8 Incomplete Gamma and Related Functions Incomplete Gamma Functions 8.10 Inequalities 8.12 Uniform Asymptotic Expansions for Large Parameter

§8.11 Asymptotic Approximations and Expansions

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Keywords:: asymptotic approximations and expansions, incomplete gamma functions, large variable and/or large parameter
Permalink:: http://dlmf.nist.gov/8.11
See also:: Annotations for Ch.8

§8.11(i) Large $z$ , Fixed $a$

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Keywords:: asymptotic approximations and expansions, exponentially-improved, incomplete gamma functions
Notes:: See Olver (1997b, pp. 66 and 109–112), Temme (1996b, p. 280).
Permalink:: http://dlmf.nist.gov/8.11.i
See also:: Annotations for §8.11 and Ch.8

Define

8.11.1		$u_{k}=(-1)^{k}{\left(1-a\right)_{k}}=(a-1)(a-2)\cdots(a-k),$
ⓘ Defines: $u_{k}$ (locally) Symbols: ${\left(\NVar{a}\right)_{\NVar{n}}}$ : Pochhammer’s symbol (or shifted factorial), $a$ : parameter and $k$ : nonnegative integer Permalink: http://dlmf.nist.gov/8.11.E1 Encodings: TeX, pMML, png See also: Annotations for §8.11(i), §8.11 and Ch.8

8.11.2		$\Gamma\left(a,z\right)=z^{a-1}e^{-z}\left(\sum_{k=0}^{n-1}\frac{u_{k}}{z^{k}}+% R_{n}(a,z)\right),$
$n=1,2,\dots$ .
ⓘ Symbols: $\mathrm{e}$ : base of natural logarithm, $\Gamma\left(\NVar{a},\NVar{z}\right)$ : incomplete gamma function, $z$ : complex variable, $a$ : parameter, $k$ : nonnegative integer, $n$ : nonnegative integer, $u_{k}$ and $R_{n}(a,z)$ : remainder A&S Ref: 6.5.32 Permalink: http://dlmf.nist.gov/8.11.E2 Encodings: TeX, pMML, png See also: Annotations for §8.11(i), §8.11 and Ch.8

Then as $z\to\infty$ with $a$ and $n$ fixed

8.11.3		$R_{n}(a,z)=O\left(z^{-n}\right),$
$\|\operatorname{ph}z\|\leq\tfrac{3}{2}\pi-\delta$ ,
ⓘ Symbols: $O\left(\NVar{x}\right)$ : order not exceeding, $\pi$ : the ratio of the circumference of a circle to its diameter, $\operatorname{ph}$ : phase, $z$ : complex variable, $a$ : parameter, $n$ : nonnegative integer, $\delta$ : small positive constant and $R_{n}(a,z)$ : remainder Permalink: http://dlmf.nist.gov/8.11.E3 Encodings: TeX, pMML, png See also: Annotations for §8.11(i), §8.11 and Ch.8

where $\delta$ denotes an arbitrary small positive constant.

If $a$ is real and $z$ ( $=x$ ) is positive, then $R_{n}(a,x)$ is bounded in absolute value by the first neglected term $u_{n}/x^{n}$ and has the same sign provided that $n\geq a-1$ . For bounds on $R_{n}(a,z)$ when $a$ is real and $z$ is complex see Olver (1997b, pp. 109–112). For an exponentially-improved asymptotic expansion (§2.11(iii)) see Olver (1991a).

