Quantum SU(2,2)-Harmonic Oscillator

Abstract

The SU(2,2)-harmonic oscillator on the phase space A(2,2)= SU(2,2)/S(U(2)× U(2)) is quantized using the coherent states. The quantum Hamiltonian is the Toeplitz operator corresponding to the square of the distance with respect to the SU(2,2)-invariant K\"ahler metric on the phase space. Its spectrum, depending on the choice of representation of SU(2,2), is computed.

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