18 Orthogonal Polynomials Askey Scheme 18.18 Sums 18.20 Hahn Class: Explicit Representations

§18.19 Hahn Class: Definitions

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Keywords:: Hahn class orthogonal polynomials, definitions
Notes:: For Table 18.19.1 see Ismail (2009, (6.2.4), (6.2.35), (6.1.4), (6.1.21)). For Table 18.19.2, Rows 2, 4, see Ismail (2009, (6.2.7), (6.1.7)); Row 3 follows from (18.20.6); Row 5 follows from (18.20.8). For (18.19.1)–(18.19.4) see Askey (1985, (4), (5)). (18.19.5) follows from (18.20.9). For (18.19.6)–(18.19.9) see Ismail (2009, (5.9.8), (5.9.9)). The formula for $k_{n}$ in (18.19.9) follows from (18.20.10).
Referenced by:: §13.6(v), §15.9(i), §18.35(iii), Erratum (V1.2.0) §18.19
Permalink:: http://dlmf.nist.gov/18.19
Addition (effective with 1.2.0):: Text was added at the start of this subsection which gives descriptive information. Just below (18.19.9), a sentence was added which gives a special case of (18.19.8), namely $w^{(1/2)}(x;\pi/2)$ .
See also:: Annotations for Ch.18

The Askey scheme extends the three families of classical OP’s (Jacobi, Laguerre and Hermite) with eight further families of OP’s for which the role of the differentiation operator $\frac{\mathrm{d}}{\mathrm{d}x}$ in the case of the classical OP’s is played by a suitable difference operator. These eight further families can be grouped in two classes of OP’s:

1.

Hahn class (or linear lattice class). These are OP’s $p_{n}(x)$ where the role of $\frac{\mathrm{d}}{\mathrm{d}x}$ is played by $\Delta_{x}$ or $\nabla_{x}$ or $\delta_{x}$ (see §18.1(i) for the definition of these operators). The Hahn class consists of four discrete and two continuous families.
2.

Wilson class (or quadratic lattice class). These are OP’s $p_{n}(x)=p_{n}(\lambda(y))$ ( $p_{n}(x)$ of degree $n$ in $x$ , $\lambda(y)$ quadratic in $y$ ) where the role of the differentiation operator is played by $\tfrac{\Delta_{y}}{\Delta_{y}(\lambda(y))}$ or $\tfrac{\nabla_{y}}{\nabla_{y}(\lambda(y))}$ or $\tfrac{\delta_{y}}{\delta_{y}(\lambda(y))}$ . The Wilson class consists of two discrete and two continuous families.

In addition to the limit relations in §18.7(iii) there are limit relations involving the further families in the Askey scheme, see §§18.21(ii) and 18.26(ii). The Askey scheme, depicted in Figure 18.21.1, gives a graphical representation of these limits.

The Hahn class consists of four discrete families (Hahn, Krawtchouk, Meixner, and Charlier) and two continuous families (continuous Hahn and Meixner–Pollaczek).

Hahn, Krawtchouk, Meixner, and Charlier

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Keywords:: Hahn class orthogonal polynomials, orthogonality properties
See also:: Annotations for §18.19 and Ch.18

Tables 18.19.1 and 18.19.2 provide definitions via orthogonality and standardization (§§18.2(i), 18.2(iii)) for the Hahn polynomials $Q_{n}\left(x;\alpha,\beta,N\right)$ , Krawtchouk polynomials $K_{n}\left(x;p,N\right)$ , Meixner polynomials $M_{n}\left(x;\beta,c\right)$ , and Charlier polynomials $C_{n}\left(x;a\right)$ .

Table 18.19.1: Orthogonality properties for Hahn, Krawtchouk, Meixner, and Charlier OP’s: discrete sets, weight functions, standardizations, and parameter constraints.

