Difference between revisions of "Book:Milton Abramowitz/Handbook of mathematical functions"
From specialfunctionswiki
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:11. Integrals of Bessel Functions | :11. Integrals of Bessel Functions | ||
::11.1 Simple Integrals of Bessel Functions | ::11.1 Simple Integrals of Bessel Functions | ||
+ | :::[[Integral of monomial times Bessel J|$11.1.1$]] | ||
+ | :::[[Integral of Bessel J for Re(nu) greater than -1|$11.1.2$]] | ||
+ | :::[[Integral of Bessel J for nu=2n|$11.1.3$]] | ||
+ | :::[[Integral of Bessel J for nu=2n+1|$11.1.4$]] | ||
+ | :::[[Integral of Bessel J for nu=n+1|$11.1.5$]] | ||
+ | :::[[Integral of Bessel J for nu=1|$11.1.6$]] | ||
+ | :::11.1.7 | ||
+ | :::11.1.8 | ||
+ | :::11.1.9 | ||
+ | :::11.1.10 | ||
+ | :::11.1.11 | ||
+ | :::11.1.12 | ||
+ | :::11.1.13 | ||
+ | :::11.1.14 | ||
+ | :::11.1.15 | ||
+ | :::11.1.16 | ||
+ | :::11.1.17 | ||
+ | :::11.1.18 | ||
+ | :::11.1.19 | ||
+ | :::11.1.20 | ||
+ | :::11.1.21 | ||
+ | :::11.1.22 | ||
+ | :::11.1.23 | ||
+ | :::11.1.24 | ||
+ | :::11.1.25 | ||
+ | :::11.1.26 | ||
+ | :::11.1.27 | ||
+ | :::11.1.28 | ||
+ | :::11.1.29 | ||
+ | :::11.1.30 | ||
+ | :::11.1.31 | ||
::11.2 Repeated Integrals of $J_n(z)$ and $K_0(z)$ | ::11.2 Repeated Integrals of $J_n(z)$ and $K_0(z)$ | ||
::11.3 Reduction Formulas for Indefinite Integrals | ::11.3 Reduction Formulas for Indefinite Integrals |
Revision as of 17:06, 27 June 2016
Milton Abramowitz and Irene A. Stegun: Handbook of mathematical functions with formulas, graphs, and mathematical tables
Published $1964$, Dover Publications
- ISBN 0-486-61272-4.
Online mirrors
Hosted by specialfunctionswiki
Hosted by Simon Fraser University
Hosted by Institute of Physics, Bhubaneswar
Hosted by Bill Welsh (San Diego State University)
Hong Kong Baptist University
BiBTeX
@book {MR0167642, AUTHOR = {Abramowitz, Milton and Stegun, Irene A.}, TITLE = {Handbook of mathematical functions with formulas, graphs, and mathematical tables}, SERIES = {National Bureau of Standards Applied Mathematics Series}, VOLUME = {55}, PUBLISHER = {For sale by the Superintendent of Documents, U.S. Government Printing Office, Washington, D.C.}, YEAR = {1964}, PAGES = {xiv+1046}, }
Contents
- Preface
- Foreword
- Introduction
- 1. Mathematical Constants
- 2. Physical Constants and Conversion Factors
- 3. Elementary Analytical Methods
- 3.1. Binomial Theorem and Binomial Coefficients; Arithmetic and Geometric Progressions; Arithmetic, Geometric, Harmonic and Generalized Means
- 3.2. Inequalities
- 3.3. Rules for Differentiation and Integration
- 3.4. Limits, Maxima and Minima
- 3.5. Absolute and Relative Errors
- 3.6. Infinite Series
- 3.7. Complex Numbers and Functions
