right) </math> | ||
where: | where: | ||
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* <math> \left( R^*\right)^{3N} </math> represent the 3N position coordinates of the particles (reduced with the system size): i.e. <math> \int d (R^*)^{3N} = 1 </math> | * <math> \left( R^*\right)^{3N} </math> represent the 3N position coordinates of the particles (reduced with the system size): i.e. <math> \int d (R^*)^{3N} = 1 </math> | ||
==References== | |||
<references/> | |||
[[Category:Statistical mechanics]] | [[Category:Statistical mechanics]] | ||
Revision as of 12:49, 31 August 2011
Variables:
- Number of Particles,
- Volume,
Partition Function
The classical partition function for a one-component system in a three-dimensional space, , is given by:
![{\displaystyle Q_{NVT}={\frac {V^{N}}{N!\Lambda ^{3N}}}\int d(R^{*})^{3N}\exp \left[-\beta U\left(V,(R^{*})^{3N}\right)\right]~~~~~~~~~~\left({\frac {V}{N\Lambda ^{3}}}\gg 1\right)}](https://wikimedia.org/api/rest_v1/media/math/render/svg/f7387ebcf5770cb785abc61d90afa3c08cd79da9)
where:
- is the de Broglie thermal wavelength (depends on the temperature)
- , with being the Boltzmann constant, and T the temperature.
- is the potential energy, which depends on the coordinates of the particles (and on the interaction model)
- represent the 3N position coordinates of the particles (reduced with the system size): i.e.
