Carnahan-Starling equation of state: Difference between revisions

The Carnahan-Starling equation of state is an approximate (but quite good) equation of state for the fluid phase of the hard sphere model in three dimensions. It is given by (Ref ^[1] Eqn. 10).

${\displaystyle Z={\frac {pV}{Nk_{B}T}}={\frac {1+\eta +\eta ^{2}-\eta ^{3}}{(1-\eta )^{3}}}.}$

where:

• ${\displaystyle Z}$ is the compressibility factor
• ${\displaystyle p}$ is the pressure
• ${\displaystyle V}$ is the volume
• ${\displaystyle N}$ is the number of particles
• ${\displaystyle k_{B}}$ is the Boltzmann constant
• ${\displaystyle T}$ is the absolute temperature
• ${\displaystyle \eta }$ is the packing fraction:

${\displaystyle \eta ={\frac {\pi }{6}}{\frac {N\sigma ^{3}}{V}}}$

• ${\displaystyle \sigma }$ is the hard sphere diameter.

The Carnahan-Starling equation of state is not applicable for packing fractions greater than 0.55 ^[2].

Virial expansion[edit]

It is interesting to compare the virial coefficients of the Carnahan-Starling equation of state (Eq. 7 of ^[1]) with the hard sphere virial coefficients in three dimensions (exact up to ${\displaystyle B_{4}}$, and those of Clisby and McCoy ^[3]):

${\displaystyle n}$	Clisby and McCoy	${\displaystyle B_{n}=n^{2}+n-2}$
2	4	4
3	10	10
4	18.3647684	18
5	28.22451(26)	28
6	39.81515(93)	40
7	53.3444(37)	54
8	68.538(18)	70
9	85.813(85)	88
10	105.78(39)	108

Thermodynamic expressions[edit]

From the Carnahan-Starling equation for the fluid phase the following thermodynamic expressions can be derived (Ref ^[4] Eqs. 2.6, 2.7 and 2.8)

Pressure (compressibility):

${\displaystyle {\frac {p^{CS}V}{Nk_{B}T}}={\frac {1+\eta +\eta ^{2}-\eta ^{3}}{(1-\eta )^{3}}}}$

Configurational chemical potential:

${\displaystyle {\frac {{\overline {\mu }}^{CS}}{k_{B}T}}={\frac {8\eta -9\eta ^{2}+3\eta ^{3}}{(1-\eta )^{3}}}}$

Isothermal compressibility:

${\displaystyle \chi _{T}-1={\frac {1}{k_{B}T}}\left.{\frac {\partial P^{CS}}{\partial \rho }}\right\vert _{T}-1={\frac {8\eta -2\eta ^{2}}{(1-\eta )^{4}}}}$

where ${\displaystyle \eta }$ is the packing fraction.

Configurational Helmholtz energy function:

${\displaystyle {\frac {A_{ex}^{CS}}{Nk_{B}T}}={\frac {4\eta -3\eta ^{2}}{(1-\eta )^{2}}}}$

The 'Percus-Yevick' derivation[edit]

It is interesting to note (Ref ^[5] Eq. 6) that one can arrive at the Carnahan-Starling equation of state by adding two thirds of the exact solution of the Percus Yevick integral equation for hard spheres via the compressibility route, to one third via the pressure route, i.e.

${\displaystyle Z={\frac {pV}{Nk_{B}T}}={\frac {2}{3}}\left[{\frac {(1+\eta +\eta ^{2})}{(1-\eta )^{3}}}\right]+{\frac {1}{3}}\left[{\frac {(1+2\eta +3\eta ^{2})}{(1-\eta )^{2}}}\right]={\frac {1+\eta +\eta ^{2}-\eta ^{3}}{(1-\eta )^{3}}}}$

The reason for this seems to be a slight mystery (see discussion in Ref. ^[6] ).

Kolafa correction[edit]

Jiri Kolafa produced a slight correction to the C-S EOS which results in improved accuracy ^[7]:

${\displaystyle Z={\frac {1+\eta +\eta ^{2}-{\frac {2}{3}}(1+\eta )\eta ^{3}}{(1-\eta )^{3}}}.}$

Liu correction[edit]

Hongqin Liu proposed a correction to the C-S EOS which improved accuracy by almost two order of magnitude ^[8]:

${\displaystyle Z={\frac {1+\eta +\eta ^{2}-{\frac {8}{13}}\eta ^{3}-\eta ^{4}+{\frac {1}{2}}\eta ^{5}}{(1-\eta )^{3}}}.}$

See also[edit]

• Equations of state for hard spheres
• Kolafa-Labík-Malijevský equation of state

References[edit]