Impact Parameter Representation of Resonance Correlation : Hadron Reactions and Urbaryon Rearrangement. II
スポンサーリンク
概要
- 論文の詳細を見る
The impact parameter (b) representation of the H-type (s-t dual) amplitude is discussed through a sum of direct channel resonances (Breit-Wigner form) by imposing generalized Ogawa's rule of a constant impact parameter b_0(≃1×10^<-13>cm). This amplitude is shown to have a Breit-Wigner form in the b representation, 1/(b^2-b_0^2-iε´). The H-type amplitude f^H_<Δλ>(s, t) is found to be proportional to iH^<(1)>_<Δλ> (b_0√<-t>), where H^<(1)>_<Δλ> is the first kind Hankel function and Δλ denotes the s-channel helicity change. The Hankel function H^<(1)>_<Δλ> has definite real and imaginary parts, just corresponding to "rotation phase". A physical interpretation of Re f^H from s-channel picture is given. The crossed channel amplitude f^X_<Δλ>(s, t) of the X-type (t-u dual) is discussed in connection with the form of f^H_<Δλ>(s, t).
- 理論物理学刊行会の論文
- 1972-06-25
著者
-
Otsuki Shoichiro
Department Of Physics Kyoto University
-
Imachi Masahiro
Department Of Physics Kyushu University
-
Toyoda Fumihiko
Department Of Electrical And Communication Engineering Kinki University Of School Of Humanity-orient
-
Toyoda Fumihiko
The Second Department Kinki University
-
Ghoroku Kazuo
Department Of Phusics Kyushu University
-
OTSUKI Shoichiro
Department of Liberal Arts, Kinki University
-
Ghoroku Kazuo
Department of Physics, Fukuoka Institute of Technology
関連論文
- Nuclear Interaction of Core Region
- On p-He^4 Effective Potential and Nuclear Forces
- Analysis of Proton-Proton Scattering at High Energy
- Explicit CP Breaking and Electroweak Baryogenesis : Particles and fields
- Numerical Approach to CP-Violating Dirac Equation
- CP-Violating Profile of the Electroweak Bubble Wall : Particles and Fields
- Chiral Charge Flux and Electroweak Baryogenesis
- Baryon Number Violating Collision in Terms of Bounce Configuration
- Scattering with Baryon Number Violation : The Case of Higgs Particle Production : Particles and Fields
- Formulation of Baryon Number Violating Collisions : The Case of O(3) Nonlinear Sigma Model : Particles and Fields
- Sphaleron Transition of Reduced O(3) Nonlinear Sigma Model : Particles and Feilds
- Sphalerons of O(3) Nonlinear Sigma Model on a Circle : Particles and Fields
- The Sign Problem and MEM in Lattice Field Theory with the θ Term(Particles and Fields)
- Vortex String Picture and Large p_T Reactions
- The Lowest Subprocess Model of Large p_T Hadron Productions
- Unique Trajectory Method in Migdal Renormalization Group Approach and SU(2) Lattice Gauge Theory
- Unique Trajectory Method in Migdal Renormalization Group Approach and Crossover Phenomena
- The Migdal Recursion Equation as a Probe for Crossover Points : Lattice Gauge Theory on Discrete Groups
- The θ-Term, CP^ Model and the Inversion Approach in the Imaginary θ Method(Particles and Fields)
- Maximum Entropy Method Approach to the θ Term
- CP^ Models with a θ Term and Fixed Point Action
- Two-Dimensional CP^2 Model with θ-Term and Topological Charge Distributions
- Renormalization Group Analysis of U(2) Gauge Theory with θ-Term in 2 Dimensions : Particles and Fields
- Character Expansion, Zeroes of Partition Function and θ-Term in U(1) Gauge Theory : Particles and Fields
- Real Space Renormalization Group Analysis of U(l)-Gauge Theory with θ Term in 2 Dimensions
- SU(3) Lattice Gauge Theory in Migdal Renormalization Group Approach
- Complex Wave Function, Chiral Spin Order Parameter and Phase Problem : Condensed Matter and Statistical Physics
- Large p_T Hadron Productions and String Junction Model
- Z(N) String Junction Model and Spectrum Energy Density of String
- Z(N) Strings and Hadron Structure
- Regge Pole Exchange and the Oscillatory Behavior in K^+P Scattering
- On the Degeneracy of Regge Trajectories Imposed by the Veneziano-Type Amplitude
- Hair Pin Line Rule and Baryonium Decay
- String-Junction Model and Width of Baryonium
- Remarks on Shape of Repulsive Core of Nuclear Forces
- Two-Nucleon Problem with Pion Theoretical Potential, lV : Photodisintegration of Deuteron at 20 Mev
