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1: Barry I. Schneider

… ►He joined the Theoretical Division of the Los Alamos National Laboratory (1972-1991) and then the National Science Foundation (1991-2013) where he was a Program Director in the Physics Division and then in the Office of Cyberinfrastructure. …

2: Bibliography D

… ►

B. Deconinck and H. Segur (1998) The KP equation with quasiperiodic initial data. Phys. D 123 (1-4), pp. 123–152.

ⓘ

Notes:: Nonlinear waves and solitons in physical systems (Los Alamos, NM, 1997)
External Links:: ISSN 0167-2789, Document, MathReview (Pavel Krejčí), ZentralBlatt
Referenced by:: §21.9.
Encodings:: BibTeX

…

3: Bibliography C

… ►

C. Chester, B. Friedman, and F. Ursell (1957) An extension of the method of steepest descents. Proc. Cambridge Philos. Soc. 53, pp. 599–611.

ⓘ

External Links:: MathReview (P. Henrici), ZentralBlatt
Referenced by:: §2.4(v).
Encodings:: BibTeX

… ►

L. Comtet (1974) Advanced Combinatorics: The Art of Finite and Infinite Expansions. enlarged edition, D. Reidel Publishing Co., Dordrecht.

ⓘ

Notes:: Revised and enlarged English translation by D. Reidel of Analyse Combinatoire, Tomes I, II, Presses Universitaires de France, Paris, 1970.
External Links:: ISBN 90-277-0441-4, MathReview, ZentralBlatt
Referenced by:: §26.3(i), §26.3(iii), §26.3(iv), §26.3(v), §26.4(i), §26.4(ii), §26.4(iii), §26.5(i), §26.5(ii), §26.5(iii), §26.6(i), §26.6(ii), §26.6(iii), §26.7(i), §26.7(ii), §26.7(iii), §26.8(i), §26.8(ii), §26.8(iv), §26.8(v), Ch.26.
Encodings:: BibTeX

…

4: 2.4 Contour Integrals

… ►

§2.4(v) Coalescing Saddle Points: Chester, Friedman, and Ursell’s Method

… ►For examples, proofs, and extensions see Olver (1997b, Chapter 9), Wong (1989, Chapter 7), Olde Daalhuis and Temme (1994), Chester et al. (1957), Bleistein and Handelsman (1975, Chapter 9), and Temme (2015). …

5: 26.21 Tables

… ►Andrews (1976) contains tables of the number of unrestricted partitions, partitions into odd parts, partitions into parts

\not\equiv\pm 2\pmod{5}

, partitions into parts

\not\equiv\pm 1\pmod{5}

, and unrestricted plane partitions up to 100. … ►Goldberg et al. (1976) contains tables of binomial coefficients to

n=100

and Stirling numbers to

n=40

6: Wadim Zudilin

… ►He has been an Associate Professor at Moscow State University (Russia), an Ostrowski Fellow at Institut Henri Poincaré and Université Paris 6 (France), a Humboldt Fellow at the Cologne University (Germany) and a Visiting Researcher at the Max Planck Institute for Mathematics in Bonn (Germany). …

7: 5.22 Tables

… ►Abramowitz and Stegun (1964, Chapter 6) tabulates

\Gamma\left(x\right)

\ln\Gamma\left(x\right)

\psi\left(x\right)

, and

\psi'\left(x\right)

for

x=1(.005)2

to 10D;

\psi''\left(x\right)

and

\psi^{(3)}\left(x\right)

for

x=1(.01)2

to 10D;

\Gamma\left(n\right)

\ifrac{1}{\Gamma\left(n\right)}

\Gamma\left(n+\tfrac{1}{2}\right)

\psi\left(n\right)

\operatorname{log}_{10}\Gamma\left(n\right)

\operatorname{log}_{10}\Gamma\left(n+\tfrac{1}{3}\right)

\operatorname{log}_{10}\Gamma\left(n+\tfrac{1}{2}\right)

, and

\operatorname{log}_{10}\Gamma\left(n+\tfrac{2}{3}\right)

for

n=1(1)101

to 8–11S;

\Gamma\left(n+1\right)

for

n=100(100)1000

to 20S. Zhang and Jin (1996, pp. 67–69 and 72) tabulates

\Gamma\left(x\right)

\ifrac{1}{\Gamma\left(x\right)}

\Gamma\left(-x\right)

\ln\Gamma\left(x\right)

\psi\left(x\right)

\psi\left(-x\right)

\psi'\left(x\right)

, and

\psi'\left(-x\right)

for

x=0(.1)5

to 8D or 8S;

\Gamma\left(n+1\right)

for

n=0(1)100(10)250(50)500(100)3000

to 51S. …

8: 24.20 Tables

… ►Abramowitz and Stegun (1964, Chapter 23) includes exact values of

\sum_{k=1}^{m}k^{n}

m=1(1)100

n=1(1)10

;

\sum_{k=1}^{\infty}k^{-n}

\sum_{k=1}^{\infty}(-1)^{k-1}k^{-n}

\sum_{k=0}^{\infty}(2k+1)^{-n}

n=1,2,\dotsc

, 20D;

\sum_{k=0}^{\infty}(-1)^{k}(2k+1)^{-n}

n=1,2,\dotsc

, 18D. …

9: 6.19 Tables

… ►

•

Zhang and Jin (1996, pp. 652, 689) includes $\operatorname{Si}\left(x\right)$ , $\operatorname{Ci}\left(x\right)$ , $x=0(.5)20(2)30$ , 8D; $\operatorname{Ei}\left(x\right)$ , $E_{1}\left(x\right)$ , $x=[0,100]$ , 8S.

… ►

•

Zhang and Jin (1996, pp. 690–692) includes the real and imaginary parts of $E_{1}\left(z\right)$ , $\pm x=0.5,1,3,5,10,15,20,50,100$ , $y=0(.5)1(1)5(5)30,50,100$ , 8S.

10: 8.26 Tables

… ►

•

Zhang and Jin (1996, Table 3.8) tabulates $\gamma\left(a,x\right)$ for $a=0.5,1,3,5,10,25,50,100$ , $x=0(.1)1(1)3,5(5)30,50,100$ to 8D or 8S.

… ►

•

Zhang and Jin (1996, Table 19.1) tabulates $E_{n}\left(x\right)$ for $n=1,2,3,5,10,15,20$ , $x=0(.1)1,1.5,2,3,5,10,20,30,50,100$ to 7D or 8S.