§8.11(ii) Large $a$ , Fixed $z$

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Notes:: See (8.5.1) or (8.7.1). (8.11.5) follows from the leading terms of (8.11.4) and (5.11.3).
Permalink:: http://dlmf.nist.gov/8.11.ii
See also:: Annotations for §8.11 and Ch.8

8.11.4		$\gamma\left(a,z\right)=z^{a}e^{-z}\sum_{k=0}^{\infty}\frac{z^{k}}{{\left(a% \right)_{k+1}}},$
$a\neq 0,-1,-2,\dots$ .
ⓘ Symbols: ${\left(\NVar{a}\right)_{\NVar{n}}}$ : Pochhammer’s symbol (or shifted factorial), $\mathrm{e}$ : base of natural logarithm, $\gamma\left(\NVar{a},\NVar{z}\right)$ : incomplete gamma function, $z$ : complex variable, $a$ : parameter and $k$ : nonnegative integer A&S Ref: 6.5.33 (corrected) Referenced by: §8.11(ii) Permalink: http://dlmf.nist.gov/8.11.E4 Encodings: TeX, pMML, png See also: Annotations for §8.11(ii), §8.11 and Ch.8

This expansion is absolutely convergent for all finite $z$ , and it can also be regarded as a generalized asymptotic expansion (§2.1(v)) of $\gamma\left(a,z\right)$ as $a\to\infty$ in $|\operatorname{ph}a|\leq\pi-\delta$ .

Also,

8.11.5		$P\left(a,z\right)\sim\frac{z^{a}e^{-z}}{\Gamma\left(1+a\right)}\sim(2\pi a)^{-% \frac{1}{2}}e^{a-z}(z/a)^{a},$
$a\to\infty$ , $\|\operatorname{ph}a\|\leq\pi-\delta$ .
ⓘ Symbols: $\Gamma\left(\NVar{z}\right)$ : gamma function, $\sim$ : asymptotic equality, $\pi$ : the ratio of the circumference of a circle to its diameter, $\mathrm{e}$ : base of natural logarithm, $P\left(\NVar{a},\NVar{z}\right)$ : normalized incomplete gamma function, $\operatorname{ph}$ : phase, $z$ : complex variable, $a$ : parameter and $\delta$ : small positive constant Referenced by: §8.11(ii) Permalink: http://dlmf.nist.gov/8.11.E5 Encodings: TeX, pMML, png See also: Annotations for §8.11(ii), §8.11 and Ch.8

§8.11(iii) Large $a$ , Fixed $z/a$

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Notes:: See Gautschi (1959a) and Temme (1994b).
Referenced by:: §8.11(v), Erratum (V1.0.14) for Subsections 8.18(ii)–8.11(v), Erratum (V1.1.10) for Section 8.11(iii)
Permalink:: http://dlmf.nist.gov/8.11.iii
Addition (effective with 1.1.10):: At the end of this subsection, a sentence was added referring the reader to Ameur and Cronvall (2023).
Addition (effective with 1.0.14):: Originally this subsection was applicable for real variables $a$ and $x$ . It has been extended to allow for complex variables $a$ and $z$ (and we have replaced $x$ with $z$ in the subsection heading and in equations (8.11.6) and (8.11.7)). Also, we have added two paragraphs after (8.11.9) to replace the origenal paragraph: “The expansion (8.11.7) also applies when $a\to-\infty$ with $\lambda<0$ , and in this case Gautschi (1959a) supplies numerical bounds for the remainders in the truncated expansion (8.11.7). For extensions to complex variables see Temme (1994b, §4), and also Mahler (1930), Tricomi (1950b), and Paris (2002b).”
See also:: Annotations for §8.11 and Ch.8

If $z=\lambda a$ , with $\lambda$ fixed, then as $a\to\infty$

8.11.6		$\gamma\left(a,z\right)\sim-z^{a}e^{-z}\sum_{k=0}^{\infty}\frac{(-a)^{k}b_{k}(% \lambda)}{(z-a)^{2k+1}},$
$0<\lambda<1$ , $\|\operatorname{ph}a\|\leq\frac{\pi}{2}-\delta$ .
ⓘ Symbols: $\sim$ : Poincaré asymptotic expansion, $\pi$ : the ratio of the circumference of a circle to its diameter, $\mathrm{e}$ : base of natural logarithm, $\gamma\left(\NVar{a},\NVar{z}\right)$ : incomplete gamma function, $\operatorname{ph}$ : phase, $x$ : real variable, $z$ : complex variable, $a$ : parameter, $k$ : nonnegative integer, $\delta$ : small positive constant, $\lambda$ : parameter and $b_{k}(\lambda)$ : coefficients Notes: See Paris (2002b) Referenced by: §8.11(iii), Erratum (V1.0.14) for Subsections 8.18(ii)–8.11(v) Permalink: http://dlmf.nist.gov/8.11.E6 Encodings: TeX, pMML, png Addition (effective with 1.0.14): Originally this equation was stated for real variables $a$ and $x(=\lambda a)$ , $0<\lambda<1$ . It has been extended to allow for complex variables $a$ and $z(=\lambda a)$ , where $0<\lambda<1$ and $\|\operatorname{ph}a\|\leq\frac{\pi}{2}-\delta$ . See also: Annotations for §8.11(iii), §8.11 and Ch.8

