Q-Deformed Oscillator Algebra and an Index Theorem for the Photon Phase Operator
Abstract
The quantum deformation of the oscillator algebra and its implications on the phase operator are studied from a view point of an index theorem by using an explicit matrix representation. For a positive deformation parameter q or q=exp(2π iθ) with an irrational θ, one obtains an index condition a - a = 1 which allows only a non-hermitian phase operator with i - (i) = 1. For q=exp(2π iθ) with a rational θ , one formally obtains the singular situation a =∞ and a = ∞, which allows a hermitian phase operator with i - (i) = 0 as well as the non-hermitian one with i - (i) = 1. Implications of this interpretation of the quantum deformation are discussed. We also show how to overcome the problem of negative norm for q=exp(2π iθ).
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