Befriending Askey-Wilson polynomials

TL;DR

This paper explores the properties of Askey-Wilson polynomials, revealing new symmetries, generalizations of classical formulas, and probabilistic interpretations, by analyzing their density and relationships with other polynomial families.

Contribution

It introduces new symmetries, generalizes the Poisson-Mehler expansion, and expresses Askey-Wilson polynomials as combinations of Al-Salam-Chihara polynomials, providing deeper insights into their structure.

Findings

Generalized Poisson-Mehler expansion with Al-Salam-Chihara polynomials

Expressed Askey-Wilson polynomials as linear combinations of ASC polynomials

Derived identities involving ASC polynomials

Abstract

We recall five families of polynomials constituting a part of the so-called Askey-Wilson scheme. We do this to expose properties of the Askey-Wilson (AW) polynomials that constitute the last, most complicated element of this scheme. In doing so we express AW density as a product of the density that makes $q-$Hermite polynomials orthogonal times a product of four characteristic function of $q-$Hermite polynomials (\ref{fAW}) just pawing the way to a generalization of AW integral. Our main results concentrate mostly on the complex parameters case forming conjugate pairs. We present new fascinating symmetries between the variables and some newly defined (by the appropriate conjugate pair) parameters. In particular in (\ref% {rozwiniecie1}) we generalize substantially famous Poisson-Mehler expansion formula (\ref{PM}) in which $q-$Hermite polynomials are replaced by Al-Salam-Chihara polynomials. Further we express Askey-Wilson polynomials as linear combinations of Al-Salam-Chihara (ASC) polynomials. As a by-product we get useful identities involving ASC polynomials. Finally by certain re-scaling of variables and parameters we reach AW polynomials and AW densities that have clear probabilistic interpretation.