- 3.8. Algebraic Equations
- 3.9. Successive Approximation Methods
- 3.10. Theorems on Continued Fractions
- 3.11. Use and Extension of the Tables
- 3.12. Computing Techniques
- 4. Elementary Transcendental Functions: Logarithmic, Exponential, Circular and Hyperbolic Functions
- 4.1. Logarithmic Function
- 4.2. Exponential Function
- 4.3. Circular Functions
- 4.4. Inverse Circular Functions
- 4.5. Hyperbolic Functions
- 4.6. Inverse Hyperbolic Functions
- 4.7. Use and Extension of the Tables
- 5. Exponential Integral and Related Functions
- 5.1. Exponential Integral
- 5.2. Sine and Cosine Integrals
- 5.3. Use and Extension of the Tables
- 6. Gamma Function and Related Functions
- 6.1. Gamma Function
- 6.1.1
- 6.1.2
- 6.1.3
- 6.1.4
- 6.1.5
- 6.1.6
- 6.1.7
- 6.1.8
- 6.1.9
- 6.1.10
- 6.1.11
- 6.1.12
- 6.1.13
- 6.1.14
- 6.1.15
- 6.1.16
- 6.1.17
- 6.1.18
- 6.1.19
- 6.1.20
- 6.1.21
- 6.1.22
- 6.1.23
- 6.1.24
- 6.1.25
- 6.1.26
- 6.1.27
- 6.1.28
- 6.1.29
- 6.1.30
- 6.1.31
- 6.1.32
- 6.1.33
- 6.1.34
- 6.1.35
- 6.1.36
- 6.1.37
- 6.1.38
- 6.1.39
- 6.1.40
- 6.1.41
- 6.1.42
- 6.1.43
- 6.1.44
- 6.1.45
- 6.1.46
- 6.1.47
- 6.1.48
- 6.1.49
- 6.1.50
- 6.2. Beta Function
- 6.3. Psi (Digamma Function)
- 6.4. Polygamma Functions
- 6.5. Incomplete Gamma Function
- 6.6. Incomplete Beta Function
- 6.7. Use and Extension of the Tables
- 6.8. Summation of Rational Series by Means of Polygamma Functions
- 6.1. Gamma Function
- 7. Error Function and Fresnel Integrals
- 7.1. Error Function
- 7.2. Repeated Integrals of the Error Function
- 7.3. Fresnel Integrals
- 7.4. Definite and Indefinite Integrals
- 7.5. Use and Extension of the Tables
- 8. Legendre Functions
- 8.1. Differential Equation
- 8.2. Relations Between Legendre Functions
- 8.3. Values on the Cut
- 8.4. Explicit Expressions
- 8.5. Recurrence Relations
- 8.6. Special Values
- 8.7. Trigonometric Expressions
- 8.8. Integral Representations
- 8.9. Summation Formulas
- 8.10. Asymptotic Expansions
- 8.11. Toroidal Functions
- 8.12. Conical Functions
- 8.13. Relation to Elliptic Integrals
- 8.14. Integrals
- 8.15. Use and Extension of the Tables
- 9. Bessel Functions of Integer Order
- 9.1. Definitions and Elementary Properties
- 9.1.1
- 9.1.2
- 9.1.3 (and 9.1.3)
- 9.1.4 (and 9.1.4)
- 9.1.5 (and 9.1.5)
- 9.1.6
- 9.1.7
- 9.1.8
- 9.1.9
- 9.1.10
- 9.1.11
- 9.1.12
- 9.1.13
- 9.1.14
- 9.1.15
- 9.1.16
- 9.1.17
- 9.1.18
- 9.1.19
- 9.1.20
- 9.1.21
- 9.1.22
- 9.1.23
- 9.1.24
- 9.1.25
- 9.1.26
- 9.1.27
- 9.1.28
- 9.1.29
- 9.1.30
- 9.1.31
- 9.1.32
- 9.1.33
- 9.1.34
- 9.1.35
- 9.1.36
- 9.1.37
- 9.1.38
- 9.1.39
- 9.1.40
- 9.1.41
- 9.1.42
- 9.1.43
- 9.1.44
- 9.1.45
- 9.1.46
- 9.1.47
- 9.1.48
- 9.1.49
- 9.1.50
- 9.1.51
- 9.1.52
- 9.1.53
