In mathematics, the ''q''-Racah polynomials are a family of basic hypergeometric

orthogonal polynomials In mathematics, an orthogonal polynomial sequence is a family of polynomials such that any two different polynomials in the sequence are orthogonality, orthogonal to each other under some inner product. The most widely used orthogonal polynomial ...

in the basic

Askey scheme 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 , the Askey scheme was first drawn by and by , ...

, introduced by . give a detailed list of their properties.

Definition

The polynomials are given in terms of

basic hypergeometric function In mathematics, basic hypergeometric series, or ''q''-hypergeometric series, are ''q''-analogue generalizations of generalized hypergeometric series, and are in turn generalized by elliptic hypergeometric series. A series ''x'n'' is called h ...

s and the

Pochhammer symbol In mathematics, the falling factorial (sometimes called the descending factorial, falling sequential product, or lower factorial) is defined as the polynomial :\begin (x)_n = x^\underline &= \overbrace^ \\ &= \prod_^n(x-k+1) = \prod_^(x-k) \,. \e ...

by :

p_n(q^+q^cd;a,b,c,d;q) = _4\phi_3\left begin q^ &abq^&q^&q^cd\\
aq&bdq&cq\\ \end;q;q\right /math>
They are sometimes given with changes of variables as
: W_n(x;a,b,c,N;q) = _4\phi_3\left begin q^ &abq^&q^&cq^\\
aq&bcq&q^\\ \end;q;q\right /math>

Relation to other polynomials

q-Racah polynomials→Racah polynomials

References

* * * *{{dlmf, id=18, title=Chapter 18: Orthogonal Polynomials, first=Tom H. , last=Koornwinder, first2=Roderick S. C., last2= Wong, first3=Roelof , last3=Koekoek, , first4=René F. , last4=Swarttouw Orthogonal polynomials Q-analogs Special hypergeometric functions