Klein-Gordon oscillators and Bergman spaces

Abstract

We consider classical and quantum dynamics of relativistic oscillator in Minkowski space R3,1. It is shown that for a non-zero frequency parameter ω the covariant phase space of the classical Klein-Gordon oscillator is a homogeneous K\"ahler-Einstein manifold Z6=AdS7/U(1)=U(3,1)/U(3)× U(1). In the limit ω 0, this manifold is deformed into the covariant phase space T*H3 of a free relativistic particle, where H3=H3+ H-3 is a two-sheeted hyperboloid in momentum space. Quantization of this model with ω 0 leads to the Klein-Gordon oscillator equation which we consider in the Segal-Bargmann representation. It is shown that the general solution of this model is given by functions from the weighted Bergman space of square-integrable holomorphic (for particles) and antiholomorphic (for antiparticles) functions on the K\"ahler-Einstein manifold Z6. This relativistic model is Lorentz covariant, unitary and does not contain non-physical states.

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