On the Time Dependent Oscillator and the Nonlinear Realizations of the Virasoro Group
Abstract
Using the nonlinear realizations of the Virasoro group we construct the action of the Conformal Quantum Mechanics (CQM) with additional harmonic potential. We show that SL(2,R) invariance group of this action is nontrivially embedded in the reparametrization group of the time which is isomorphic to the centerless Virasoro group. We generalize the consideration to the Ermakov systems and construct the action for the time dependent oscillator. Its symmetry group is also the SL(2,R) SU(1,1) group embedded in the Virasoro group in a more complicated way.
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