triconfluent Heun equation

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1: 31.2 Differential Equations

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§31.2(i) Heun’s Equation

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31.2.1

\frac{{\mathrm{d}}^{2}w}{{\mathrm{d}z}^{2}}+\left(\frac{\gamma}{z}+\frac{% \delta}{z-1}+\frac{\epsilon}{z-a}\right)\frac{\mathrm{d}w}{\mathrm{d}z}+\frac{% \alpha\beta z-q}{z(z-1)(z-a)}w=0,

\alpha+\beta+1=\gamma+\delta+\epsilon

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Symbols:: $\frac{\mathrm{d}\NVar{f}}{\mathrm{d}\NVar{x}}$ : derivative of $f$ with respect to $x$ , $z$ : complex variable, $\gamma$ : real or complex parameter, $\delta$ : real or complex parameter, $\epsilon$ : real or complex parameter, $a$ : complex parameter, $q$ : real or complex parameter, $\alpha$ : real or complex parameter and $\beta$ : real or complex parameter
Referenced by:: §29.2(ii), §31.11(iii), §31.12, §31.13, §31.14(i), §31.17(i), §31.18, §31.2(v), §31.2(v), §31.2(v), §31.2(i), §31.3(i), §31.3(i), §31.3(ii), §31.3(ii), §31.3(ii), §31.3(iii), §31.3(iii), §31.4, §31.5, §31.6, §31.7(ii), §31.8, §31.8, §31.8
Permalink:: http://dlmf.nist.gov/31.2.E1
Encodings:: pMML, png, TeX
See also:: Annotations for §31.2(i), §31.2 and Ch.31

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§31.2(ii) Normal Form of Heun’s Equation

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§31.2(v) Heun’s Equation Automorphisms

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Composite Transformations

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2: 31.1 Special Notation

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$x$ , $y$	real variables.
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►The main functions treated in this chapter are

\mathit{H\!\ell}\left(a,q;\alpha,\beta,\gamma,\delta;z\right)

(s_{1},s_{2})\mathit{Hf}_{m}\left(a,q_{m};\alpha,\beta,\gamma,\delta;z\right)

(s_{1},s_{2})\mathit{Hf}_{m}^{\nu}\left(a,q_{m};\alpha,\beta,\gamma,\delta;z\right)

, and the polynomial

\mathit{Hp}_{n,m}\left(a,q_{n,m};-n,\beta,\gamma,\delta;z\right)

. …Sometimes the parameters are suppressed.

3: 31.5 Solutions Analytic at Three Singularities: Heun Polynomials

§31.5 Solutions Analytic at Three Singularities: Heun Polynomials

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31.5.2

\mathit{Hp}_{n,m}\left(a,q_{n,m};-n,\beta,\gamma,\delta;z\right)=\mathit{H\!% \ell}\left(a,q_{n,m};-n,\beta,\gamma,\delta;z\right)

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Defines:: $\mathit{Hp}_{\NVar{n},\NVar{m}}\left(\NVar{a},\NVar{q_{n,m}};\NVar{-n},\NVar{% \beta},\NVar{\gamma},\NVar{\delta};\NVar{z}\right)$ : Heun polynomials
Symbols:: $\mathit{H\!\ell}\left(\NVar{a},\NVar{q};\NVar{\alpha},\NVar{\beta},\NVar{% \gamma},\NVar{\delta};\NVar{z}\right)$ : Heun functions, $z$ : complex variable, $\gamma$ : real or complex parameter, $\delta$ : real or complex parameter, $m$ : nonnegative integer, $n$ : nonnegative integer, $a$ : complex parameter, $q$ : real or complex parameter and $\beta$ : real or complex parameter
Permalink:: http://dlmf.nist.gov/31.5.E2
Encodings:: pMML, png, TeX
See also:: Annotations for §31.5 and Ch.31

… ►These solutions are the Heun polynomials. …

4: 29.2 Differential Equations

§29.2 Differential Equations

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§29.2(i) Lamé’s Equation

… ►For the Weierstrass function

\wp

see §23.2(ii). ►Equation (29.2.10) is a special case of Heun’s equation (31.2.1).

5: 30.2 Differential Equations

§30.2 Differential Equations

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§30.2(i) Spheroidal Differential Equation

… ► … ►The Liouville normal form of equation (30.2.1) is … ►

§30.2(iii) Special Cases

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6: 15.10 Hypergeometric Differential Equation

§15.10 Hypergeometric Differential Equation

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§15.10(i) Fundamental Solutions

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15.10.1

z(1-z)\frac{{\mathrm{d}}^{2}w}{{\mathrm{d}z}^{2}}+\left(c-(a+b+1)z\right)\frac% {\mathrm{d}w}{\mathrm{d}z}-abw=0.

