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References
See e.g. QM I
Whittaker, Watson, A Modern Course of Analysis, Cambridge at the Clarendon Press; V. I. Smirnow, A Course of Higher Mathematics, Pergamon Press, Oxford 1964: Vol. III, Part 2, p. 290.
See e.g. A. Sommerfeld, Thermodynamics and Statistical Physics, Academic Press, NY 1950 \( Z_{rot} = \frac{{4\pi I^2 }} {{(2\pi \hbar )^2 }}\int {d\omega _1 } \int {d\omega _2 } e^{ - \frac{{\beta I}} {2}(\omega _1^2 + \omega _2^2 )} = \frac{{2IkT}} {{\hbar ^2 }}.\)
QM I, page 187
T. O. Hirschfelder, Ch. F. Curtiss and R. B. Bird, Molecular Theory of Gases and Liquids, John Wiley and Sons, Inc., New York 1954
M. Kac, G. E. Uhlenbeck and P. C. Hemmer, J. Math. Phys. 4, 216 (1963)
N. G. van Kampen, Phys. Rev. 135, A362 (1964)
G. J. Su, Ind. Engng. Chem. analyt. Edn. 38, 803 (1946)
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Schwabl, F. (2006). Real Gases, Liquids, and Solutions. In: Statistical Mechanics. Advanced Texts in Physics. Springer, Berlin, Heidelberg. https://doi.org/10.1007/3-540-36217-7_5
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