A DEVELOPMENT OF THE GIBBS POTENTIAL OF A SYSTEM COMPOSED OF A LARGE NUMBER OF PARTICLES. II (in French)
The expansion of the Gibbs potential in powers of the activity is derived with the use of the second quantization, reestablishing a result of Ward and Montroll and the link with the classical Ursell Yvon Mayer expansion. Partial summation of non-interacting "loops" leads to the expansion established in a previous paper. This expansion can be cast into a form in which a "reduced potential," temperature and activity dependent, replaces the usual interaction. All contributions are then given by the (connected) "irreducible" diagrams only. (auth)
- Research Organization:
- Commissariat a l'Energie Atomique, Paris
- NSA Number:
- NSA-13-010293
- OSTI ID:
- 4271072
- Journal Information:
- Nuclear Phys., Journal Name: Nuclear Phys. Vol. Vol: 10
- Country of Publication:
- Country unknown/Code not available
- Language:
- French
Similar Records
A DEVELOPMENT OF THE GIBBS POTENTIAL OF A QUANTIC SYSTEM COMPOSED OF A LARGE NUMBER OF PARTICLES
Integral equations and inequalities in the theory of fluids
THE CONNECTED DIAGRAM EXPANSION OF THE GRAND PARTITION FUNCTION AND THE STATISTICAL MECHANICS OF THE ELECTRON GAS (thesis)
Journal Article
·
Tue Jul 01 00:00:00 EDT 1958
· Nuclear Phys.
·
OSTI ID:4318777
Integral equations and inequalities in the theory of fluids
Journal Article
·
Sat Nov 30 23:00:00 EST 1963
· Journal of Mathematical Physics (New York) (U.S.)
·
OSTI ID:4148648
THE CONNECTED DIAGRAM EXPANSION OF THE GRAND PARTITION FUNCTION AND THE STATISTICAL MECHANICS OF THE ELECTRON GAS (thesis)
Technical Report
·
Sun May 01 00:00:00 EDT 1960
·
OSTI ID:4076636