Song and Mason equation of state for hard convex bodies: Difference between revisions
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is given by (Eq. 25 of Ref. 1): | is given by (Eq. 25 of Ref. 1): | ||
:<math>\frac{p}{\rho kT} \approx 1 + \frac{\eta}{(1-\eta)^3}\left((1+3\alpha)-(2+3\alpha-3\alpha^2)\eta + \left(1+\left[\frac{B_4}{v_0^3}_{HS} -12\right] \alpha -7\alpha^2\right)\eta^2\right)</math> | :<math>\frac{p}{\rho kT} \approx 1 + \frac{\eta}{(1-\eta)^3}\left((1+3\alpha)-(2+3\alpha-3\alpha^2)\eta + \left(1+\left[\left(\frac{B_4}{v_0^3}\right)_{HS} -12\right] \alpha -7\alpha^2\right)\eta^2\right)</math> | ||
where <math>\eta</math> is the packing fraction, given by <math>\eta=\rho v_0</math>, and | where <math>\eta</math> is the packing fraction, given by <math>\eta=\rho v_0</math>, and | ||
:<math>\alpha= \frac{RS}{3V}</math> | :<math>\alpha= \frac{RS}{3V}</math> | ||
where <math>V</math> is | where <math>V</math> is | ||
the volume, <math>S</math>, the surface area, and <math>R</math> the mean radius of curvature. | the volume, <math>S</math>, the surface area, and <math>R</math> the mean radius of curvature. | ||
<math>\left(\frac{B_4}{v_0^3}\right)_{HS}</math> is the fourth [[Hard sphere: virial coefficients| virial coefficient]] for the [[hard sphere model]]. | |||
==References== | ==References== | ||
#[http://dx.doi.org/10.1103/PhysRevA.41.3121 Yuhua Song and E. A. Mason "Equation of state for a fluid of hard convex bodies in any number of dimensions", Physical Review A '''41''' pp. 3121 - 3124 (1990)] | #[http://dx.doi.org/10.1103/PhysRevA.41.3121 Yuhua Song and E. A. Mason "Equation of state for a fluid of hard convex bodies in any number of dimensions", Physical Review A '''41''' pp. 3121 - 3124 (1990)] | ||
[[category: equations of state]] | [[category: equations of state]] | ||
Revision as of 14:47, 3 August 2007
The Song and Mason equation of state (EOS) for hard convex bodies is given by (Eq. 25 of Ref. 1):
![{\displaystyle {\frac {p}{\rho kT}}\approx 1+{\frac {\eta }{(1-\eta )^{3}}}\left((1+3\alpha )-(2+3\alpha -3\alpha ^{2})\eta +\left(1+\left[\left({\frac {B_{4}}{v_{0}^{3}}}\right)_{HS}-12\right]\alpha -7\alpha ^{2}\right)\eta ^{2}\right)}](https://wikimedia.org/api/rest_v1/media/math/render/svg/27a4ea60fb2bc1f7e99792a6c9ed3dcad75cc787)
where is the packing fraction, given by , and
where is the volume, , the surface area, and the mean radius of curvature. is the fourth virial coefficient for the hard sphere model.
