Difference between revisions of "Book:Arthur Erdélyi/Higher Transcendental Functions Volume I"
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===Contents=== | ===Contents=== | ||
| + | :PREFACE | ||
| + | :FOREWARD | ||
| + | :INTRODUCTION | ||
| + | :1.1. Definition of the gamma function | ||
| + | :1.2. Functional equations satisfied by $\Gamma(z)$ | ||
| + | :1.3. Expressions for some infinite products in terms of the gamma function | ||
| + | :1.4. Some infinite sums connected with the gamma function | ||
| + | :1.5. The beta function | ||
| + | :1.6. The gamma and beta functions expressed as contour integrals | ||
| + | :1.7. The $\psi$ function | ||
| + | ::1.7.1. Function equations for $\psi(z)$ | ||
| + | ::1.7.2. Integral representations for $\psi(z)$ | ||
| + | ::1.7.3. The theorem of Gauss | ||
| + | ::1.7.4. Some infinite series connected with the $\psi$-function | ||
| + | :1.8. The function $G(z)$ | ||
| + | :1.9. Expressions for the function $\log \Gamma(z)$ | ||
| + | ::1.9.1. Kummer's series for $\log \Gamma(z)$ | ||
| + | :1.10. The generalized zeta function | ||
| + | :1.11. The function $\Phi(z,s,v)= \displaystyle\sum_{n=0}^{\infty} (v+n)^{-s}z^n$ | ||
| + | ::1.11.1 Euler's dilogarithm | ||
| + | :1.12. The zeta function of Riemann | ||
| + | :1.13. Bernoulli's numbers and polynomials | ||
| + | :1.14. Euler numbers and polynomials | ||
| + | ::1.14.1. The Euler polynomials of higher order | ||
| + | :1.15. Some integral formulas connected with the Bernoulli and Euler polynomials | ||
| + | :1.16. Polygamma functions | ||
| + | :1.17. Some expansions for $\log \Gamma(1+z)$, $\psi(1+z)$, $G(1+z)$, and $\Gamma(z)$ | ||
| + | :1.18. Asymptotic expansions | ||
| + | :1.19. Mellin-Barnes integrals | ||
| + | :1.20. Power series of some trigonometric functions | ||
| + | :1.21. Some other notations and symbols | ||
| + | :References | ||
| + | :2.1. The hypergeometric series | ||
| + | ::2.1.1. The hypergeometric equation | ||
| + | ::2.1.2. Elementary relations | ||
| + | ::2.1.3. The fundamental integral representation | ||
| + | ::2.1.4. Analytic continuation of the hypergeometric series | ||
| + | ::2.1.5. Quadratic and cubic transformations | ||
| + | ::2.1.6. $F(a,b;c;z)$ as function of the parameters | ||
| + | :2.2. The degenerate case of the hypergeometric equation | ||
| + | ::2.2.1. A particular solution | ||
| + | ::2.2.2. The full solution and asymptotic expansion in the general case | ||
| + | :2.3. The full solution and asymptotic expansion in the general case | ||
| + | ::2.3.1. Linearly independent solutions of the hypergeometric equation in the non-degenerate case | ||
| + | ::2.3.2. Asymptotic expansions | ||
| + | :2.4. Integrals representing or involving hypergeometric functions | ||
| + | :2.5. Miscellaneous results | ||
| + | ::2.5.1. A generating function | ||
| + | ::2.5.2. Products of hypergeometric series | ||
| + | ::2.5.3. Relations involving binomial coefficients and the incomplete beta function | ||
| + | ::2.5.4. A continued fraction | ||
| + | ::2.5.5. Special cases of the hypergeometric function | ||
| + | :2.6. Riemann's equation | ||
| + | ::2.6.1. Reduction to the hypergeometric equation | ||
| + | ::2.6.2. Quadratic and cubic transformations | ||
| + | :2.7. Conformation representations | ||
Revision as of 08:45, 4 June 2016
Contents
Harry Bateman: Higher Transcendental Functions, Volume I
Published $1953$, Dover Publications
- ISBN 0-486-44614-X.