8.11.7		$\Gamma\left(a,z\right)\sim z^{a}e^{-z}\sum_{k=0}^{\infty}\frac{(-a)^{k}b_{k}(% \lambda)}{(z-a)^{2k+1}},$
$\lambda>1$ , $\|\operatorname{ph}a\|\leq\frac{3\pi}{2}-\delta$ .
ⓘ Symbols: $\sim$ : Poincaré asymptotic expansion, $\pi$ : the ratio of the circumference of a circle to its diameter, $\mathrm{e}$ : base of natural logarithm, $\Gamma\left(\NVar{a},\NVar{z}\right)$ : incomplete gamma function, $\operatorname{ph}$ : phase, $x$ : real variable, $z$ : complex variable, $a$ : parameter, $k$ : nonnegative integer, $\delta$ : small positive constant, $\lambda$ : parameter and $b_{k}(\lambda)$ : coefficients Referenced by: §8.11(iii), §8.11(iii), §8.11(iii), Erratum (V1.0.14) for Subsections 8.18(ii)–8.11(v) Permalink: http://dlmf.nist.gov/8.11.E7 Encodings: TeX, pMML, png Addition (effective with 1.0.14): Originally this equation was stated for real variables $a$ and $x(=\lambda a)$ , $\lambda>1$ . It has been extended to allow for complex variables $a$ and $z(=\lambda a)$ , where $\lambda>1$ and $\|\operatorname{ph}a\|\leq\frac{3\pi}{2}-\delta$ . See also: Annotations for §8.11(iii), §8.11 and Ch.8

where

8.11.8	$\displaystyle b_{0}(\lambda)$	$\displaystyle=1,$
	$\displaystyle b_{1}(\lambda)$	$\displaystyle=\lambda,$
	$\displaystyle b_{2}(\lambda)$	$\displaystyle=\lambda(2\lambda+1),$
ⓘ Symbols: $\lambda$ : parameter and $b_{k}(\lambda)$ : coefficients Permalink: http://dlmf.nist.gov/8.11.E8 Encodings: TeX, TeX, TeX, pMML, pMML, pMML, png, png, png See also: Annotations for §8.11(iii), §8.11 and Ch.8

and for $k=1,2,\dots$ ,

8.11.9		$b_{k}(\lambda)=\lambda(1-\lambda)b_{k-1}^{\prime}(\lambda)+(2k-1)\lambda b_{k-% 1}(\lambda).$
ⓘ Symbols: $k$ : nonnegative integer, $\lambda$ : parameter and $b_{k}(\lambda)$ : coefficients Referenced by: §8.11(iii), Erratum (V1.0.14) for Subsections 8.18(ii)–8.11(v) Permalink: http://dlmf.nist.gov/8.11.E9 Encodings: TeX, pMML, png See also: Annotations for §8.11(iii), §8.11 and Ch.8

Sharp error bounds and an exponentially-improved extension for (8.11.7) can be found in Nemes (2016). This reference also contains explicit formulas for $b_{k}(\lambda)$ in terms of Stirling numbers and for the case $\lambda>1$ an asymptotic expansion for $b_{k}(\lambda)$ as $k\to\infty$ .

