Elementary Particle Theory: Relativistic Groups and Analyticity. Proccedings of the Eighth Nobel Symposium Held May 19-25, 1968 at Aspenäsgarden, Lerum, in the County of Älvsborg, Sweden |
Contents
Sponsors Nobel Foundation Symposium Committee Organizers of | 9 |
S FUBINI | 10 |
TOLLER | 15 |
Copyright | |
22 other sections not shown
Common terms and phrases
algebra analytic properties angles behaviour Bethe-Salpeter bootstrap boson Cabibbo Clebsch-Gordan coefficients commutation complex components consider constraints contribution corresponding coupling scheme covariance defined Dirac Domokos electromagnetic energy expansion Feynman field theory finite form factors formula Fronsdal Gell-Mann hadrons hermitian infinite infinite-component fields internal motion invariant irreducible representations k₁ k₂ kinematical l₁ L¹n Lagrangian little group Lorentz group Lorentz transformation m₁ Majorana mass spectrum matrix elements meson momentum n₁ Nambu obtained octet operator P₁ parameters parity partial wave particles Phys physical Poincaré group possible problem quantum numbers reduced propagator Regge poles Regge trajectories relations relativistic residues S-matrix S₁ satisfy scalar scattering amplitude singularities space space-like solutions spacelike spin spinor Streater strong interactions subgroup symmetry tensor theorem tion Toller unitary representation values vanish variables vector vertex vertex functions wave equation wave function weak interactions zero