On Fourier integral transforms for q-Fibonacci and q-Lucas polynomials
Abstract
We study in detail two families of q-Fibonacci polynomials and q-Lucas polynomials, which are defined by non-conventional three-term recurrences. They were recently introduced by Cigler and have been then employed by Cigler and Zeng to construct novel q-extensions of classical Hermite polynomials. We show that both of these q-polynomial families exhibit simple transformation properties with respect to the classical Fourier integral transform.
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