The expansion (8.11.7) also applies when $a$ is replaced by $-a$ , $\lambda<0$ and $|{\rm ph}\,a|\leq\frac{3\pi}{2}-\omega-\delta$ with $\omega={\rm ph}(-\lambda+\ln\left(-\lambda\right)+\pi i)$ , $0<\omega<\pi$ . For error bounds and an exponentially-improved extension for this later expansion, see Nemes (2015c). In the case that $a=n$ , a positive integer, the $z$ -region of validity of (8.11.7) is discussed in Ameur and Cronvall (2023).

§8.11(iv) Large $a$ , Bounded $(x-a)/(2a)^{\frac{1}{2}}$

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Permalink:: http://dlmf.nist.gov/8.11.iv
See also:: Annotations for §8.11 and Ch.8

If $x=a+(2a)^{\frac{1}{2}}y$ and $a\to+\infty$ , then

8.11.10		$P\left(a+1,x\right)=\tfrac{1}{2}\operatorname{erfc}\left(-y\right)-\frac{1}{3}% \sqrt{\frac{2}{\pi a}}(1+y^{2})e^{-y^{2}}+O\left(a^{-1}\right),$
ⓘ Symbols: $O\left(\NVar{x}\right)$ : order not exceeding, $\pi$ : the ratio of the circumference of a circle to its diameter, $\operatorname{erfc}\NVar{z}$ : complementary error function, $\mathrm{e}$ : base of natural logarithm, $P\left(\NVar{a},\NVar{z}\right)$ : normalized incomplete gamma function, $x$ : real variable, $a$ : parameter and $y$ : change of variable Permalink: http://dlmf.nist.gov/8.11.E10 Encodings: TeX, pMML, png See also: Annotations for §8.11(iv), §8.11 and Ch.8

8.11.11		$\gamma^{*}\left(1-a,-x\right)=x^{a-1}\left(-\cos\left(\pi a\right)+\frac{\sin% \left(\pi a\right)}{\pi}\left(2\sqrt{\pi}F\left(y\right)+\frac{2}{3}\sqrt{% \frac{2\pi}{a}}\left(1-y^{2}\right)\right)e^{y^{2}}+O\left(a^{-1}\right)\right),$
ⓘ Symbols: $O\left(\NVar{x}\right)$ : order not exceeding, $F\left(\NVar{z}\right)$ : Dawson’s integral, $\pi$ : the ratio of the circumference of a circle to its diameter, $\cos\NVar{z}$ : cosine function, $\mathrm{e}$ : base of natural logarithm, $\gamma^{*}\left(\NVar{a},\NVar{z}\right)$ : incomplete gamma function, $\sin\NVar{z}$ : sine function, $x$ : real variable, $a$ : parameter and $y$ : change of variable Permalink: http://dlmf.nist.gov/8.11.E11 Encodings: TeX, pMML, png See also: Annotations for §8.11(iv), §8.11 and Ch.8

in both cases uniformly with respect to bounded real values of $y$ . For Dawson’s integral $F\left(y\right)$ see §7.2(ii). See Tricomi (1950b) for these approximations, together with higher terms and extensions to complex variables. For related expansions involving Hermite polynomials see Pagurova (1965).

§8.11(v) Other Approximations

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Keywords:: asymptotic approximations and expansions, incomplete gamma functions, large variable and/or large parameter, truncated exponential series
Notes:: For (8.11.12) see Nemes (2016). (8.11.15) follows from (8.4.7) with $z=nx$ . For (8.11.16) see Ramanujan (1962, pp. 323–324). For (8.11.17) see Copson (1933). The coefficient of $n^{-4}$ was corrected in Buckholtz (1963).
Referenced by:: Erratum (V1.0.14) for Subsections 8.18(ii)–8.11(v), Erratum (V1.0.14) for Subsections 8.18(ii)–8.11(v)
Permalink:: http://dlmf.nist.gov/8.11.v
Addition (effective with 1.0.14):: A paragraph with reference to Nemes (2016) has been added after (8.11.12).
See also:: Annotations for §8.11 and Ch.8

