Hard sphere: virial coefficients: Difference between revisions

Revision as of 12:53, 1 August 2008

The virial equation of state of the hard sphere model, in various dimensions, has long been of interest. In 3-dimensions analytical results were derived (all in 1899) for $B_{2}$ by Johannes Diderik van der Waals (Ref. 1), $B_{3}$ by Ludwig Eduard Boltzmann (Ref. 2), and $B_{4}$ by Johannis Jacobus van Laar (Ref. 3). The calculation of $B_{5}$ had to wait for the Rosenbluths (Refs. 4) in 1954. Thus far no analytical expressions for $B_{5}$ and beyond have been derived. One has:

{\frac {B_{2}}{V(\mathbb {R} ^{3})}}=4

{\frac {B_{3}}{V(\mathbb {R} ^{3})^{2}}}=10

{\frac {B_{4}}{V(\mathbb {R} ^{3})^{3}}}=

where $V(\mathbb {R} ^{3})$ is the volume of a sphere in three dimensions.

Virial / Dimension	2	3	4	5	6	7	8
$B_{3}/B_{2}^{2}$	0.782004...	0.625	0.506340...	0.414063...	0.340941...	0.282227...	0.234614...
$B_{4}/B_{2}^{3}$	0.53223180...	0.2869495...	0.15184606...	0.0759724807...	0.03336314...	0.00986494662...	-0.00255768...
$B_{5}/B_{2}^{4}$	0.33355604(1)	0.110252(1)	0.0357041(17)	0.0129551(13)	0.0075231(11)	0.0070724(10)	0.00743092(93)
$B_{6}/B_{2}^{5}$	0.1988425(42)	0.03888198(91)	0.0077359(16)	0.0009815(14)	-0.0017385(13)	-0.0035121(11)	-0.0045164(11)
$B_{7}/B_{2}^{6}$	0.1148728(43)	0.01302354(91)	0.0014303(19)	0.0004162(19)	0.0013066(18)	0.0025386(16)	0.0034149(15)
$B_{8}/B_{2}^{7}$	0.0649930(34)	0.0041832(11)	0.0002888(18)	-0.0001120(20)	-0.0008950(30)	-0.0019937(28)	-0.0028624(26)
$B_{9}/B_{2}^{8}$	0.0362193(35)	0.0013094(13)	0.0000441(22)	0.0000747(26)	0.0006673(45)	0.0016869(41)	0.0025969(38)
$B_{10}/B_{2}^{9}$	0.0199537(80)	0.0004035(15)	0.0000113(31)	-0.0000492(48)	-0.000525(16)	-0.001514(14)	-0.002511(13)

This table is taken directly from Table 1 in Ref. 6.

References

@@ Line 1: / Line 1: @@
 The [[virial equation of state]] of the [[hard sphere model]], in various dimensions, has long been of interest.
-In 3-dimensions analytical results were  derived (all in 1899) for <math>B_2</math> by [[Johannes Diderik van der Waals]] (Ref. 1), <math>B_3</math> by [[Ludwig Eduard Boltzmann]] (Ref. 2), and <math>B_4</math> by [[Johannis Jacobus van Laar]] (Ref. 3). The calculation of <math>B_5</math> had to wait for the Rosenbluths (Refs. 4) in 1954. Thus far no analytical expressions for <math>B_5</math> and beyond have been derived.
+In 3-dimensions analytical results were  derived (all in 1899) for <math>B_2</math> by [[Johannes Diderik van der Waals]] (Ref. 1), <math>B_3</math> by [[Ludwig Eduard Boltzmann]] (Ref. 2), and <math>B_4</math> by [[Johannis Jacobus van Laar]] (Ref. 3). The calculation of <math>B_5</math> had to wait for the Rosenbluths (Refs. 4) in 1954. Thus far no analytical expressions for <math>B_5</math> and beyond have been derived. One has:
-One has:
+:<math>\frac{B_2}{V(\mathbb{R}^3)}=4</math>
-:<math>B_2(\mathbb{R}^3)=</math>
+:<math>\frac{B_3}{V(\mathbb{R}^3)^2}=10</math>
-:<math>B_3(\mathbb{R}^3)=</math>
-:<math>B_4(\mathbb{R}^3)=</math>
+:<math>\frac{B_4}{V(\mathbb{R}^3)^3}=</math>
+where <math>V(\mathbb{R}^3)</math> is the volume of a sphere in three dimensions.
 {| style="width:100%; height:250px; text-align:center" border="1"
@@ Line 37: / Line 35: @@
 ==See also==
 *[[Kolafa and Rottner equation of state]]
 == References ==
 #[http://www.digitallibrary.nl/proceedings/search/detail.cfm?pubid=220&view=image&startrow=1 J. D. van der Waals "Simple deduction of the characteristic equation for substances with extended and composite molecules", Koninklijke Nederlandse Akademie van Wetenschappen Amsterdam Proc. Sec. Sci. '''1''' pp. 138-143 (1899)]
-# L. Boltzmann "", Versl. Gewone Vergad. Afd. Natuurkd., K. Ned. Akad. Wet. '''7''' pp. 484 (1899)
+# L. Boltzmann "On the characteristic equation of v.d.Waals", Versl. Gewone Vergad. Afd. Natuurkd., K. Ned. Akad. Wet. '''7''' pp. 484- (1899)
-# J. J. Van Laar "", Koninklijke Nederlandse Akademie van Wetenschappen Amsterdam Proc. Sec. Sci. '''1''' pp. 273- (1899)
+#[http://www.digitallibrary.nl/proceedings/search/detail.cfm?pubid=203&view=image&startrow=1 J. J. Van Laar "Calculation of the second correction to the quantity b of the equation of condition of Van der Waals", Koninklijke Nederlandse Akademie van Wetenschappen Amsterdam Proc. Sec. Sci. '''1''' pp. 273-287 (1899)]
 #[http://dx.doi.org/10.1063/1.1740207 Marshall N. Rosenbluth and Arianna W. Rosenbluth "Further Results on Monte Carlo Equations of State", Journal of Chemical Physics '''22''' pp. 881- (1954)]
 #[http://dx.doi.org/10.1103/PhysRevE.71.021105 Stanislav Labík, Jirí Kolafa, and Anatol Malijevský, "Virial coefficients of hard spheres and hard disks up to the ninth", Physical  Review E '''71''' pp. 021105 (2005)]
@@ Line 47: / Line 44: @@
 #[http://dx.doi.org/10.1063/1.2821962 Marvin Bishop,  Nathan Clisby and Paula A. Whitlock "The equation of state of hard hyperspheres in nine dimensions for low to moderate densities",  Journal of Chemical Physics '''128''' 034506 (2008)]
 #[http://dx.doi.org/10.1063/1.2951456 René D. Rohrmann, Miguel Robles, Mariano López de Haro, and Andrés Santos "Virial series for fluids of hard hyperspheres in odd dimensions", Journal of Chemical Physics '''129''' 014510 (2008)]
+#[http://dx.doi.org/10.1063/1.2958914 André O. Guerrero and Adalberto B. M. S. Bassi "On Padé approximants to virial series",  Journal of Chemical Physics '''129''' 044509 (2008)]
 [[category:virial coefficients]]
 [[category: hard sphere]]
 {{numeric}}

Hard sphere: virial coefficients: Difference between revisions

Revision as of 12:53, 1 August 2008

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