Askey–Wilson polynomials

In mathematics, the Askey–Wilson polynomials (or q-Wilson polynomials) are a family of orthogonal polynomials introduced by Richard Askey and James A. Wilson as q-analogs of the Wilson polynomials.Template:Sfnp 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 (Template:Math), and their 4 parameters Template:Mvar, Template:Mvar, Template:Mvar, Template:Mvar correspond to the 4 orbits of roots of this root system.

They are defined by

${\displaystyle p_n(x)=p_n(x;a,b,c,d\mid q):=a^{-n}(ab,ac,ad;q{)}_n{}_4{\varphi }_3[\begin{array}{cccc}{q}^{-n}& abcd{q}^{n-1}& a{e}^{i\theta }& a{e}^{-i\theta }\\ ab& ac& ad\end{array};q,q]}$

where Template:Mvar is a basic hypergeometric function, Template:Math, and Template:Math is the q-Pochhammer symbol. Askey–Wilson functions are a generalization to non-integral values of Template:Mvar.

This result can be proven since it is known that

${\displaystyle p_n(\cos \theta )=p_n(\cos \theta ;a,b,c,d\mid q)}$

and using the definition of the q-Pochhammer symbol

${\displaystyle p_n(\cos \theta )=a^{-n}{\displaystyle \sum _{\ell =0}^n}{q}^{\ell }{(ab{q}^{\ell },ac{q}^{\ell },ad{q}^{\ell };q)}_{n-\ell }\times \frac{{(q^{-n},abcd{q}^{n-1};q)}_{\ell }}{(q;q{)}_{\ell }}{\displaystyle \prod _{j=0}^{\ell -1}}(1-2a{q}^j\cos \theta +a^2{q}^{2j})}$

which leads to the conclusion that it equals

${\displaystyle a^{-n}(ab,ac,ad;q{)}_n{}_4{\varphi }_3[\begin{array}{cccc}{q}^{-n}& abcd{q}^{n-1}& a{e}^{i\theta }& a{e}^{-i\theta }\\ ab& ac& ad\end{array};q,q]}$

• Askey scheme

Template:Reflist

• Template:Citation
• Template:Citation
• Template:Dlmf
• Template:Citation

Template:Polynomial-stub