elliptic-function form

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11—20 of 274 matching pages

11: 15.14 Integrals

… ►Integrals of the form

\int x^{\alpha}(x+t)^{\beta}F\left(a,b;c;x\right)\,\mathrm{d}x

and more complicated forms are given in Apelblat (1983, pp. 370–387), Prudnikov et al. (1990, §§1.15 and 2.21), Gradshteyn and Ryzhik (2000, §7.5) and Koornwinder (2015). …

12: 33.5 Limiting Forms for Small $\rho$ , Small $|\eta|$ , or Large $\ell$

§33.5 Limiting Forms for Small $\rho$ , Small $|\eta|$ , or Large $\ell$

►

§33.5(i) Small $\rho$

… ►

§33.5(iii) Small $|\eta|$

… ►

§33.5(iv) Large $\ell$

…

13: 8.23 Statistical Applications

… ►Particular forms are the chi-square distribution functions; see Johnson et al. (1994, pp. 415–493). …

14: 10.29 Recurrence Relations and Derivatives

… ►For results on modified quotients of the form

\ifrac{z\mathscr{Z}_{\nu\pm 1}\left(z\right)}{\mathscr{Z}_{\nu}\left(z\right)}

see Onoe (1955) and Onoe (1956). ►

§10.29(ii) Derivatives

…

16: 13.27 Mathematical Applications

… ►The elements of this group are of the form …

17: 26.5 Lattice Paths: Catalan Numbers

… ►

§26.5(iv) Limiting Forms

…

Maple. isprime combines a strong pseudoprime test and a Lucas pseudoprime test. ifactor uses cfrac (§27.19) after exhausting trial division. Brent–Pollard rho, Square Forms Factorization, and ecm are available also; see §27.19.

…

19: 18.32 OP’s with Respect to Freud Weights

… ►A Freud weight is a weight function of the form … ►Generalized Freud weights have the form … ►All of these forms appear in applications, see §18.39(iii) and Table 18.39.1, albeit sometimes with

x\in[0,\infty)

, where the term half-Freud weight is used; or on

x\in[-1,1]

[0,1]

, where the term Rys weight is employed, see Rys et al. (1983). …

20: 28.15 Expansions for Small $q$

§28.15 Expansions for Small $q$

… ►

28.15.1

\lambda_{\nu}\left(q\right)=\nu^{2}+\frac{1}{2(\nu^{2}-1)}q^{2}+\frac{5\nu^{2}% +7}{32(\nu^{2}-1)^{3}(\nu^{2}-4)}q^{4}+\frac{9\nu^{4}+58\nu^{2}+29}{64(\nu^{2}% -1)^{5}(\nu^{2}-4)(\nu^{2}-9)}q^{6}+\cdots.

ⓘ

Symbols:: $\lambda_{\NVar{\nu+2n}}\left(\NVar{q}\right)$ : eigenvalues of Mathieu equation, $q=h^{2}$ : parameter and $\nu$ : complex parameter
A&S Ref:: 20.3.15 (in slightly different form)
Permalink:: http://dlmf.nist.gov/28.15.E1
Encodings:: pMML, png, TeX
See also:: Annotations for §28.15(i), §28.15 and Ch.28

…

elliptic-function form

11—20 of 274 matching pages

11: 15.14 Integrals

12: 33.5 Limiting Forms for Small $\rho$ , Small $|\eta|$ , or Large $\ell$

§33.5 Limiting Forms for Small $\rho$ , Small $|\eta|$ , or Large $\ell$

§33.5(i) Small $\rho$

§33.5(iii) Small $|\eta|$

§33.5(iv) Large $\ell$

13: 8.23 Statistical Applications

14: 10.29 Recurrence Relations and Derivatives

§10.29(ii) Derivatives

15: 10.30 Limiting Forms

§10.30 Limiting Forms

§10.30(i) $z\to 0$

16: 13.27 Mathematical Applications

17: 26.5 Lattice Paths: Catalan Numbers

§26.5(iv) Limiting Forms

18: 27.22 Software

19: 18.32 OP’s with Respect to Freud Weights

20: 28.15 Expansions for Small $q$

§28.15 Expansions for Small $q$

elliptic-function form

11—20 of 274 matching pages

11: 15.14 Integrals

12: 33.5 Limiting Forms for Small ρ , Small | η | , or Large ℓ

§33.5 Limiting Forms for Small ρ , Small | η | , or Large ℓ

§33.5(i) Small ρ

§33.5(iii) Small | η |

§33.5(iv) Large ℓ

13: 8.23 Statistical Applications

14: 10.29 Recurrence Relations and Derivatives

§10.29(ii) Derivatives

15: 10.30 Limiting Forms

§10.30 Limiting Forms

§10.30(i) z → 0

16: 13.27 Mathematical Applications

17: 26.5 Lattice Paths: Catalan Numbers

§26.5(iv) Limiting Forms

18: 27.22 Software

19: 18.32 OP’s with Respect to Freud Weights

20: 28.15 Expansions for Small q

§28.15 Expansions for Small q

12: 33.5 Limiting Forms for Small $\rho$ , Small $|\eta|$ , or Large $\ell$

§33.5 Limiting Forms for Small $\rho$ , Small $|\eta|$ , or Large $\ell$

§33.5(i) Small $\rho$

§33.5(iii) Small $|\eta|$

§33.5(iv) Large $\ell$

§10.30(i) $z\to 0$

20: 28.15 Expansions for Small $q$

§28.15 Expansions for Small $q$