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Symbols:: $\frac{\mathrm{d}\NVar{f}}{\mathrm{d}\NVar{x}}$ : derivative of $f$ with respect to $x$ , $z$ : complex variable, $a$ : real or complex parameter, $b$ : real or complex parameter and $c$ : real or complex parameter
Referenced by:: §15.11(i), §15.11(i), §15.17(ii), §15.19(ii), §15.2(ii), §15.5(ii), §16.13, §17.6(iv), §19.18(ii), §19.4(ii)
Permalink:: http://dlmf.nist.gov/15.10.E1
Encodings:: pMML, png, TeX
See also:: Annotations for §15.10(i), §15.10 and Ch.15

►This is the hypergeometric differential equation. … ► …

7: 32.2 Differential Equations

§32.2 Differential Equations

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§32.2(i) Introduction

►The six Painlevé equations

\mbox{P}_{\mbox{\scriptsize I}}

–

\mbox{P}_{\mbox{\scriptsize VI}}

are as follows: … ►

§32.2(ii) Renormalizations

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8: 28.2 Definitions and Basic Properties

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§28.2(i) Mathieu’s Equation

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28.2.1

w^{\prime\prime}+(a-2q\cos\left(2z\right))w=0.

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Symbols:: $\cos\NVar{z}$ : cosine function, $q=h^{2}$ : parameter, $z$ : complex variable, $a$ : parameter and $w(z)$ : Mathieu’s equation solution
A&S Ref:: 20.3.1 20.1.1 (in slightly different form)
Referenced by:: §1.18(vii), Figure 28.17.1, Figure 28.17.1, §28.17, §28.17, §28.2(ii), §28.2(ii), §28.2(iii), §28.2(iv), §28.20(i), §28.29(i), §28.32(i), §28.32(i), 1st item, 2nd item, §28.33(iii), item (a), item (c), item (c), §28.5(i), §28.8(iv), §28.8(iv), §28.8(iv), §30.2(iii)
Permalink:: http://dlmf.nist.gov/28.2.E1
Encodings:: pMML, png, TeX
See also:: Annotations for §28.2(i), §28.2 and Ch.28

… ►This is the characteristic equation of Mathieu’s equation (28.2.1). … ►

§28.2(iv) Floquet Solutions

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9: 28.20 Definitions and Basic Properties

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§28.20(i) Modified Mathieu’s Equation

►When

z

is replaced by

\pm\mathrm{i}z

, (28.2.1) becomes the modified Mathieu’s equation: ►

28.20.1

w^{\prime\prime}-\left(a-2q\cosh\left(2z\right)\right)w=0,

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Symbols:: $\cosh\NVar{z}$ : hyperbolic cosine function, $q=h^{2}$ : parameter, $z$ : complex variable, $a$ : parameter and $w(z)$ : Mathieu’s equation solution
A&S Ref:: 20.1.2 (in slightly different form) 20.8.6
Referenced by:: §28.20(iii), §28.32(i), 1st item, 2nd item, item (b), §28.8(iv), §28.8(iv)
Permalink:: http://dlmf.nist.gov/28.20.E1
Encodings:: pMML, png, TeX
See also:: Annotations for §28.20(i), §28.20 and Ch.28

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28.20.2

{(\zeta^{2}-1)w^{\prime\prime}+\zeta w^{\prime}+\left(4q\zeta^{2}-2q-a\right)w% =0},

\zeta=\cosh z

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Symbols:: $\cosh\NVar{z}$ : hyperbolic cosine function, $q=h^{2}$ : parameter, $z$ : complex variable, $a$ : parameter and $w(z)$ : Mathieu’s equation solution
Referenced by:: §28.20(iii)
Permalink:: http://dlmf.nist.gov/28.20.E2
Encodings:: pMML, png, TeX
See also:: Annotations for §28.20(i), §28.20 and Ch.28

… ►Then from §2.7(ii) it is seen that equation (28.20.2) has independent and unique solutions that are asymptotic to

\zeta^{\ifrac{1}{2}}e^{\pm 2\mathrm{i}h\zeta}

\zeta\to\infty

in the respective sectors

|\operatorname{ph}\left(\mp\mathrm{i}\zeta\right)|\leq\tfrac{3}{2}\pi-\delta

\delta

being an arbitrary small positive constant. …

10: 31.12 Confluent Forms of Heun’s Equation

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Confluent Heun Equation

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Doubly-Confluent Heun Equation

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Biconfluent Heun Equation

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Triconfluent Heun Equation

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