	$p_{n}(x)$	$X$	$w_{x}$	$h_{n}$
Hahn	$Q_{n}\left(x;\alpha,\beta,N\right)$ , $n=0,1,\ldots,N$	$\{0,1,\ldots,N\}$	$\dfrac{{\left(\alpha+1\right)_{x}}{\left(\beta+1\right)_{N-x}}}{x!(N-x)!}$ , $\alpha,\beta>-1$ or $\alpha,\beta<-N$	$\dfrac{(-1)^{n}{\left(n+\alpha+\beta+1\right)_{N+1}}{\left(\beta+1\right)_{n}}% n!}{(2n+\alpha+\beta+1){\left(\alpha+1\right)_{n}}{\left(-N\right)_{n}}N!}$ If $\alpha,\beta<-N$ , then $(-1)^{N}w_{x}>0$ and $(-1)^{N}h_{n}>0$ .
Krawtchouk	$K_{n}\left(x;p,N\right)$ , $n=0,1,\dots,N$	$\{0,1,\dots,N\}$	$\dbinom{N}{x}p^{x}(1-p)^{N-x}$ , $0<p<1$	$\left(\dfrac{1-p}{p}\right)^{n}\Bigg{/}\dbinom{N}{n}$
Meixner	$M_{n}\left(x;\beta,c\right)$	$\{0,1,2,\dots\}$	$\ifrac{{\left(\beta\right)_{x}}c^{x}}{x!}$ , $\beta>0$ , $0<c<1$	$\dfrac{c^{-n}n!}{{\left(\beta\right)_{n}}(1-c)^{\beta}}$
Charlier	$C_{n}\left(x;a\right)$	$\{0,1,2,\dots\}$	$\ifrac{a^{x}}{x!}$ , $a>0$	$a^{-n}{\mathrm{e}}^{a}n!$

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Symbols:: $C_{\NVar{n}}\left(\NVar{x};\NVar{a}\right)$ : Charlier polynomial, $Q_{\NVar{n}}\left(\NVar{x};\NVar{\alpha},\NVar{\beta},\NVar{N}\right)$ : Hahn polynomial, $K_{\NVar{n}}\left(\NVar{x};\NVar{p},\NVar{N}\right)$ : Krawtchouk polynomial, $M_{\NVar{n}}\left(\NVar{x};\NVar{\beta},\NVar{c}\right)$ : Meixner polynomial, ${\left(\NVar{a}\right)_{\NVar{n}}}$ : Pochhammer’s symbol (or shifted factorial), $\genfrac{(}{)}{0.0pt}{}{\NVar{m}}{\NVar{n}}$ : binomial coefficient, $\mathrm{e}$ : base of natural logarithm, $!$ : factorial (as in $n!$ ), $N$ : positive integer, $p_{n}(x)$ : polynomial of degree $n$ , $w_{x}$ : weights, $X$ : subset of $\mathbb{R}$ , $n$ : nonnegative integer, $x$ : real variable and $h_{n}$
Keywords:: Hahn class orthogonal polynomials, orthogonality properties, standardizations, weight functions
A&S Ref:: 22.17 (the Hahn, Krawtchouk, Meixner and Charlier cases)
Referenced by:: §18.19, §18.19, §18.20(i), §18.38(iii)
Permalink:: http://dlmf.nist.gov/18.19.T1
Modification (effective with 1.2.0):: A column was added on the left-hand side of the table which gives the names of the polynomials. The title of the table was updated such that “normalizations” is now referred to as “standardizations”.
See also:: Annotations for §18.19, §18.19 and Ch.18

Table 18.19.2: Hahn, Krawtchouk, Meixner, and Charlier OP’s: leading coefficients.

$p_{n}(x)$	$k_{n}$
$Q_{n}\left(x;\alpha,\beta,N\right)$	$\dfrac{{\left(n+\alpha+\beta+1\right)_{n}}}{{\left(\alpha+1\right)_{n}}{\left(% -N\right)_{n}}}$
$K_{n}\left(x;p,N\right)$	$\ifrac{p^{-n}}{{\left(-N\right)_{n}}}$
$M_{n}\left(x;\beta,c\right)$	$\ifrac{(1-c^{-1})^{n}}{{\left(\beta\right)_{n}}}$
$C_{n}\left(x;a\right)$	$(-a)^{-n}$

