A. Yu. Yeremin, I. E. Kaporin, and M. K. Kerimov (1988) Computation of the derivatives of the Riemann zeta-function in the complex domain. USSR Comput. Math. and Math. Phys. 28 (4), pp. 115–124.

â“˜

Notes:: Includes Fortran programs.
External Links:: Document, ZentralBlatt
Referenced by:: §25.18(i), §25.21(iii).
Encodings:: BibTeX

â–º

J. M. Yohe (1979) Software for interval arithmetic: A reasonably portable package. ACM Trans. Math. Software 5 (1), pp. 50–63.

â“˜

External Links:: ISSN 0098-3500, Document
Referenced by:: §4.48(ii).
Encodings:: BibTeX

…

3: 24.2 Definitions and Generating Functions

… â–º

Table 24.2.3: Bernoulli numbers

B_{n}=N/D

â–º â–º â–º â–º

$n$	$N$	$D$	$B_{n}$
…
$28$	$-2\;37494\;61029$	$870$	$-2.72982\;3107$	$\times 10^{7}$
…

â–º â–º

Table 24.2.4: Euler numbers

E_{n}

â–º â–º â–º â–º

$n$	$E_{n}$
…
$28$	$12522\;59641\;40362\;98654\;68285$
…

â–º â–º

Table 24.2.5: Coefficients

b_{n,k}

of the Bernoulli polynomials

B_{n}\left(x\right)=\sum_{k=0}^{n}b_{n,k}x^{k}

â–º â–º â–º â–º â–º

	$k$
$n$	$0$	$1$	$2$	$3$	$4$	$5$	$6$	$7$	$8$	$9$	$10$	$11$	$12$	$13$	$14$	$15$
…
$11$	$0$	$\tfrac{5}{6}$	$0$	$-\tfrac{11}{2}$	$0$	$11$	$0$	$-11$	$0$	$\tfrac{55}{6}$	$-\tfrac{11}{2}$	$1$
…

â–º â–º

Table 24.2.6: Coefficients

e_{n,k}

of the Euler polynomials

E_{n}\left(x\right)=\sum_{k=0}^{n}e_{n,k}x^{k}

â–º â–º â–º â–º

	$k$
$n$	$0$	$1$	$2$	$3$	$4$	$5$	$6$	$7$	$8$	$9$	$10$	$11$	$12$	$13$	$14$	$15$
…

â–º

4: 11 Struve and Related Functions

Chapter 11 Struve and Related Functions

…

5: Staff

… â–º

Richard B. Paris, University of Abertay, Chaps. 8, 11

… â–º

Gerhard Wolf, University of Duisberg-Essen, Chap. 28

… â–º

Richard B. Paris, University of Abertay Dundee, for Chaps. 8, 11 (deceased)

… â–º

Simon Ruijsenaars, University of Leeds, for Chaps. 5, 28

…

6: 26.6 Other Lattice Path Numbers

… â–º

Table 26.6.1: Delannoy numbers

D(m,n)

â–º â–º â–º â–º â–º

$m$	$n$
$m$	…
1	1	3	5	7	9	11	13	15	17	19	21
…
5	1	11	61	231	681	1683	3653	7183	13073	22363	36365
…

â–º … â–º

Table 26.6.2: Motzkin numbers

M(n)

â–º â–º â–º â–º

$n$	$M(n)$	$n$	$M(n)$	$n$	$M(n)$	$n$	$M(n)$	$n$	$M(n)$
…
3	4	7	127	11	5798	15	3â€„10572	19	181â€„99284

â–º … â–º

Table 26.6.3: Narayana numbers

N(n,k)

â–º â–º â–º â–º

$n$	$k$
$n$	…
8	0	1	28	196	490	490	196	28	1
…

â–º … â–º

Table 26.6.4: Schröder numbers

r(n)

â–º â–º â–º â–º

$n$	$r(n)$	$n$	$r(n)$	$n$	$r(n)$	$n$	$r(n)$	$n$	$r(n)$
…
$3$	$22$	$7$	$8558$	$11$	$52\;93446$	$15$	$39376\;03038$	$19$	$323\;67243\;17174$

â–º …

7: 27.2 Functions

… â–º

Table 27.2.1: Primes.

â–º â–º â–º â–º

$n$	$p_{n}$	$p_{n+10}$	$p_{n+20}$	$p_{n+30}$	$p_{n+40}$	$p_{n+50}$	$p_{n+60}$	$p_{n+70}$	$p_{n+80}$	$p_{n+90}$
…
5	11	47	97	149	197	257	313	379	439	499
…

â–º â–º

Table 27.2.2: Functions related to division.

