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spheroidal wave functions

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31: Bibliography H
  • S. Hanish, R. V. Baier, A. L. Van Buren, and B. J. King (1970) Tables of Radial Spheroidal Wave Functions, Vols. 1-3, Prolate, m = 0 , 1 , 2 ; Vols. 4-6, Oblate, m = 0 , 1 , 2 . Technical report Naval Research Laboratory, Washington, D.C..
    Notes:
    NRL Reports 7088-7093
    External Links:
    ZentralBlatt
    Referenced by:
    3rd item.
    Encodings:
    BibTeX
    • 32: Bibliography
  • M. Abramowitz (1949) Asymptotic expansions of spheroidal wave functions. J. Math. Phys. Mass. Inst. Tech. 28, pp. 195–199.
    External Links:
    MathReview (J. G. van der Corput), ZentralBlatt
    Referenced by:
    §30.9(iii).
    Encodings:
    BibTeX
    • 33: Bibliography L
  • L.-W. Li, T. S. Yeo, P. S. Kooi, and M. S. Leong (1998b) Microwave specific attenuation by oblate spheroidal raindrops: An exact analysis of TCS’s in terms of spheroidal wave functions. J. Electromagn. Waves Appl. 12 (6), pp. 709–711.
    External Links:
    ISSN 0920-5071, Document, MathReview
    Referenced by:
    §30.14(v).
    Encodings:
    BibTeX
    • 34: Bibliography K
  • B. J. King and A. L. Van Buren (1973) A general addition theorem for spheroidal wave functions. SIAM J. Math. Anal. 4 (1), pp. 149–160.
    External Links:
    Document, MathReview (J. Meixner), ZentralBlatt
    Referenced by:
    §30.10.
    Encodings:
    BibTeX
    • 35: Bibliography C
  • W. C. Connett, C. Markett, and A. L. Schwartz (1993) Product formulas and convolutions for angular and radial spheroidal wave functions. Trans. Amer. Math. Soc. 338 (2), pp. 695–710.
    External Links:
    ISSN 0002-9947, FullText, MathReview (Jean-Claude Lucquiaud), ZentralBlatt
    Referenced by:
    §30.10, §30.11(vi).
    Encodings:
    BibTeX
    • 36: Bibliography J
  • D. L. Jagerman (1974) Some properties of the Erlang loss function. Bell System Tech. J. 53, pp. 525–551.
    External Links:
    ISSN 0005-8580, MathReview (U. Narayan Bhat), ZentralBlatt
    Referenced by:
    §8.23.
    Encodings:
    BibTeX
  • H. Jeffreys (1928) The effect on Love waves of heterogeneity in the lower layer. Monthly Notices Roy. Astronom. Soc. Geophysical Supplement 2, pp. 101–111.
    External Links:
    ZentralBlatt
    Referenced by:
    §9.1.
    Encodings:
    BibTeX
  • D. S. Jones (1986) Acoustic and Electromagnetic Waves. Oxford Science Publications, The Clarendon Press Oxford University Press, New York.
    External Links:
    ISBN 0-19-853365-9, MathReview (John A. DeSanto)
    Referenced by:
    §10.73(i).
    Encodings:
    BibTeX
  • D. S. Jones (2001) Asymptotics of the hypergeometric function. Math. Methods Appl. Sci. 24 (6), pp. 369–389.
    External Links:
    ISSN 0170-4214, Document, MathReview, ZentralBlatt
    Referenced by:
    §14.15(iii), §15.12(iii).
    Encodings:
    BibTeX
  • S. Jorna and C. Springer (1971) Derivation of Green-type, transitional and uniform asymptotic expansions from differential equations. V. Angular oblate spheroidal wavefunctions p s ¯ n r ( η , h ) and q s ¯ n r ( η , h ) for large h . Proc. Roy. Soc. London Ser. A 321, pp. 545–555.
    External Links:
    FullText, MathReview, ZentralBlatt
    Referenced by:
    §30.9(ii).
    Encodings:
    BibTeX
    • 37: Bibliography D
  • L. Dekar, L. Chetouani, and T. F. Hammann (1999) Wave function for smooth potential and mass step. Phys. Rev. A 59 (1), pp. 107–112.
    External Links:
    Document
    Referenced by:
    §15.18.
    Encodings:
    BibTeX
  • T. M. Dunster (1986) Uniform asymptotic expansions for prolate spheroidal functions with large parameters. SIAM J. Math. Anal. 17 (6), pp. 1495–1524.
    External Links:
    ISSN 0036-1410, Document, MathReview (R. K. Gupta), ZentralBlatt
    Referenced by:
    §30.9(i).
    Encodings:
    BibTeX
  • T. M. Dunster (1992) Uniform asymptotic expansions for oblate spheroidal functions I: Positive separation parameter λ . Proc. Roy. Soc. Edinburgh Sect. A 121 (3-4), pp. 303–320.
    External Links:
    ISSN 0308-2105, MathReview (Archibald D. MacGillivray), ZentralBlatt
    Referenced by:
    §30.9(ii).
    Encodings:
    BibTeX
  • T. M. Dunster (1995) Uniform asymptotic expansions for oblate spheroidal functions II: Negative separation parameter λ . Proc. Roy. Soc. Edinburgh Sect. A 125 (4), pp. 719–737.
    External Links:
    ISSN 0308-2105, MathReview (Archibald D. MacGillivray), ZentralBlatt
    Referenced by:
    §30.9(ii).
    Encodings:
    BibTeX
  • A. Dzieciol, S. Yngve, and P. O. Fröman (1999) Coulomb wave functions with complex values of the variable and the parameters. J. Math. Phys. 40 (12), pp. 6145–6166.
    External Links:
    ISSN 0022-2488, Document, MathReview (Raj Wilson), ZentralBlatt
    Referenced by:
    §33.13.
    Encodings:
    BibTeX
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