q-deformed coherent states associated with the sequence xnq,α =(1+α qn-1)[n]q

Abstract

We introduce new generalized q-deformed coherent states (q-CS) by replacing the q-factorial of [n]q! in the series expansion of the classical q-CS by the generalized factorial xnq,α! where xnq,α=(1+α qn-1)[n]q. We use the shifted operators method based on the sequence xnq,α to obtain a realization in terms of Al-Salam-Chihara polynomials for the basis vectors of the Fock space carrying the constructed q-CS. These new states interpolate between the q-CS of Arik-Coon type (α=0, 0<q<1) and a set of coherent states of Barut-Girardello type for the Meixner-Pollaczek oscillator (α≠ 0, q 1). We also discus their associated Bargmann type transforms.

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