CONDITIONS ON THE ONE-MATRIX FOR THREE-BODY FERMION WAVEFUNCTIONS WITH ONE- RANK EQUAL TO SIX.
Journal Article
·
· J. Phys., B (London) 5: No. 1, 7-15(Jan 1972).
- Research Organization:
- National Physical Lab., Teddington, Eng.
- NSA Number:
- NSA-26-024721
- OSTI ID:
- 4684815
- Journal Information:
- J. Phys., B (London) 5: No. 1, 7-15(Jan 1972)., Other Information: Orig. Receipt Date: 31-DEC-72; Bib. Info. Source: UK (United Kingdom (sent to DOE from))
- Country of Publication:
- United Kingdom
- Language:
- English
Similar Records
Infinite-rank separable expansion for the three-body T matrix at energies in the continuous spectrum region
ONE-DIMENSIONAL THREE-BODY SCATTERING PROBLEM USED AS A TESTING GROUND FOR THE K-MATRIX METHOD FOR SCATTERING REACTIONS OF COMPLEX SYSTEMS.
Three-body scattering and quantization conditions from -matrix unitarity
Journal Article
·
Wed Dec 01 00:00:00 EST 1982
· Phys. Rev. C; (United States)
·
OSTI ID:4684815
ONE-DIMENSIONAL THREE-BODY SCATTERING PROBLEM USED AS A TESTING GROUND FOR THE K-MATRIX METHOD FOR SCATTERING REACTIONS OF COMPLEX SYSTEMS.
Journal Article
·
Sat Jan 01 00:00:00 EST 1972
· Phys. Rev., C. 6: No. 4, 1192-1211(Oct 1972).
·
OSTI ID:4684815
Three-body scattering and quantization conditions from -matrix unitarity
Journal Article
·
Wed Aug 16 00:00:00 EDT 2023
· Physical Review. D.
·
OSTI ID:4684815
Related Subjects
N76200* -Physics (Theoretical)-Quantum Field Theories
DENSITY MATRIX
FERMIONS
MANY-BODY PROBLEM
THREE-BODY PROBLEM
WAVE FUNCTIONS
FERMIONS/wave functions for
conditions for rank-six and -seven one-body reduced density matrices derivation from three-body
(T)
FERMIONS/wave functions for
conditions for rank-eight one-body reduced density matrix derivation from four-body
(T)
DENSITY MATRIX
FERMIONS
MANY-BODY PROBLEM
THREE-BODY PROBLEM
WAVE FUNCTIONS
FERMIONS/wave functions for
conditions for rank-six and -seven one-body reduced density matrices derivation from three-body
(T)
FERMIONS/wave functions for
conditions for rank-eight one-body reduced density matrix derivation from four-body
(T)