Uniqueness of the-body Lippmann-Schwinger-Glöckle-Tobocman equations
- 1 April 1979
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review C
- Vol. 19 (4) , 1168-1173
- https://doi.org/10.1103/physrevc.19.1168
Abstract
It is proved that the Lippmann-Schwinger-Glöckle-Tobocman equations provide a unique solution to the -body scattering problem and that they represent the minimum number of Lippman-Schwinger-type equations necessary and sufficient to ensure uniqueness.
Keywords
This publication has 8 references indexed in Scilit:
- Combinatorial problems in N-particle scatteringPhysics Letters B, 1977
- Two-cluster couplings and the uniqueness of many-particle scattering integral equationsPhysical Review C, 1977
- Arrangement-channel quantum mechanics: A general time-dependent formalism for multiparticle scatteringPhysical Review D, 1977
- Comments on some problems in many-body scattering theoryPhysics Letters B, 1975
- New coupled-reaction-channels formalism for nuclear reactionsPhysical Review C, 1975
- Equivalence between Faddeev-like equations and a set of Lippmann-Schwinger equations for three-body transitions operatorsLettere al Nuovo Cimento (1971-1985), 1974
- A set of Lippmann-Schwinger equationsNuclear Physics A, 1973
- A new approach to the three-body problemNuclear Physics A, 1970