M. Rahman (1981) A non-negative representation of the linearization coefficients of the product of Jacobi polynomials. Canad. J. Math. 33 (4), pp. 915–928.

ⓘ

External Links:: ISSN 0008-414X, Document, Link, MathReview (R. A. Askey), ZentralBlatt
Referenced by:: §18.18(v).
Encodings:: BibTeX

… ►

W. Reinhardt (1982) Complex Coordinates in the Theory of Atomic and Molecular Structure and Dynamics. Annual Review of Physical Chemistry 33, pp. 223–255.

ⓘ

Referenced by:: §1.18(viii).
Encodings:: BibTeX

… ►

S. O. Rice (1954) Diffraction of plane radio waves by a parabolic cylinder. Calculation of shadows behind hills. Bell System Tech. J. 33, pp. 417–504.

ⓘ

External Links:: MathReview (J. Shmoys)
Referenced by:: §12.17.
Encodings:: BibTeX

…

28: 23.21 Physical Applications

…

29: 28.26 Asymptotic Approximations for Large $q$

… ►

28.26.4

\mathrm{Fc}_{m}\left(z,h\right)\sim 1+\dfrac{s}{8h{\cosh}^{2}z}+\dfrac{1}{2^{1% 1}h^{2}}\left(\dfrac{s^{4}+86s^{2}+105}{{\cosh}^{4}z}-\dfrac{s^{4}+22s^{2}+57}% {{\cosh}^{2}z}\right)+\dfrac{1}{2^{14}h^{3}}\left(-\dfrac{s^{5}+14s^{3}+33s}{{% \cosh}^{2}z}-\dfrac{2s^{5}+124s^{3}+1122s}{{\cosh}^{4}z}+\dfrac{3s^{5}+290s^{3% }+1627s}{{\cosh}^{6}z}\right)+\cdots,

ⓘ

Symbols:: $\sim$ : Poincaré asymptotic expansion, $\cosh\NVar{z}$ : hyperbolic cosine function, $m$ : integer, $h$ : parameter and $z$ : complex variable
A&S Ref:: 20.9.9 (in slightly different notation)
Referenced by:: §28.26(i)
Permalink:: http://dlmf.nist.gov/28.26.E4
Encodings:: pMML, png, TeX
See also:: Annotations for §28.26(i), §28.26 and Ch.28

…

30: 18.39 Applications in the Physical Sciences

… ►The spectrum is mixed, as in §1.18(viii), the positive energy, non-

L^{2}

, scattering states are the subject of Chapter 33. … ►Namely for fixed

l

the infinite set labeled by

p

describe only the

L^{2}

bound states for that single

l

, omitting the continuum briefly mentioned below, and which is the subject of Chapter 33, and so an unusual example of the mixed spectra of §1.18(viii). … ►This is also the normalization and notation of Chapter 33 for

Z=1

, and the notation of Weinberg (2013, Chapter 2). … ►As the scattering eigenfunctions of Chapter 33, are not OP’s, their further discussion is deferred to §18.39(iv), where discretized representations of these scattering states are introduced, Laguerre and Pollaczek OP’s then playing a key role. … ►The Coulomb–Pollaczek polynomials provide alternate representations of the positive energy Coulomb wave functions of Chapter 33. …

体育投注平台,2022年世界杯体育投注平台,体育博彩公司,【体育博彩网址∶33kk66.com】2022年世界杯赌球网站,体育博彩网站,博彩平台推荐,网上体育投注平台,赌球平台推荐【复制打开∶33kk66.com】

21—30 of 56 matching pages

21: 26.2 Basic Definitions

22: 34.1 Special Notation

23: 1.3 Determinants, Linear Operators, and Spectral Expansions

24: 30.9 Asymptotic Approximations and Expansions

25: 28.11 Expansions in Series of Mathieu Functions

26: 29.7 Asymptotic Expansions

27: Bibliography R

28: 23.21 Physical Applications

29: 28.26 Asymptotic Approximations for Large $q$

30: 18.39 Applications in the Physical Sciences

体育投注平台,2022年世界杯体育投注平台,体育博彩公司,【体育博彩网址∶33kk66.com】2022年世界杯赌球网站,体育博彩网站,博彩平台推荐,网上体育投注平台,赌球平台推荐【复制打开∶33kk66.com】

21—30 of 56 matching pages

21: 26.2 Basic Definitions

22: 34.1 Special Notation

23: 1.3 Determinants, Linear Operators, and Spectral Expansions

24: 30.9 Asymptotic Approximations and Expansions

25: 28.11 Expansions in Series of Mathieu Functions

26: 29.7 Asymptotic Expansions

27: Bibliography R

28: 23.21 Physical Applications

29: 28.26 Asymptotic Approximations for Large q

30: 18.39 Applications in the Physical Sciences

29: 28.26 Asymptotic Approximations for Large $q$