The fifth virial coefficient of a fluid of hard spheres
1964 ◽
Vol 279
(1377)
◽
pp. 147-160
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Keyword(s):
The fifth virial coefficient of a fluid of hard spheres is a sum of 238 irreducible cluster integrals of 10 different types. The values of 5 of these types (152 integrals) are obtained analytically, the contributions of a further 4 types (85 integrals) are obtained by a combination of analytical and numerical integration, and 1 integral is calculated by an approximation. The result is E = (0·1093 ± 0·0007) b 4 , b = 2/3 πN A σ 3 , where σ is the diameter of a sphere. A combination of the values of 237 of the cluster integrals obtained in this paper with the value of one integral obtained independently by Katsura & Abe from a Monte Carlo calculation yields E = (0·1101 ± 0·0003) b 4 .
1983 ◽
Vol 79
(6)
◽
pp. 3051-3054
◽
1983 ◽
Vol 33
(2)
◽
pp. 128-134
◽
1979 ◽
Vol 30
(3)
◽
pp. 361-388
◽
2018 ◽
Vol 1
(1)
◽
pp. 30-34
◽
1981 ◽
Vol 29
(2)
◽
pp. 61-64
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Keyword(s):
Keyword(s):