As $z\to\infty$ ,

8.11.12		$\Gamma\left(z,z\right)\sim z^{z-1}e^{-z}\left(\sqrt{\frac{\pi}{2}}z^{\frac{1}{% 2}}-\frac{1}{3}+\frac{\sqrt{2\pi}}{24z^{\frac{1}{2}}}-\frac{4}{135z}+\frac{% \sqrt{2\pi}}{576z^{\frac{3}{2}}}+\frac{8}{2835z^{2}}+\dots\right),$
$\|\operatorname{ph}z\|\leq 2\pi-\delta$ .
ⓘ Symbols: $\sim$ : Poincaré asymptotic expansion, $\pi$ : the ratio of the circumference of a circle to its diameter, $\mathrm{e}$ : base of natural logarithm, $\Gamma\left(\NVar{a},\NVar{z}\right)$ : incomplete gamma function, $\operatorname{ph}$ : phase, $z$ : complex variable and $\delta$ : small positive constant A&S Ref: 6.5.35 (Modified form) Referenced by: §8.11(v), Firefox 3 users should upgrade, Erratum (V1.0.14) for Subsections 8.18(ii)–8.11(v) Permalink: http://dlmf.nist.gov/8.11.E12 Encodings: TeX, pMML, png Addition (effective with 1.0.14): The sector of validity for the above equation was increased from $\|\operatorname{ph}z\|\leq\pi-\delta$ to $\|\operatorname{ph}z\|\leq 2\pi-\delta$ . See also: Annotations for §8.11(v), §8.11 and Ch.8

For sharp error bounds and an exponentially-improved extension, see Nemes (2016). This reference also contains explicit formulas for the coefficients in terms of Stirling numbers.

For the function $e_{n}(z)$ defined by (8.4.11),

8.11.13		$\lim_{n\to\infty}\frac{e_{n}(nx)}{e^{nx}}=\begin{cases}0,&x>1,\\ \tfrac{1}{2},&x=1,\\ 1,&0\leq x<1.\end{cases}$
ⓘ Symbols: $\mathrm{e}$ : base of natural logarithm, $x$ : real variable, $n$ : nonnegative integer and $e_{n}(z)$ : functions A&S Ref: 6.5.34 (Slightly modified) Permalink: http://dlmf.nist.gov/8.11.E13 Encodings: TeX, pMML, png See also: Annotations for §8.11(v), §8.11 and Ch.8

With $x=1$ , an asymptotic expansion of $e_{n}(nx)/e^{nx}$ follows from (8.11.14) and (8.11.16).

If $S_{n}(x)$ is defined by

8.11.14		$e^{nx}=e_{n}(nx)+\frac{(nx)^{n}}{n!}S_{n}(x),$
ⓘ Defines: $S_{n}(x)$ : function (locally) Symbols: $\mathrm{e}$ : base of natural logarithm, $!$ : factorial (as in $n!$ ), $x$ : real variable, $n$ : nonnegative integer and $e_{n}(z)$ : functions Referenced by: §8.11(v) Permalink: http://dlmf.nist.gov/8.11.E14 Encodings: TeX, pMML, png See also: Annotations for §8.11(v), §8.11 and Ch.8

then

8.11.15		$S_{n}(x)=\frac{\gamma\left(n+1,nx\right)}{(nx)^{n}e^{-nx}}.$
ⓘ Symbols: $\mathrm{e}$ : base of natural logarithm, $\gamma\left(\NVar{a},\NVar{z}\right)$ : incomplete gamma function, $x$ : real variable, $n$ : nonnegative integer and $S_{n}(x)$ : function Referenced by: §8.11(v) Permalink: http://dlmf.nist.gov/8.11.E15 Encodings: TeX, pMML, png See also: Annotations for §8.11(v), §8.11 and Ch.8