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Symbols:: $C_{\NVar{n}}\left(\NVar{x};\NVar{a}\right)$ : Charlier polynomial, $Q_{\NVar{n}}\left(\NVar{x};\NVar{\alpha},\NVar{\beta},\NVar{N}\right)$ : Hahn polynomial, $K_{\NVar{n}}\left(\NVar{x};\NVar{p},\NVar{N}\right)$ : Krawtchouk polynomial, $M_{\NVar{n}}\left(\NVar{x};\NVar{\beta},\NVar{c}\right)$ : Meixner polynomial, ${\left(\NVar{a}\right)_{\NVar{n}}}$ : Pochhammer’s symbol (or shifted factorial), $N$ : positive integer, $p_{n}(x)$ : polynomial of degree $n$ , $n$ : nonnegative integer, $x$ : real variable and $k_{n}$
Keywords:: Hahn class orthogonal polynomials, leading coefficients
Referenced by:: §18.19, §18.19
Permalink:: http://dlmf.nist.gov/18.19.T2
See also:: Annotations for §18.19, §18.19 and Ch.18

Continuous Hahn

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Defines:: $p_{\NVar{n}}\left(\NVar{x};\NVar{a},\NVar{b},\NVar{\overline{a}},\NVar{% \overline{b}}\right)$ : continuous Hahn polynomial
See also:: Annotations for §18.19 and Ch.18

These polynomials are orthogonal on $(-\infty,\infty)$ , and with $\Re a>0$ , $\Re b>0$ are defined as follows.

18.19.1		$p_{n}(x)=p_{n}\left(x;a,b,\overline{a},\overline{b}\right),$
ⓘ Symbols: $\overline{\NVar{z}}$ : complex conjugate, $p_{\NVar{n}}\left(\NVar{x};\NVar{a},\NVar{b},\NVar{\overline{a}},\NVar{% \overline{b}}\right)$ : continuous Hahn polynomial, $p_{n}(x)$ : polynomial of degree $n$ , $n$ : nonnegative integer and $x$ : real variable Referenced by: §18.19 Permalink: http://dlmf.nist.gov/18.19.E1 Encodings: TeX, pMML, png See also: Annotations for §18.19, §18.19 and Ch.18

18.19.2		$w(z;a,b,\overline{a},\overline{b})=\Gamma\left(a+iz\right)\Gamma\left(b+iz% \right)\Gamma\left(\overline{a}-iz\right)\Gamma\left(\overline{b}-iz\right),$
ⓘ Symbols: $\Gamma\left(\NVar{z}\right)$ : gamma function, $\overline{\NVar{z}}$ : complex conjugate, $w(x)$ : weight function and $z$ : complex variable Permalink: http://dlmf.nist.gov/18.19.E2 Encodings: TeX, pMML, png See also: Annotations for §18.19, §18.19 and Ch.18

18.19.3		$w(x)=w(x;a,b,\overline{a},\overline{b})=\|\Gamma\left(a+\mathrm{i}x\right)% \Gamma\left(b+\mathrm{i}x\right)\|^{2},$
ⓘ Symbols: $\Gamma\left(\NVar{z}\right)$ : gamma function, $\overline{\NVar{z}}$ : complex conjugate, $\mathrm{i}$ : imaginary unit, $w(x)$ : weight function and $x$ : real variable Permalink: http://dlmf.nist.gov/18.19.E3 Encodings: TeX, pMML, png See also: Annotations for §18.19, §18.19 and Ch.18

18.19.4		$h_{n}=\frac{2\pi\Gamma\left(n+a+\overline{a}\right)\Gamma\left(n+b+\overline{b% }\right)\|\Gamma\left(n+a+\overline{b}\right)\|^{2}}{\left(2n+2\Re\left(a+b% \right)-1\right)\Gamma\left(n+2\Re\left(a+b\right)-1\right)n!},$
ⓘ Symbols: $\Gamma\left(\NVar{z}\right)$ : gamma function, $\pi$ : the ratio of the circumference of a circle to its diameter, $\overline{\NVar{z}}$ : complex conjugate, $!$ : factorial (as in $n!$ ), $\Re$ : real part, $n$ : nonnegative integer and $h_{n}$ Referenced by: §18.19 Permalink: http://dlmf.nist.gov/18.19.E4 Encodings: TeX, pMML, png See also: Annotations for §18.19, §18.19 and Ch.18

