Representation theory of deformed oscillator algebras

Abstract

The representation theory of deformed oscillator algebras, defined in terms of an arbitrary function of the number operator~N, is developed in terms of the eigenvalues of a Casimir operator~C. It is shown that according to the nature of the N spectrum, their unitary irreducible representations may fall into one out of four classes, some of which contain bosonic, fermionic or parafermionic Fock-space representations as special cases. The general theory is illustrated by classifying the unitary irreducible representations of the Arik-Coon, Chaturvedi-Srinivasan, and Tamm-Dancoff oscillator algebras, which may be derived from the boson one by the recursive minimal-deformation procedure of Katriel and Quesne. The effects on non-Fock-space representations of the minimal deformation and of the quommutator-commutator transformation, considered in such a procedure, are studied in detail.

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