Canonical ensemble: Difference between revisions

Revision as of 11:48, 25 June 2007

Variables:

The classical partition function for a one-component system in a three-dimensional space, $Q_{NVT}$ , is given by:

Q_{NVT}={\frac {V^{N}}{N!\Lambda ^{3N}}}\int d(R^{*})^{3N}\exp \left[-\beta U\left(V,(R^{*})^{3N}\right)\right]

where:

$\beta ={\frac {1}{k_{B}T}}$ , with $k_{B}$ being the Boltzmann constant, and T the temperature.

$U$ is the potential energy, which depends on the coordinates of the particles (and on the interaction model)

$\left(R^{*}\right)^{3N}$ represent the 3N position coordinates of the particles (reduced with the system size): i.e. $\int d(R^{*})^{3N}=1$

@@ Line 9: / Line 9: @@
 == Partition Function ==
-''Classical'' Partition Function (one-component system) in a three-dimensional space: <math> Q_{NVT} </math>
+The ''classical'' [[partition function]] for a one-component system in a three-dimensional space, <math> Q_{NVT} </math>,
+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>
@@ Line 17: / Line 18: @@
 * <math> \Lambda </math> is the [[de Broglie thermal wavelength]] (depends on the temperature)
-* <math> \beta = \frac{1}{k_B T} </math>, with <math> k_B </math> being the [[Boltzmann constant]]
+* <math> \beta = \frac{1}{k_B T} </math>, with <math> k_B </math> being the [[Boltzmann constant]], and ''T'' the [[temperature]].
 * <math> U </math> is the potential energy, which depends on the coordinates of the particles (and on the interaction model)