Askey scheme

Template:Short description Template:Use mdy dates Template:Use American English In mathematics, the Askey scheme is a way of organizing orthogonal polynomials of hypergeometric or basic hypergeometric type into a hierarchy. For the classical orthogonal polynomials discussed in Template:Harvtxt, the Askey scheme was first drawn by Template:Harvtxt and by Template:Harvs, and has since been extended by Template:Harvtxt and Template:Harvtxt to cover basic orthogonal polynomials.

Template:Harvtxt give the following version of the Askey scheme:

${\displaystyle {}_4{F}_3(4)}$

Wilson | Racah

${\displaystyle {}_3{F}_2(3)}$

Continuous dual Hahn | Continuous Hahn | Hahn | dual Hahn

${\displaystyle {}_2{F}_1(2)}$

Meixner–Pollaczek | Jacobi | Pseudo Jacobi | Meixner | Krawtchouk

${\displaystyle {}_2{F}_0(1)/{}_1{F}_1(1)}$

Laguerre | Bessel | Charlier

${\displaystyle {}_2{F}_0(0)}$

Hermite

Here ${\displaystyle {}_p{F}_q(n)}$ indicates a hypergeometric series representation with ${\displaystyle n}$ parameters

Template:Harvtxt give the following scheme for basic hypergeometric orthogonal polynomials:

₄${\displaystyle \varphi }$₃

Askey–Wilson | q-Racah

₃${\displaystyle \varphi }$₂

Continuous dual q-Hahn | Continuous q-Hahn | Big q-Jacobi | q-Hahn | dual q-Hahn

₂${\displaystyle \varphi }$₁

Al-Salam–Chihara | q-Meixner–Pollaczek | Continuous q-Jacobi | Big q-Laguerre | Little q-Jacobi | q-Meixner | Quantum q-Krawtchouk | q-Krawtchouk | Affine q-Krawtchouk | Dual q-Krawtchouk

₂${\displaystyle \varphi }$₀/₁${\displaystyle \varphi }$₁

Continuous big q-Hermite | Continuous q-Laguerre | Little q-Laguerre | q-Laguerre | q-Bessel | q-Charlier | Al-Salam–Carlitz I | Al-Salam–Carlitz II

₁${\displaystyle \varphi }$₀

Continuous q-Hermite | Stieltjes–Wigert | Discrete q-Hermite I | Discrete q-Hermite II

While there are several approaches to constructing still more general families of orthogonal polynomials, it is usually not possible to extend the Askey scheme by reusing hypergeometric functions of the same form. For instance, one might naively hope to find new examples given by

${\displaystyle p_n(x)={}_{q+1}{F}_q(\begin{array}{c}-n,n+\mu ,a_1(x),\dots ,a_{q-1}(x)\\ b_1,\dots ,b_q\end{array};1)}$

above ${\displaystyle q=3}$ which corresponds to the Wilson polynomials. This was ruled out in Template:Harvtxt under the assumption that the ${\displaystyle a_i(x)}$ are degree 1 polynomials such that

${\displaystyle {\displaystyle \prod _{i=1}^{q-1}}(a_i(x)+r)={\displaystyle \prod _{i=1}^{q-1}}{a}_i(x)+\pi (r)}$

for some polynomial ${\displaystyle \pi (r)}$.

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