
doi: 10.2172/4389568
The commutation relations of an arbitrary angular momentum vector can be reduced to those of the harmonic oscillator. This provides a powerful method for constructing and developing the properties of angular momentum eigenvectors. In this paper many known theorems are derived in this way, and some new results obtained. Among the topics treated are the properties of the rotation matrices; the addition of two, three, and four angular momenta; and the theory of tensor operators.
General Physics, Oscillations, Rotation, Mathematical Models, Tensors, 71 Classical And Quantum Mechanics, Eigenvectors, Harmonic Oscillators, Commutation Relations, Angular Momentum
General Physics, Oscillations, Rotation, Mathematical Models, Tensors, 71 Classical And Quantum Mechanics, Eigenvectors, Harmonic Oscillators, Commutation Relations, Angular Momentum
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