18.19.5		$k_{n}=\frac{{\left(n+2\Re\left(a+b\right)-1\right)_{n}}}{n!}.$
ⓘ Symbols: ${\left(\NVar{a}\right)_{\NVar{n}}}$ : Pochhammer’s symbol (or shifted factorial), $!$ : factorial (as in $n!$ ), $\Re$ : real part, $n$ : nonnegative integer and $k_{n}$ Referenced by: §18.19 Permalink: http://dlmf.nist.gov/18.19.E5 Encodings: TeX, pMML, png See also: Annotations for §18.19, §18.19 and Ch.18

Meixner–Pollaczek

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Defines:: $P^{(\NVar{\lambda})}_{\NVar{n}}\left(\NVar{x};\NVar{\phi}\right)$ : Meixner–Pollaczek polynomial
Keywords:: Hahn class orthogonal polynomials, definitions, orthogonality properties
See also:: Annotations for §18.19 and Ch.18

These polynomials are orthogonal on $(-\infty,\infty)$ , and are defined as follows.

18.19.6		$p_{n}(x)=P^{(\lambda)}_{n}\left(x;\phi\right),$
ⓘ Symbols: $P^{(\NVar{\lambda})}_{\NVar{n}}\left(\NVar{x};\NVar{\phi}\right)$ : Meixner–Pollaczek polynomial, $p_{n}(x)$ : polynomial of degree $n$ , $n$ : nonnegative integer and $x$ : real variable Referenced by: §18.19 Permalink: http://dlmf.nist.gov/18.19.E6 Encodings: TeX, pMML, png See also: Annotations for §18.19, §18.19 and Ch.18

18.19.7		$w^{(\lambda)}(z;\phi)=\Gamma\left(\lambda+iz\right)\Gamma\left(\lambda-iz% \right){\mathrm{e}}^{(2\phi-\pi)z},$
ⓘ Symbols: $\Gamma\left(\NVar{z}\right)$ : gamma function, $\pi$ : the ratio of the circumference of a circle to its diameter, $\mathrm{e}$ : base of natural logarithm, $w(x)$ : weight function and $z$ : complex variable Permalink: http://dlmf.nist.gov/18.19.E7 Encodings: TeX, pMML, png See also: Annotations for §18.19, §18.19 and Ch.18

18.19.8		$w(x)=w^{(\lambda)}(x;\phi)=\left\|\Gamma\left(\lambda+\mathrm{i}x\right)\right\|% ^{2}{\mathrm{e}}^{(2\phi-\pi)x},$
$\lambda>0$ , $0<\phi<\pi$ ,
ⓘ Symbols: $\Gamma\left(\NVar{z}\right)$ : gamma function, $\pi$ : the ratio of the circumference of a circle to its diameter, $\mathrm{e}$ : base of natural logarithm, $\mathrm{i}$ : imaginary unit, $w(x)$ : weight function and $x$ : real variable Referenced by: §18.19, §18.19 Permalink: http://dlmf.nist.gov/18.19.E8 Encodings: TeX, pMML, png See also: Annotations for §18.19, §18.19 and Ch.18

18.19.9	$\displaystyle h_{n}$	$\displaystyle=\frac{2\pi\Gamma\left(n+2\lambda\right)}{(2\sin\phi)^{2\lambda}n% !},$
18.19.9	$\displaystyle k_{n}$	$\displaystyle=\frac{(2\sin\phi)^{n}}{n!}.$
ⓘ Symbols: $\Gamma\left(\NVar{z}\right)$ : gamma function, $\pi$ : the ratio of the circumference of a circle to its diameter, $!$ : factorial (as in $n!$ ), $\sin\NVar{z}$ : sine function, $n$ : nonnegative integer, $h_{n}$ and $k_{n}$ Referenced by: §18.19 Permalink: http://dlmf.nist.gov/18.19.E9 Encodings: TeX, TeX, pMML, pMML, png, png See also: Annotations for §18.19, §18.19 and Ch.18

A special case of (18.19.8) is $w^{(1/2)}(x;\pi/2)=\frac{\pi}{\cosh\left(\pi x\right)}$ .

18.18 Sums 18.20 Hahn Class: Explicit Representations

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§18.19 Hahn Class: Definitions

Hahn, Krawtchouk, Meixner, and Charlier

Continuous Hahn

Meixner–Pollaczek

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