Denote
18.33.2 | |||
where , and are constants. Also denote
18.33.3 | |||
where the bar again signifies complex conjugate. Then
18.33.4 | ||||
18.33.5 | ||||
18.33.6 | ||||
For an alternative and more detailed approach to the recurrence relations, see §18.33(vi).
Assume that . Set
18.33.7 | ||||
Let and , , be OP’s with weight functions and , respectively, on . Then
18.33.8 | ||||
18.33.9 | ||||
Conversely,
18.33.10 | ||||
18.33.11 | ||||
where , , , and are independent of .
18.33.12 | ||||
18.33.15 | |||
with
18.33.16 | |||
. | |||
For the notation, including the basic hypergeometric function , see §§17.2 and 17.4(i).
When the Askey case is also known as the Rogers–Szegő case. See for a more general class Costa et al. (2012).
See Baxter (1961) for general theory. See Askey (1982a) and Pastro (1985) for special cases extending (18.33.13)–(18.33.14) and (18.33.15)–(18.33.16), respectively. See Gasper (1981) and Hendriksen and van Rossum (1986) for relations with Laurent polynomials orthogonal on the unit circle. See Al-Salam and Ismail (1994) for special biorthogonal rational functions on the unit circle.
Instead of orthonormal polynomials Simon (2005a, b) uses monic polynomials . Let be a probability measure on the unit circle of which the support is an infinite set. A system of monic polynomials , , where is of proper degree , is orthogonal on the unit circle with respect to the measure if
18.33.17 | |||
where the bar signifies complex conjugate and , . Then the corresponding orthonormal polynomials are
18.33.18 | |||
If the measure is absolutely continuous, i.e.,
18.33.19 | |||
for some weight function () then (18.33.17) (see also (18.33.1)) takes the form
18.33.20 | |||
For a polynomial
18.33.21 | |||
, | |||
with complex coefficients and of a certain degree define the reversed polynomial by
18.33.22 | |||
The Verblunsky coefficients (also called Schur parameters or reflection coefficients) are the coefficients in the Szegő recurrence relations
18.33.23 | ||||
18.33.24 | ||||
Then
18.33.25 | ||||
18.33.26 | ||||
For as in (18.33.19) (or more generally as the weight function of the absolutely continuous part of the measure in (18.33.17)) and with the Verblunsky coefficients in (18.33.23), (18.33.24), Szegő’s theorem states that
18.33.31 | |||
By (18.33.25) , so the infinite product in (18.33.31) converges, although the limit may be zero. In particular, by (18.33.31),
18.33.32 | |||