Barnes’ G-function

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11: 13.16 Integral Representations

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§13.16(iii) Mellin–Barnes Integrals

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12: Bibliography P

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R. B. Paris and D. Kaminski (2001) Asymptotics and Mellin-Barnes Integrals. Cambridge University Press, Cambridge.

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External Links:: ISBN 0-521-79001-8, MathReview, ZentralBlatt
Referenced by:: §1.14(iv), §10.32(iii), §10.32(ii), §10.46, §10.9(iii), §10.9(ii), §16.11(i), §16.11(ii), §2.10(iii), §2.11(iii), §2.11(v), §2.5(ii), §2.5(ii), Ch.2, §24.7(ii), §25.9, §5.11(ii), §5.11(iii), §5.13, §5.19(ii), §5.6(ii), Ch.5, §8.6(ii), Profile Richard B. Paris.
Encodings:: BibTeX

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R. B. Paris (1992b) Smoothing of the Stokes phenomenon using Mellin-Barnes integrals. J. Comput. Appl. Math. 41 (1-2), pp. 117–133.

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External Links:: ISSN 0377-0427, Document, MathReview (Anatoly Kilbas), ZentralBlatt
Referenced by:: §2.11(v).
Encodings:: BibTeX

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13: 7.7 Integral Representations

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Mellin–Barnes Integrals

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14: 11.5 Integral Representations

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Mellin–Barnes Integrals

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15: 10.32 Integral Representations

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Mellin–Barnes Type

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Mellin–Barnes Type

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16: 13.4 Integral Representations

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§13.4(iii) Mellin–Barnes Integrals

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17: 14.17 Integrals

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§14.17(ii) Barnes’ Integral

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18: 15.6 Integral Representations

§15.6 Integral Representations

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See accompanying text — Figure 15.6.1: $t$ -plane. … Magnify

19: Bibliography N

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G. Nemes (2014a) Error bounds and exponential improvement for the asymptotic expansion of the Barnes

G

-function. Proc. R. Soc. Lond. Ser. A Math. Phys. Eng. Sci. 470 (2172), pp. 20140534, 14.

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External Links:: ISSN 1364-5021, MathReview (Mehdi Hassani), ZentralBlatt
Referenced by:: §5.17, §5.17.
Encodings:: BibTeX

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20: 8.19 Generalized Exponential Integral

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8.19.4

E_{p}\left(z\right)=\frac{z^{p-1}e^{-z}}{\Gamma\left(p\right)}\int_{0}^{\infty% }\frac{t^{p-1}e^{-zt}}{1+t}\,\mathrm{d}t,

|\operatorname{ph}z|<\tfrac{1}{2}\pi

\Re p>0

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Symbols:: $\Gamma\left(\NVar{z}\right)$ : gamma function, $\pi$ : the ratio of the circumference of a circle to its diameter, $\,\mathrm{d}\NVar{x}$ : differential of $x$ , $\mathrm{e}$ : base of natural logarithm, $E_{\NVar{p}}\left(\NVar{z}\right)$ : generalized exponential integral, $\int$ : integral, $\operatorname{ph}$ : phase, $\Re$ : real part, $z$ : complex variable and $p$ : parameter
Keywords:: Laplace transform, Mellin transform
Permalink:: http://dlmf.nist.gov/8.19.E4
Encodings:: pMML, png, TeX
See also:: Annotations for §8.19(i), §8.19(i), §8.19 and Ch.8

►Integral representations of Mellin–Barnes type for

E_{p}\left(z\right)

follow immediately from (8.6.11), (8.6.12), and (8.19.1). …