Symmetry, Integrability and Geometry: Methods and Applications (Oct 2005)

Spectra of Observables in the q-Oscillator and q-Analogue of the Fourier Transform

  • Anatoliy U. Klimyk

Journal volume & issue
Vol. 1
p. 008

Abstract

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Spectra of the position and momentum operators of the Biedenharn-Macfarlane q^-oscillator (with the main relation aa^+ - qa^+a = 1) are studied when q > 1. These operators are symmetric but not self-adjoint. They have a one-parameter family of self-adjoint extensions. These extensions are derived explicitly. Their spectra and eigenfunctions are given. Spectra of different extensions do not intersect. The results show that the creation and annihilation operators a+ and a of the q-oscillator for q > 1 cannot determine a physical system without further more precise definition. In order to determine a physical system we have to choose appropriate self-adjoint extensions of the position and momentum operators.

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