Group Theory and Its Applications in Physics, 1980: Latin American School of Physics, Mexico CityThomas H. Seligman |
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action Bargmann basis functions canonical transformation chain coefficients coll collective commutation consider coordinates coset space coupling constant decomposition defined denote diagonal dimensional eigenvalue electromagnetic equation example expression fermion gauge theory gauge-fields given group G Haar measure hadrons Hamiltonian harmonic oscillator Hcoll Heisenberg-Weyl hence Higgs Hilbert space inner product integral kernel interactions invariant irreducible representation isospin kinetic energy labelled Lagrangian lattice leptons Lie algebra Lie group linear magnetic manifold mass Math matrix matrix elements matrix representation microscopic momenta Moshinsky neutrino Nucl nuclear nuclei obtain operator orbit orthogonal parameters phenomenological Phys Physics potential problem properties proton quantum mechanics quantum numbers quarks resonances rotation scalar Schrödinger self-adjoint set of functions shell model spin stable particles subgroup subspace symmetry symmetry group tion unirrep unitary variables wave functions zero