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In mathematics, the Askey–Wilson polynomials (or q-Wilson polynomials) are a family of orthogonal polynomials introduced by Askey and Wilson (1985) as q-analogs of the Wilson polynomials. They include many of the other orthogonal polynomials in 1 variable as special or limiting cases, described in the Askey scheme. Askey–Wilson polynomials are the special case of Macdonald polynomials (or Koornwinder polynomials) for the non-reduced affine root system of type ( $C \lor 1, C 1$ ), and their 4 parameters $a$ , $b$ , $c$ , $d$ correspond to the 4 orbits of roots of this root system.

They are defined by

p_{n}(x)=p_{n}(x;a,b,c,d\mid q):=a^{-n}(ab,ac,ad;q)_{n}\;_{4}\phi _{3}\left[{\begin{matrix}q^{-n}&abcdq^{n-1}&ae^{i\theta }&ae^{-i\theta }\\ab&ac&ad\end{matrix}};q,q\right]

where $φ$ is a basic hypergeometric function, $x = cos θ$ , and $(,,,) n$ is the q-Pochhammer symbol. Askey–Wilson functions are a generalization to non-integral values of $n$ .

This result can be proven since it is known that

p_{n}(\cos {\theta })=p_{n}(\cos {\theta };a,b,c,d\mid q)

and using the definition of the q-Pochhammer symbol

p_{n}(\cos {\theta })=a^{-n}\sum _{\ell =0}^{n}q^{\ell }\left(abq^{\ell },acq^{\ell },adq^{\ell };q\right)_{n-\ell }\times {\frac {\left(q^{-n},abcdq^{n-1};q\right)_{\ell }}{(q;q)_{\ell }}}\prod _{j=0}^{\ell -1}\left(1-2aq^{j}\cos {\theta }+a^{2}q^{2j}\right)

which leads to the conclusion that it equals

a^{-n}(ab,ac,ad;q)_{n}\;_{4}\phi _{3}\left[{\begin{matrix}q^{-n}&abcdq^{n-1}&ae^{i\theta }&ae^{-i\theta }\\ab&ac&ad\end{matrix}};q,q\right]

Askey, Richard; Wilson, James (1985), "Some basic hypergeometric orthogonal polynomials that generalize Jacobi polynomials", Memoirs of the American Mathematical Society, 54 (319): iv+55, doi:10.1090/memo/0319, ISBN 978-0-8218-2321-7, ISSN 0065-9266, MR 0783216
Gasper, George; Rahman, Mizan (2004), Basic hypergeometric series, Encyclopedia of Mathematics and its Applications, vol. 96 (2nd ed.), Cambridge University Press, ISBN 978-0-521-83357-8, MR 2128719
Koornwinder, Tom H.; Wong, Roderick S. C.; Koekoek, Roelof; Swarttouw, René F. (2010), "Askey-Wilson class", in Olver, Frank W. J.; Lozier, Daniel M.; Boisvert, Ronald F.; Clark, Charles W. (eds.), NIST Handbook of Mathematical Functions, Cambridge University Press, ISBN 978-0-521-19225-5, MR 2723248.
Koornwinder, Tom H. (2012), "Askey-Wilson polynomial", Scholarpedia, 7 (7): 7761, Bibcode:2012SchpJ...7.7761K, doi:10.4249/scholarpedia.7761

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 In mathematics, the '''Askey–Wilson polynomials''' (or '''''q''-Wilson polynomials''') are a family of [[orthogonal polynomials]] introduced by {{harvs|txt|last=Askey|author1-link=Richard Askey|last2=Wilson|author2-link=James A. Wilson|year=1985}} as [[q-analog]]s of the [[Wilson polynomials]]. They include many of the other orthogonal polynomials in 1 variable as [[Special case|special]] or [[limiting case (mathematics)|limiting case]]s, described in the [[Askey scheme]]. Askey–Wilson polynomials are the special case of [[Macdonald polynomials]] (or [[Koornwinder polynomials]]) for the non-reduced [[affine root system]] of type ({{math|''C''{{su|b=1|p=&or;}}, ''C''<sub>1</sub>}}), and their 4 parameters {{mvar|a}}, {{mvar|b}}, {{mvar|c}}, {{mvar|d}} correspond to the 4 orbits of roots of this root system.
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 *{{Citation | first=Tom H. | last=Koornwinder | title=Askey-Wilson polynomial | journal=Scholarpedia | volume=7 | year=2012 | issue=7 | pages=7761 | doi=10.4249/scholarpedia.7761 | bibcode=2012SchpJ...7.7761K | doi-access=free }}
-{{DEFAULTSORT:Askey-Wilson polynomials}}
 [[Category:Q-analogs]]
 [[Category:Hypergeometric functions]]