Online mirrors
BiBTeX
@book {MR698779,
AUTHOR = {Erd{\'e}lyi, Arthur and Magnus, Wilhelm and Oberhettinger,
Fritz and Tricomi, Francesco G.},
TITLE = {Higher transcendental functions. {V}ol. {I}},
NOTE = {Based on notes left by Harry Bateman,
With a preface by Mina Rees,
With a foreword by E. C. Watson,
Reprint of the 1953 original},
PUBLISHER = {Robert E. Krieger Publishing Co., Inc., Melbourne, Fla.},
YEAR = {1981},
PAGES = {xiii+302},
ISBN = {0-89874-069-X},
MRCLASS = {33-02 (01A75)},
MRNUMBER = {698779},
}
Contents
- PREFACE
- FOREWARD
- INTRODUCTION
- 1.1. Definition of the gamma function
- 1.2. Functional equations satisfied by $\Gamma(z)$
- 1.3. Expressions for some infinite products in terms of the gamma function
- 1.4. Some infinite sums connected with the gamma function
- 1.5. The beta function
- 1.6. The gamma and beta functions expressed as contour integrals
- 1.7. The $\psi$ function
- 1.7.1. Function equations for $\psi(z)$
- 1.7.2. Integral representations for $\psi(z)$
- 1.7.3. The theorem of Gauss
- 1.7.4. Some infinite series connected with the $\psi$-function
- 1.8. The function $G(z)$
- 1.9. Expressions for the function $\log \Gamma(z)$
- 1.9.1. Kummer's series for $\log \Gamma(z)$
- 1.10. The generalized zeta function
- 1.11. The function $\Phi(z,s,v)= \displaystyle\sum_{n=0}^{\infty} (v+n)^{-s}z^n$
- 1.11.1 Euler's dilogarithm
- 1.12. The zeta function of Riemann
- 1.13. Bernoulli's numbers and polynomials
- 1.14. Euler numbers and polynomials
- 1.14.1. The Euler polynomials of higher order
- 1.15. Some integral formulas connected with the Bernoulli and Euler polynomials
- 1.16. Polygamma functions
- 1.17. Some expansions for $\log \Gamma(1+z)$, $\psi(1+z)$, $G(1+z)$, and $\Gamma(z)$
- 1.18. Asymptotic expansions
- 1.19. Mellin-Barnes integrals
- 1.20. Power series of some trigonometric functions
- 1.21. Some other notations and symbols
- References
- 2.1. The hypergeometric series
- 2.1.1. The hypergeometric equation
- 2.1.2. Elementary relations
- 2.1.3. The fundamental integral representation
- 2.1.4. Analytic continuation of the hypergeometric series
- 2.1.5. Quadratic and cubic transformations
- 2.1.6. $F(a,b;c;z)$ as function of the parameters
- 2.2. The degenerate case of the hypergeometric equation
- 2.2.1. A particular solution
- 2.2.2. The full solution and asymptotic expansion in the general case
- 2.3. The full solution and asymptotic expansion in the general case
- 2.3.1. Linearly independent solutions of the hypergeometric equation in the non-degenerate case
- 2.3.2. Asymptotic expansions
- 2.4. Integrals representing or involving hypergeometric functions
- 2.5. Miscellaneous results
- 2.5.1. A generating function
- 2.5.2. Products of hypergeometric series
- 2.5.3. Relations involving binomial coefficients and the incomplete beta function
- 2.5.4. A continued fraction
- 2.5.5. Special cases of the hypergeometric function
- 2.6. Riemann's equation
- 2.6.1. Reduction to the hypergeometric equation
- 2.6.2. Quadratic and cubic transformations
- 2.7. Conformation representations