â–º â–º â–º â–º â–º â–º â–º

$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$	$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$	$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$	$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$
…
2	1	2	3	15	8	4	24	28	12	6	56	41	40	2	42
3	2	2	4	16	8	5	31	29	28	2	30	42	12	8	96
…
11	10	2	12	24	8	8	60	37	36	2	38	50	20	6	93
12	4	6	28	25	20	3	31	38	18	4	60	51	32	4	72
…

â–º

8: 28 Mathieu Functions and Hill’s Equation

Chapter 28 Mathieu Functions and Hill’s Equation

…

9: 26.9 Integer Partitions: Restricted Number and Part Size

… â–º

Table 26.9.1: Partitions

p_{k}\left(n\right)

â–º â–º â–º â–º â–º â–º

$n$	$k$
$n$	…
6	0	1	4	7	9	10	11	11	11	11	11
7	0	1	4	8	11	13	14	15	15	15	15
…
9	0	1	5	12	18	23	26	28	29	30	30
…

â–º …

10: Bibliography B

… â–º

R. Barakat (1961) Evaluation of the incomplete gamma function of imaginary argument by Chebyshev polynomials. Math. Comp. 15 (73), pp. 7–11.

â“˜

External Links:: FullText, MathReview (J. C. P. Miller), ZentralBlatt
Referenced by:: §8.7.
Encodings:: BibTeX

… â–º

B. C. Berndt, S. Bhargava, and F. G. Garvan (1995) Ramanujan’s theories of elliptic functions to alternative bases. Trans. Amer. Math. Soc. 347 (11), pp. 4163–4244.

â“˜

External Links:: ISSN 0002-9947, FullText, MathReview (J. Borwein), ZentralBlatt
Referenced by:: §15.8(v), §20.11(iii).
Encodings:: BibTeX

… â–º

F. Bethuel (1998) Vortices in Ginzburg-Landau Equations. In Proceedings of the International Congress of Mathematicians, Vol. III (Berlin, 1998), pp. 11–19.

â“˜

External Links:: ISSN 1431-0643, FullText, MathReview Entry, ZentralBlatt
Referenced by:: §17.17.
Encodings:: BibTeX

… â–º

A. Bhattacharyya and L. Shafai (1988) Theoretical and experimental investigation of the elliptical annual ring antenna. IEEE Trans. Antennas and Propagation 36 (11), pp. 1526–1530.

â“˜

External Links:: Document
Referenced by:: 5th item.
Encodings:: BibTeX

… â–º

R. L. Bishop (1981) Rainbow over Woolsthorpe Manor. Notes and Records Roy. Soc. London 36 (1), pp. 3–11 (1 plate).

â“˜

External Links:: ISSN 0035-9149, Document, MathReview
Referenced by:: Sidebar 9.SB1.
Encodings:: BibTeX

…

$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$	$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$	$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$	$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$
…
2	1	2	3	15	8	4	24	28	12	6	56	41	40	2	42
3	2	2	4	16	8	5	31	29	28	2	30	42	12	8	96
…
11	10	2	12	24	8	8	60	37	36	2	38	50	20	6	93
12	4	6	28	25	20	3	31	38	18	4	60	51	32	4	72
…

$n$	$k$
$n$	…
6	0	1	4	7	9	10	11	11	11	11	11
7	0	1	4	8	11	13	14	15	15	15	15
…
9	0	1	5	12	18	23	26	28	29	30	30
…

$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$	$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$	$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$	$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$
…
2	1	2	3	15	8	4	24	28	12	6	56	41	40	2	42
3	2	2	4	16	8	5	31	29	28	2	30	42	12	8	96
…
11	10	2	12	24	8	8	60	37	36	2	38	50	20	6	93
12	4	6	28	25	20	3	31	38	18	4	60	51	32	4	72
…

$n$	$k$
$n$	…
6	0	1	4	7	9	10	11	11	11	11	11
7	0	1	4	8	11	13	14	15	15	15	15
…
9	0	1	5	12	18	23	26	28	29	30	30
…

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1—10 of 140 matching pages

1: 26.2 Basic Definitions

2: Bibliography Y

3: 24.2 Definitions and Generating Functions

4: 11 Struve and Related Functions

Chapter 11 Struve and Related Functions

5: Staff

6: 26.6 Other Lattice Path Numbers

7: 27.2 Functions

8: 28 Mathieu Functions and Hill’s Equation

Chapter 28 Mathieu Functions and Hill’s Equation

9: 26.9 Integer Partitions: Restricted Number and Part Size

10: Bibliography B

.ä¸–ç•Œæ¯ä¸å›½è¶³çƒé˜ŸæŽ’åã€Žç½‘å€:mxsty.ccã€.2010ä¸–ç•Œæ¯ç»å…¸ç”»é¢-m4x5s2-2022å¹´11æœˆ28æ—¥19æ—¶45åˆ†50ç§’ckoekkqwq

$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$	$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$	$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$	$n$	$\phi\left(n\right)$	$d\left(n\right)$	$\sigma\left(n\right)$
…
2	1	2	3	15	8	4	24	28	12	6	56	41	40	2	42
3	2	2	4	16	8	5	31	29	28	2	30	42	12	8	96
…
11	10	2	12	24	8	8	60	37	36	2	38	50	20	6	93
12	4	6	28	25	20	3	31	38	18	4	60	51	32	4	72
…

$n$	$k$
$n$	…
6	0	1	4	7	9	10	11	11	11	11	11
7	0	1	4	8	11	13	14	15	15	15	15
…
9	0	1	5	12	18	23	26	28	29	30	30
…