Scattering Lengths for Complex Angular Momenta
スポンサーリンク
概要
- 論文の詳細を見る
Some general properties of the scattering length as a function of complex angular momenta are studied. A product representation is introduced for it under the assumption that it is a meromorphic function of order less than 2. Possible existence of a new vacuum trajectory is discussed in connection with the I=0 π-π S-wave scattering length.
- 理論物理学刊行会の論文
- 1968-01-25
著者
-
Ida Masakuni
Institute Of Physics College Of General Education University Of Tokyo
-
Yabuki Haruichi
Institute Of Physics College Of General Education University Of Tokyo
関連論文
- Many-Pole Amplitudes and Elementarity. I : One Elementary and Some Composite Particles Case
- Factorization and Duality of Multiloop Diagrams
- N/D Methods for Multichannel Scattering
- Behavior of Elastic Scattering Amplitudes at High Energies
- Scattering Lengths for Complex Angular Momenta
- A General Effective-Range Formula and the Compositeness of the Deuteron
- Asymptotic Behavior of Infinitely Rising Baryon Trajectories
- Asymptotic Behavior of Infinitely Rising Meson Trajectories
- Baryon Resonances in a Quark Model
- Properties of Noncomposite Particles
- An Attempt at a General Theory of the Bethe-Salpeter Equation
- High-Energy Elastic Scattering at Small Momentum Transfers
- On the Mandelstam Symmetry in the S-Matrix Theory
- Some Mathematical Aspects of Multiple Poles in the Off-Shell Scattering Amplitude
- Low Energy Behavior of the π-π Phase Shifts
- Low-Energy Behaviors of the T=0, S-Wave, π-π Scattering Phase Shift and a Possible Scalar Meson Nonet
- Compositeness Conditions and the Indefinite Nature of the Self-Mass
- Angular Distribution Dependence on Transverse Momentum in High Energy Collisions
- Multichannel Scattering and Equivalence between Four-Fermion and Yukawa Coupling
- Many-Pole Amplitudes and Elementarity. II : The Case of Two Non-Composite Particles
- A Remark on the Condition, Z_3=0 : Case of Many Particles with Identical Quantum Numbers