Three-particle physics and dispersion relation theory / / A.V. Anisovich, V.V. Anisovich, M.A. Matveev, V.A. Nikonov, Petersburg Nuclear Physics Institute, Russian Academy of Science, Russia, J. Nyiri, Institute for Particle and Nuclear Physics, Wigner RCP, Hungarian Academy of Sciences, Hungary, A.V. Sarantsev, Petersburg Nuclear Physics Institute, Russian Academy of Science, Russia |
Autore | Anisovich A. V. |
Pubbl/distr/stampa | [Hackensack] New Jersey, : World Scientific, c2013 |
Descrizione fisica | 1 online resource (xvi, 325 pages) : illustrations |
Disciplina | 539.725 |
Collana | Gale eBooks. |
Soggetto topico |
Particles (Nuclear physics)
Dispersion relations |
ISBN |
1-299-46283-9
981-4478-81-4 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
Preface; References; Contents; 8.4.5 Overlapping of baryon resonances; 1. Introduction; 1.1 Non-relativistic three-nucleon and three-quark systems; 1.1.1 Description of three-nucleon systems; 1.1.2 Three-quark systems; 1.2 Dispersion relation technique for three particle systems; 1.2.1 Elements of the dispersion relation technique for two-particle systems; 1.2.2 Interconnection of three particle decay amplitudes and two-particle scattering ones in hadron physics; 1.2.3 Quark-gluon language for processes in regions I, III and IV; 1.2.4 Spectral integral equation for three particles
1.2.5 Isobar models1.2.5.1 Amplitude poles; 1.2.5.2 D-matrix propagator for an unstable particle and the K matrix amplitude; 1.2.5.3 K-matrix and D-matrix masses and the amplitude pole; 1.2.5.4 Accumulation of widths of overlapping resonances; 1.2.5.5 Loop diagrams with resonances in the intermediate states; 1.2.5.6 Isobar model for high energy peripheral production processes; 1.2.6 Quark-diquark model for baryons and group theory approach; 1.2.6.1 Quark-diquark model for baryons; References; 2. Elements of Dispersion Relation Technique for Two-Body Scattering Reactions 2.2.2 Scattering amplitude and energy non-conservation in the spectral integral representation2.2.3 Composite system wave function and its form factors; 2.2.4 Scattering amplitude with multivertex representation of separable interaction; 2.2.4.1 Generalization for an arbitrary angular momentum state, L = J; 2.3 Instantaneous interaction and spectral integral equation for two-body systems; 2.3.1 Instantaneous interaction; 2.3.1.1 Coordinate representation; 2.3.1.2 Instantaneous interaction - transformation into a set of separable vertices |
Record Nr. | UNINA-9910779565403321 |
Anisovich A. V. | ||
[Hackensack] New Jersey, : World Scientific, c2013 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. Federico II | ||
|
Three-particle physics and dispersion relation theory / / A.V. Anisovich, V.V. Anisovich, M.A. Matveev, V.A. Nikonov, Petersburg Nuclear Physics Institute, Russian Academy of Science, Russia, J. Nyiri, Institute for Particle and Nuclear Physics, Wigner RCP, Hungarian Academy of Sciences, Hungary, A.V. Sarantsev, Petersburg Nuclear Physics Institute, Russian Academy of Science, Russia |
Autore | Anisovich A. V. |
Pubbl/distr/stampa | [Hackensack] New Jersey, : World Scientific, c2013 |
Descrizione fisica | 1 online resource (xvi, 325 pages) : illustrations |
Disciplina | 539.725 |
Collana | Gale eBooks. |
Soggetto topico |
Particles (Nuclear physics)
Dispersion relations |
ISBN |
1-299-46283-9
981-4478-81-4 |
Formato | Materiale a stampa |
Livello bibliografico | Monografia |
Lingua di pubblicazione | eng |
Nota di contenuto |
Preface; References; Contents; 8.4.5 Overlapping of baryon resonances; 1. Introduction; 1.1 Non-relativistic three-nucleon and three-quark systems; 1.1.1 Description of three-nucleon systems; 1.1.2 Three-quark systems; 1.2 Dispersion relation technique for three particle systems; 1.2.1 Elements of the dispersion relation technique for two-particle systems; 1.2.2 Interconnection of three particle decay amplitudes and two-particle scattering ones in hadron physics; 1.2.3 Quark-gluon language for processes in regions I, III and IV; 1.2.4 Spectral integral equation for three particles
1.2.5 Isobar models1.2.5.1 Amplitude poles; 1.2.5.2 D-matrix propagator for an unstable particle and the K matrix amplitude; 1.2.5.3 K-matrix and D-matrix masses and the amplitude pole; 1.2.5.4 Accumulation of widths of overlapping resonances; 1.2.5.5 Loop diagrams with resonances in the intermediate states; 1.2.5.6 Isobar model for high energy peripheral production processes; 1.2.6 Quark-diquark model for baryons and group theory approach; 1.2.6.1 Quark-diquark model for baryons; References; 2. Elements of Dispersion Relation Technique for Two-Body Scattering Reactions 2.2.2 Scattering amplitude and energy non-conservation in the spectral integral representation2.2.3 Composite system wave function and its form factors; 2.2.4 Scattering amplitude with multivertex representation of separable interaction; 2.2.4.1 Generalization for an arbitrary angular momentum state, L = J; 2.3 Instantaneous interaction and spectral integral equation for two-body systems; 2.3.1 Instantaneous interaction; 2.3.1.1 Coordinate representation; 2.3.1.2 Instantaneous interaction - transformation into a set of separable vertices |
Record Nr. | UNINA-9910821333003321 |
Anisovich A. V. | ||
[Hackensack] New Jersey, : World Scientific, c2013 | ||
Materiale a stampa | ||
Lo trovi qui: Univ. Federico II | ||
|