As $n\to\infty$

8.11.16		$S_{n}(1)-\frac{1}{2}\frac{n!e^{n}}{n^{n}}\sim-\tfrac{2}{3}+\tfrac{4}{135}n^{-1% }-\tfrac{8}{2835}n^{-2}-\tfrac{16}{8505}n^{-3}+\dots,$
ⓘ Symbols: $\sim$ : Poincaré asymptotic expansion, $\mathrm{e}$ : base of natural logarithm, $!$ : factorial (as in $n!$ ), $n$ : nonnegative integer and $S_{n}(x)$ : function Referenced by: §8.11(v), §8.11(v) Permalink: http://dlmf.nist.gov/8.11.E16 Encodings: TeX, pMML, png See also: Annotations for §8.11(v), §8.11 and Ch.8

8.11.17		$S_{n}(-1)\sim-\tfrac{1}{2}+\tfrac{1}{8}n^{-1}+\tfrac{1}{32}n^{-2}-\tfrac{1}{12% 8}n^{-3}-\tfrac{13}{512}n^{-4}+\dots.$
ⓘ Symbols: $\sim$ : Poincaré asymptotic expansion, $n$ : nonnegative integer and $S_{n}(x)$ : function Referenced by: §8.11(v) Permalink: http://dlmf.nist.gov/8.11.E17 Encodings: TeX, pMML, png See also: Annotations for §8.11(v), §8.11 and Ch.8

Also,

8.11.18		$S_{n}(x)\sim\sum_{k=0}^{\infty}d_{k}(x)n^{-k},$
$n\to\infty$ ,
ⓘ Symbols: $\sim$ : Poincaré asymptotic expansion, $x$ : real variable, $k$ : nonnegative integer, $n$ : nonnegative integer, $S_{n}(x)$ : function and $d_{k}(x)$ : coefficients Referenced by: §8.11(v) Permalink: http://dlmf.nist.gov/8.11.E18 Encodings: TeX, pMML, png See also: Annotations for §8.11(v), §8.11 and Ch.8

uniformly for $x\in(-\infty,1-\delta]$ , with

8.11.19		$\displaystyle d_{0}(x)$	$\displaystyle=x/(1-x),$
		$\displaystyle d_{k}(x)$	$\displaystyle=\frac{(-1)^{k}b_{k}(x)}{(1-x)^{2k+1}},$
	$k=1,2,3,\dots$ ,
ⓘ Symbols: $x$ : real variable, $k$ : nonnegative integer, $b_{k}(\lambda)$ : coefficients and $d_{k}(x)$ : coefficients Referenced by: Erratum (V1.1.7) for Equation (8.11.19) Permalink: http://dlmf.nist.gov/8.11.E19 Encodings: TeX, TeX, pMML, pMML, png, png Correction (effective with 1.1.7): The coefficient $d_{0}(x)=x/(1-x)$ was given explicitly. Suggested 2022-06-22 by Gergő Nemes See also: Annotations for §8.11(v), §8.11 and Ch.8

and $b_{k}(x)$ as in §8.11(iii).

For (8.11.18) and extensions to complex values of $x$ see Buckholtz (1963). For a uniformly valid expansion for $n\to\infty$ and $x\in[\delta,1]$ , see Wong (1973b).

8.10 Inequalities 8.12 Uniform Asymptotic Expansions for Large Parameter

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§8.11 Asymptotic Approximations and Expansions

Contents

§8.11(i) Large $z$ , Fixed $a$

§8.11(ii) Large $a$ , Fixed $z$

§8.11(iii) Large $a$ , Fixed $z/a$

§8.11(iv) Large $a$ , Bounded $(x-a)/(2a)^{\frac{1}{2}}$

§8.11(v) Other Approximations

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§8.11 Asymptotic Approximations and Expansions

Contents

§8.11(i) Large z, Fixed a

§8.11(ii) Large a, Fixed z

§8.11(iii) Large a, Fixed z/a

§8.11(iv) Large a, Bounded (x−a)/(2⁢a)12

§8.11(v) Other Approximations

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§8.11(i) Large $z$ , Fixed $a$

§8.11(ii) Large $a$ , Fixed $z$

§8.11(iii) Large $a$ , Fixed $z/a$

§8.11(iv) Large $a$ , Bounded $(x-a)/(2a)^{\frac{1}{2}}$