Book:Milton Abramowitz/Handbook of Mathematical Functions

Contents

 * Preface
 * Foreword
 * Introduction


 * 1. Mathematical Constants
 * 2. Physical Constants and Conversion Factors
 * 3. Elementary Analytical Methods
 * 4. Elementary Transcendental Functions
 * Logarithmic, Exponential, Circular and Hyperbolic Functions
 * 5. Exponential Integral and Related Functions
 * 6. Gamma Function and Related Functions
 * 7. Error Function and Fresnel Integrals
 * 8. Legendre Functions
 * 9. Bessel Functions of Integer Order
 * 10. Bessel Functions of Fractional Order
 * 11. Integrals of Bessel Functions
 * 12. Struve Functions and Related Functions
 * 13. Confluent Hypergeometric Functions
 * 14. Coulomb Wave Functions
 * 15. Hypergeometric Functions
 * 16. Jacobian Elliptic Functions and Theta Functions
 * 17. Elliptic Integrals
 * 18. Weierstrass Elliptic and Related Functions
 * 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
 * 25. Numerical Interpolation, Differentiation and Integration
 * 26. Probability Functions
 * 27. Miscellaneous Functions
 * 28. Scales of Notation
 * 29. Laplace Transforms


 * Subject Index
 * Index of Notations



Source work progress
* : Introduction: $3$. Auxiliary Functions and Arguments

From :


 * : $2$. Physical Constants and Conversion Factors

Much missed out from Table $1.1$, although there is room for adding some of them

Starting from :


 * : $3$: Elementary Analytic Methods: $3.4$ Limits, Maxima and Minima: $3.4.2 \ (1)$

Some proofs in the above still incomplete or just not done.