- 9.1.54
- 9.1.55
- 9.1.56
- 9.1.57
- 9.1.58
- 9.1.59
- 9.1.60
- 9.1.61
- 9.1.62
- 9.1.64
- 9.1.65
- 9.1.66
- 9.1.67
- 9.1.68
- 9.1.69
- 9.1.70
- 9.1.71
- 9.1.72
- 9.1.73
- 9.1.74
- 9.1.75
- 9.1.76
- 9.1.77
- 9.1.78
- 9.1.79
- 9.1.80
- 9.1.81
- 9.1.82
- 9.1.83
- 9.1.84
- 9.1.85
- 9.1.86
- 9.1.87
- 9.1.88
- 9.1.89
- 9.2. Asymptotic Expansions for Large Arguments
- 9.3. Asymptotic Expansions for Large Orders
- 9.4. Polynomial Approximations
- 9.5. Zeros
- 9.6. Definitions and Properties
- 9.7. Asymptotic Expansions
- 9.8. Polynomial Approximations
- 9.9. Definitions and Properties
- 9.10. Asymptotic Expansions
- 9.11. Polynomial Approximations
- 9.12. Use and Extension of the Tables
- 9.1. Definitions and Elementary Properties
- 10. Bessel Functions of Fractional Order
- 10.1 Spherical Bessel Functions
- 10.2 Modified Spherical Bessel Functions
- 10.3 Riccati-Bessel Functions
- 10.4 Airy Functions
- 10.5 Use and Extension of the Tables
- 11. Integrals of Bessel Functions
- 11.1 Simple Integrals of Bessel Functions
- 11.2 Repeated Integrals of $J_n(z)$ and $K_0(z)$
- 11.3 Reduction Formulas for Indefinite Integrals
- 11.4 Definite Integrals
- 11.5 Use and Extensions of the Tables
- 12. Struve Functions and Related Functions
- 13. Confluent Hypergeometric Functions
- 13.1 Definitions of Kummer and Whittaker Functions
- 13.2 Integral Representations
- 13.3 Connections With Bessel Functions
- 13.4 Recurrence Relations and Differential Properties
- 13.5 Asymptotic Expansions and Limiting Forms
- 13.6 Special Cases
- 13.7 Zeros and Turning Values
- 13.8 Use and Extension of the Tables
- 13.9 Calculation of the Zeros and Turning Points
- 13.10 Graphing $M(a,b,x)$
- 14. Coulomb Wave Functions
- 14.1 Differential Equation, Series Expansions
- 14.2 Recurrence and Wronskian Relations
- 14.3 Integral Representations
- 14.4 Bessel Function Expansions
- 14.5 Asymptotic Expansions
- 14.6 Special Values and Asymptotic Behavior
- 14.7 Use and Extension of the Tables
- 15. Hypergeometric Functions
- 15.1 Gauss Series, Special Elementary Cases, Special Values of the Argument
- 15.2 Differentiation Formulas and Gauss' Relations for Contiguous Functions
- 15.3 Integral Representations and Transformation Formulas
- 15.4 Special Cases of $F(a,b;c;z)$, Polynomials and Legendre Functions
- 15.5 The Hypergeometric Differential Equation
- 15.6 Riemann's Differential Equation
- 15.7 Asymptotic Expansions
- 16. Jacobian Elliptic Functions and Theta Functions
- 16.1 Introduction
- 16.2 Classification of the Twelve Jacobian Elliptic Functions
- 16.3 Relation of the Jacobian Functions to the Copolor Trio
- 16.4 Calculation of the Jacobian Functions by Use of the Arithmetic-Geometric Mean (A.G.M.)
