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1: 22 Jacobian Elliptic Functions
Chapter 22 Jacobian Elliptic Functions
2: 34.6 Definition: 9 j Symbol
34.6.1 { j 11 j 12 j 13 j 21 j 22 j 23 j 31 j 32 j 33 } = all  m r s ( j 11 j 12 j 13 m 11 m 12 m 13 ) ( j 21 j 22 j 23 m 21 m 22 m 23 ) ( j 31 j 32 j 33 m 31 m 32 m 33 ) ( j 11 j 21 j 31 m 11 m 21 m 31 ) ( j 12 j 22 j 32 m 12 m 22 m 32 ) ( j 13 j 23 j 33 m 13 m 23 m 33 ) ,
Defines:
{ j 11 j 12 j 13 j 21 j 22 j 23 j 31 j 32 j 33 } : 9 j symbol
Symbols:
( j 1 j 2 j 3 m 1 m 2 m 3 ) : 3 j symbol, j , j r : non-negative integers or non-negative integers plus one half., r : nonnegative integer and s : integer
Permalink:
http://dlmf.nist.gov/34.6.E1
Encodings:
pMML, png, TeX
See also:
Annotations for §34.6 and Ch.34
34.6.2 { j 11 j 12 j 13 j 21 j 22 j 23 j 31 j 32 j 33 } = j ( 1 ) 2 j ( 2 j + 1 ) { j 11 j 21 j 31 j 32 j 33 j } { j 12 j 22 j 32 j 21 j j 23 } { j 13 j 23 j 33 j j 11 j 12 } .
3: 34.7 Basic Properties: 9 j Symbol
34.7.1 { j 11 j 12 j 13 j 21 j 22 j 13 j 31 j 31 0 } = ( 1 ) j 12 + j 21 + j 13 + j 31 ( ( 2 j 13 + 1 ) ( 2 j 31 + 1 ) ) 1 2 { j 11 j 12 j 13 j 22 j 21 j 31 } .
34.7.2 j 12 j 34 ( 2 j 12 + 1 ) ( 2 j 34 + 1 ) ( 2 j 13 + 1 ) ( 2 j 24 + 1 ) { j 1 j 2 j 12 j 3 j 4 j 34 j 13 j 24 j } { j 1 j 2 j 12 j 3 j 4 j 34 j 13 j 24 j } = δ j 13 , j 13 δ j 24 , j 24 .
34.7.3 j 13 j 24 ( 1 ) 2 j 2 + j 24 + j 23 j 34 ( 2 j 13 + 1 ) ( 2 j 24 + 1 ) { j 1 j 2 j 12 j 3 j 4 j 34 j 13 j 24 j } { j 1 j 3 j 13 j 4 j 2 j 24 j 14 j 23 j } = { j 1 j 2 j 12 j 4 j 3 j 34 j 14 j 23 j } .
34.7.4 ( j 13 j 23 j 33 m 13 m 23 m 33 ) { j 11 j 12 j 13 j 21 j 22 j 23 j 31 j 32 j 33 } = m r 1 , m r 2 , r = 1 , 2 , 3 ( j 11 j 12 j 13 m 11 m 12 m 13 ) ( j 21 j 22 j 23 m 21 m 22 m 23 ) ( j 31 j 32 j 33 m 31 m 32 m 33 ) ( j 11 j 21 j 31 m 11 m 21 m 31 ) ( j 12 j 22 j 32 m 12 m 22 m 32 ) .
Symbols:
{ j 11 j 12 j 13 j 21 j 22 j 23 j 31 j 32 j 33 } : 9 j symbol, ( j 1 j 2 j 3 m 1 m 2 m 3 ) : 3 j symbol, j , j r : non-negative integers or non-negative integers plus one half. and r : nonnegative integer
Referenced by:
Erratum (V1.0.10) for Equation (34.7.4)
Permalink:
http://dlmf.nist.gov/34.7.E4
Encodings:
pMML, png, TeX
Errata (effective with 1.0.10):
Originally the third 3 j symbol in the summation was written incorrectly as ( j 31 j 32 j 33 m 13 m 23 m 33 ) .

Reported 2015-01-19 by Yan-Rui Liu

See also:
Annotations for §34.7(vi), §34.7 and Ch.34
34.7.5 j ( 2 j + 1 ) { j 11 j 12 j j 21 j 22 j 23 j 31 j 32 j 33 } { j 11 j 12 j j 23 j 33 j } = ( 1 ) 2 j { j 21 j 22 j 23 j 12 j j 32 } { j 31 j 32 j 33 j j 11 j 21 } .
4: William P. Reinhardt
    • In November 2015, Reinhardt was named Senior Associate Editor of the DLMF and Associate Editor for Chapters 20, 22, and 23.
    5: DLMF Project News
    error generating summary
    6: Peter L. Walker
    • 7: Staff

  • William P. Reinhardt, University of Washington, Chaps. 20, 22, 23

  • Peter L. Walker, American University of Sharjah, Chaps. 20, 22, 23

  • William P. Reinhardt, University of Washington, for Chaps. 20, 22, 23

  • Peter L. Walker, American University of Sharjah, for Chaps. 20, 22, 23

    • 8: Bibliography T
  • N. M. Temme (1978) Uniform asymptotic expansions of confluent hypergeometric functions. J. Inst. Math. Appl. 22 (2), pp. 215–223.
    External Links:
    ISSN 0020-2932, Document, MathReview (F. W. J. Olver), ZentralBlatt
    Referenced by:
    §13.8(ii), §13.8(ii).
    Encodings:
    BibTeX
  • N.M. Temme and E.J.M. Veling (2022) Asymptotic expansions of Kummer hypergeometric functions with three asymptotic parameters a, b and z. Indagationes Mathematicae.
    External Links:
    ISSN 0019-3577, Document, Link
    Referenced by:
    §13.8(iv).
    Encodings:
    BibTeX
  • N. M. Temme (2022) Asymptotic expansions of Kummer hypergeometric functions for large values of the parameters. Integral Transforms Spec. Funct. 33 (1), pp. 16–31.
    External Links:
    ISSN 1065-2469, Document, Link, MathReview Entry, ZentralBlatt
    Referenced by:
    §13.8(iv).
    Encodings:
    BibTeX
  • R. F. Tooper and J. Mark (1968) Simplified calculation of Ei ( x ) for positive arguments, and a short table of Shi ( x ) . Math. Comp. 22 (102), pp. 448–449.
    External Links:
    FullText, Document, ZentralBlatt
    Referenced by:
    §6.18(i).
    Encodings:
    BibTeX
  • F. G. Tricomi (1949) Sul comportamento asintotico dell’ n -esimo polinomio di Laguerre nell’intorno dell’ascissa 4 n . Comment. Math. Helv. 22, pp. 150–167.
    External Links:
    ISSN 0010-2571, Document, MathReview (G. Szegő), ZentralBlatt
    Referenced by:
    §18.16(iv).
    Encodings:
    BibTeX
    • 9: 5.23 Approximations
    For additional approximations see Hart et al. (1968, Appendix B), Luke (1975, pp. 22–23), and Weniger (2003). … See Luke (1975, pp. 22–23) for additional expansions. …
    10: 26.2 Basic Definitions
    Table 26.2.1: Partitions p ( n ) .
    n p ( n ) n p ( n ) n p ( n )
    5 7 22 1002 39 31185
    8 22 25 1958 42 53174
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