- Two-Nucleon Problem with Pion Theoretical Potential, III : p-p Scattering at 18.2 Mev
- Two-Nucleon Problem with Pion Theorelical Potential, II : Singlet Even State
- Two-Nucleon Problem with Pion Theoretical Potential, I : Determination of Coupling Constant and Deuteron Problem
- Determination of the Pion Coupling Constant in Nuclear Forces
- Part II Verification of Pion Theory of Nuclear Forces
- Part I Development of Pion Theory of Nuclear Forces
- Meson-theoretical Potentials in N^
- The Properties of the Meson Theoretical Potentials in Li^6
- A Possible Origin of Repulsive Core in Nuclear Forces
- On the Polarization in Elastic Pion-Nucleon Scattering in a Few GeV Region
- Resonance Correlation and Zeros of Scattering Amplitudes
- U(6) Baryon Spectrum and U(6) Breaking
- Topological Charge Distribution and CP Model with θTerm
- U(1) Lattice Gauge Theory, Four Fermi Coupling and Migdal-Kadanoff Renormalization Group : Particles and Fields
- Finite Temperature SU(2) Lattice Gauge Theory in Migdal Renormalization Group Approach : Particles and Fields
- On Classical Configurations of SU(2) Gauge-Higgs System : Particles and Fields
- Solitons with the Hopf Index versus Skyrmions in SU(2) Nonlinear Sigma Model : Progress Letters
- A Soliton Solution with Baryon Number B=0 and Skyrmion : Progress Letters
- Constituent Rearrangement Model and Hadron Reactions
- Hadronic Reactions and the Rearrangement of Sakatons
- Rearrangement of Sakatons and High Energy Two-Body Scattering
- High Energy Inelastic Scattering by Rearrangemement of Sakatons
- Evidence for Existence of a Repulsive Core in the Λ-N Interaction
- On Pion-Nucleon Scattering at High Energies
- Report on Symposium on Elementary Particles
- An Attempt at Systematizing Meson-Baryon Resonances
- High Energy Forward Scattering and the Urbaryon Model
- Meson Theoretical Potentials in Triplet Odd State
- A Classification of Nucleon Resonances through Pattern Recognition
- Mass and Selection Rule of Baryonium
- The 1/N Expansion and Quark-Junction Systems
- On the Role of String-Junction in Hadron Reactions
- Hadron Structure with String-Junction and Large Momentum Transfer Phenomena
- Structure and Interaction of Hadrons with Orientable String
- Orientable Hadron Structure
- Meson-Baryon Backward Scattering and Resonance Correlation
- Colour Constraint on Urbaryon Rearrangement Diagram
- A New Interaction Length and Independent Urbaryon Model
- One-Dimensional Structure of Hadrons
- Triality Constraint on Urbaryon Rearrangement Diagram and Urbaryons in Correlated Mode
- Systematic Structure in Hadronic Two-Body Scattering and Resonance Correlation : Hadron Reactions and Urbaryon Rearrangement. III
- Impact Parameter Representation of Resonance Correlation : Hadron Reactions and Urbaryon Rearrangement. II
- Proton-Proton Scattering and Urbaryon Rearrangement
- Hadron Reactions and Urbaryon Rearrangement. I : Effective Resonance Structure
- Dip-Bump Structure of Cross Section and Urbaryon Rearrangement. II
- Exotic Resonances, Urbaryon Rearrangement and Hadron Structure
- Rearrangement of Urbaryon Lines and Forces between Composite Hadrons
- The Backward Peak in Pion-Nucleon Scattering and Composite Structure of the Pion
- Chapter 7 On Repulsive Core of Nuclear Forces
- Meson Structure and Spin-Orbit Splitting of Meson Mass
- Dip-Bump Structure of Cross Section and Urbaryon Rearrangement
- Structure of Massless Composite Fermions and Large N Limit : Particles and Fields
- Cluster Model of Hadrons
- Cluster Model of Hadrons. II : Mass Spectrum and Decay of Mesons
- Quarks as Quasi-Particle and the Cluster Model of Hadrons
- Breaking of Line Reverse Relation and Exotics
- On Scaling of Interaction Radius
- On the Quadratic Spin-Orbit Force in p-p Scattering
- Scaling of Interaction Radius and Polarization
- On the Meson-Theoretical Potentials
- Proton-Proton Scattering at 52 MeV
- Large N Limit of Composite Quarks and Leptons
- How Can Several Baryoniums Be Narrow? : Mass Formula and Selection Rule of Unconventional Hadrons
- Extension of the OZI and FWR Rules