- 16.5 Special Arguments
- 16.6 Jacobian Functions when $m=0$ or $1$
- 16.7 Principal Terms
- 16.8 Change of Argument
- 16.9 Relations Between the Squares of the Functions
- 16.10 Change of Parameter
- 16.11 Reciprocal Parameter
- 16.12 Descending Landen Transformation (Gauss' Transformation)
- 16.13 Approximation in Terms of Circular Functions
- 16.14 Ascending Landen Transformation
- 16.15 Approximation in Terms of Hyperbolic Functions
- 16.16 Derivatives
- 16.17 Addition Theorems
- 16.18 Double Arguments
- 16.19 Half Arguments
- 16.20 Jacobi's Imaginary Transformation
- 16.21 Complex Arguments
- 16.22 Leading Terms of the Series in Ascending Powers of $u$
- 16.23 Series Expansion in Terms of the Nome $q$
- 16.24 Integrals of the Twelve Jacobian Elliptic Functions
- 16.25 Notation for the Integrals of the Squares of the Twelve Jacobian Elliptic Functions
- 16.26 Integrals in Terms of the Elliptic Integral of the Second Kind
- 16.27 Theta Functions; Expansions in Terms of the Nome $q$
- 16.28 Relations Between the Squares of the Theta Functions
- 16.29 Logarithmic Derivatives of the Theta Functions
- 16.30 Logarithms of Theta Functions of Sum and Difference
- 16.31 Jacobi's Notation for Theta Functions
- 16.32 Calculation of Jacobi's Theta Function $\Theta(u|m)$ by Use of the Arithmetic-Geometric Mean
- 16.33 Addition of Quarter-Periods to Jacobi's Eta and Theta Functions
- 16.34 Relation of Jacobi's Zeta Function to the Theta Functions
- 16.35 Calculation of Jacobi's Zeta Function $Z(u|m)$ by Use of the Arithmetic-Geometric Mean
- 16.36 Neville's Notation for Theta Functions
- 16.37 Expression as Infinite Products
- 16.38 Expression as Infinite Series
- 16.39 Use and Extension of the Tables
- 17. Elliptic Integrals
- 17.1 Definition of Elliptic Integrals
- 17.2 Canonical Forms
- 17.3 Complete Elliptic Integrals of the First and Second Kinds
- 17.4 Incomplete Elliptic Integrals of the First and Second Kinds
- 17.5 Landen's Transformation
- 17.6 The Process of the Arithmetic-Geometric Mean
- 17.7 Elliptic Integrals of the Third Kind
- 17.8 Use and Extension of the Tables
- 18. Weierstrass Elliptic and Related Functions
- 18.1 Definitions, Symbolism, Restrictions and Conventions
- 18.2 Homogeneity Relations, Reduction Formulas and Processes
- 18.3 Special Values and Relations
- 18.4 Addition and Multiplication Formulas
- 18.5 Series Expansions
- 18.6 Derivatives and Differential Equations
- 18.7 Integrals
- 18.8 Conformal Mapping
- 18.9 Relations with Complete Elliptic Integrals $K$ and $K'$ and Their Parameter $m$ and with Jacobi's Elliptic Functions
- 18.10 Relations with Theta Functions
- 18.11 Expressing and Elliptic Function in Terms of $\wp$ and $\wp'$
- 18.12 Case $\Delta=0$
- 18.13 Equianharmonic Case ($g_2=0,g_3=1$)
- 18.14 Lemniscatic Case ($g_2=1, g_3=0$)
- 18.15 Pseudo-Lemniscatic Case ($g_2=-1, g_3=0$)
- 18.16 Use and Extension of the Tables
- 19. Parabolic Cylinder Functions
- 20. Mathieu Functions
- 21. Spheroidal Wave Functions
- 22. Orthogonal Polynomials
- 23. Bernoulli and Euler Polynomials, Riemann Zeta Function
- 24. Combinatorial Analysis
- 24.1. Basic numbers
- 24.1.1. Binomial Coefficients
- 24.1.2. Multinomial Coefficients
- 24.1.3. Stirling Numbers of the First Kind
- 24.1.4. Stirling Numbers of the Second Kind
- 24.2. Partitions
- 24.2.1. Unrestricted Partitions
- 24.2.2. Partitions Into Distinct Parts
- 24.3. Number Theoretic Functions
- 24.3.1. The Mobius Function
- 24.3.2. The Euler Function
- 24.3.3. Divisor Functions
- 24.3.4. Primitive Roots
- References
- 24.1. Basic numbers
- 25. Numerical Interpolation, Differentiation and Integration
- 26. Probability Functions
- 27. Miscellaneous Functions
- 28. Scales of Notation
- 29. Laplace Transforms
- Subject Index
- Index of Notations