Quantum-Mechanical Second Virial Coefficient at High Temperatures
- 1 September 1970
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review A
- Vol. 2 (3) , 996-1002
- https://doi.org/10.1103/physreva.2.996
Abstract
An expression is obtained for the quantum-mechanical second virial coefficient in the form of an inverse Laplace transform of the logarithmic derivative of the Jost function. This form is useful for the calculation of the direct part of the virial coefficient at high temperatures in cases where the Wigner-Kirkwood expansion breaks down. Explicit calculations are presented for hard spheres, the square-well potential, and the square-well potential with a hard core.Keywords
This publication has 16 references indexed in Scilit:
- Quantum Corrections to the Second Virial Coefficient at High TemperaturesJournal of Mathematical Physics, 1968
- Quantum-Mechanical Second Virial Coefficient of a Hard-Sphere Gas at High TemperaturesPhysical Review B, 1967
- Calculation of Exchange Second Virial Coefficient of a Hard-Sphere Gas by Path IntegralsJournal of Mathematical Physics, 1967
- Quantum-Mechanical Second Virial Coefficient of a Hard-Sphere Gas at High TemperaturePhysical Review B, 1966
- Exchange and Direct Second Virial Coefficients for Hard SpheresThe Journal of Chemical Physics, 1966
- Suppression at High Temperature of Effects Due to Statistics in the Second Virial Coefficient of a Real GasPhysical Review B, 1965
- Quantum Corrections to the Second Virial Coefficient for Helium at High TemperaturesPhysics of Fluids, 1963
- Analytic Properties of the Quantum Corrections to the Second Virial CoefficientJournal of Mathematical Physics, 1962
- Quantum Statistics of Almost Classical AssembliesPhysical Review B, 1933
- On the Quantum Correction For Thermodynamic EquilibriumPhysical Review B, 1932