Handbook of Mathematical Functions
Published on 1. February 2000
Book
Paperback/Softback
1046 pages
978-0-486-61272-0 (ISBN)
Description
Students and professionals in the fields of mathematics, physics, engineering, and economics will find this reference work invaluable. A classic resource for working with special functions, standard trig, and exponential logarithmic definitions and extensions, it features 29 sets of tables, some to as high as 20 places.
In all, this is one of the most ambitious and useful books of its type ever published, an essential aid in all scientific and engineering research, problem solving, experimentation and field work. This contains every page of the original government publication.
Reprint of #55, National Bureau of Standards-Applied Mathematics Series, 1964 edition.
In all, this is one of the most ambitious and useful books of its type ever published, an essential aid in all scientific and engineering research, problem solving, experimentation and field work. This contains every page of the original government publication.
Reprint of #55, National Bureau of Standards-Applied Mathematics Series, 1964 edition.
More details
Language
English
Place of publication
United States
Dimensions
Height: 203 mm
Width: 267 mm
Thickness: 56 mm
Weight
1742 gr
ISBN-13
978-0-486-61272-0 (9780486612720)
Copyright in bibliographic data and cover images is held by Nielsen Book Services Limited or by the publishers or by their respective licensors: all rights reserved.
Schweitzer Classification
Content
Preface; Foreword; Introduction
1. Mathematical Constants. David S. Liepman
2. Physical Constants and Conversion Factors. A. G. McNish
3. Elementary Analytical Methods. Milton Abramowitz
4. Elementary Transcendental Functions. Logarithmic, Exponential, Circular and Hyperbolic Functions. Ruth Zucker
5. Exponential Integral and Related Functions. Walter Gautschi and William F. Cahill
6. Gamma Function and Related Functions. Philip J. Davis
7. Error Function and Fresnel Integrals. Walter Gautschi
8. Legendre Functions. Irene A. Stegun
9. Bessel Functions of Integer Order. F. W. J. Olver
10. Bessel Functions of Fractional Order. H. A. Antosiewicz
11. Integrals of Bessel Functions. Yudell L. Luke
12. Struve Functions and Related Functions. Milton Abramowitz
13. Confluent Hypergeometric Functions. Lucy Joan Slater
14. Coulomb Wave Functions. Milton Abramowitz
15. Hypergeometric Functions. Fritz Oberhettinger
16. Jacobian Elliptic Functions and Theta Functions. L. M. Milne-Thomson
17. Elliptic Integrals. L. M. Milne-Thomson
18. Weierstrass Elliptic and Related Functions. Thomas H. Southard
19. Parabolic Cylinder Functions. J. C. P. Miller
20. Mathieu Functions. Gertrude Blanch
21. Spheroidal Wave Functions. Arnold N. Lowan
22. Orthogonal Polynomials. Urs W. Hochstrasser
23. Bernoulli and Euler Polynomials, Riemann Zeta Function. Emilie V. Haynsworth and Karl Goldberg
24. Combinatorial Analysis. K. Goldberg, M. Newman and E. Haynsworth
25. Numerical Interpolation, Differentiation and Integration. Philip J. Davis and Ivan Polonsky
26. Probability Functions. Marvin Zelen and Norman C. Severo
27. Miscellaneous Functions. Irene A. Stegun
28. Scales of Notation. S. Peavy and A. Schopf
29. Laplace Transforms
Subject index; Index of Notations
1. Mathematical Constants. David S. Liepman
2. Physical Constants and Conversion Factors. A. G. McNish
3. Elementary Analytical Methods. Milton Abramowitz
4. Elementary Transcendental Functions. Logarithmic, Exponential, Circular and Hyperbolic Functions. Ruth Zucker
5. Exponential Integral and Related Functions. Walter Gautschi and William F. Cahill
6. Gamma Function and Related Functions. Philip J. Davis
7. Error Function and Fresnel Integrals. Walter Gautschi
8. Legendre Functions. Irene A. Stegun
9. Bessel Functions of Integer Order. F. W. J. Olver
10. Bessel Functions of Fractional Order. H. A. Antosiewicz
11. Integrals of Bessel Functions. Yudell L. Luke
12. Struve Functions and Related Functions. Milton Abramowitz
13. Confluent Hypergeometric Functions. Lucy Joan Slater
14. Coulomb Wave Functions. Milton Abramowitz
15. Hypergeometric Functions. Fritz Oberhettinger
16. Jacobian Elliptic Functions and Theta Functions. L. M. Milne-Thomson
17. Elliptic Integrals. L. M. Milne-Thomson
18. Weierstrass Elliptic and Related Functions. Thomas H. Southard
19. Parabolic Cylinder Functions. J. C. P. Miller
20. Mathieu Functions. Gertrude Blanch
21. Spheroidal Wave Functions. Arnold N. Lowan
22. Orthogonal Polynomials. Urs W. Hochstrasser
23. Bernoulli and Euler Polynomials, Riemann Zeta Function. Emilie V. Haynsworth and Karl Goldberg
24. Combinatorial Analysis. K. Goldberg, M. Newman and E. Haynsworth
25. Numerical Interpolation, Differentiation and Integration. Philip J. Davis and Ivan Polonsky
26. Probability Functions. Marvin Zelen and Norman C. Severo
27. Miscellaneous Functions. Irene A. Stegun
28. Scales of Notation. S. Peavy and A. Schopf
29. Laplace Transforms
Subject index; Index of Notations