Difference between revisions of "Book:Edmund Taylor Whittaker/A course of modern analysis/Third edition"

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Latest revision as of 16:39, 21 June 2016


Edmund Taylor Whittaker and George Neville Watson: A course of modern analysis

Published $1920$, Cambridge University Press.


Online versions

hosted by archive.org

Contents

PART I. THE PROCESSES OF ANALYSIS
Chapter I Complex Numbers
Chapter II The Theory of Convergence
Chapter III Continuous Functions and Uniform Convergence
Chapter IV The Theory of Riemann Integration
Chapter V The fundamental properties of Analytic Functions; Taylor's, Laurent's, and Liouville's Theorems
Chapter VI The Theory of Residues; application to the evaluation of Definite Integrals
Chapter VII The expansion of functions in Infinite Series
Chapter VIII Asymptotic Expansions and Summable Series
Chapter IX Fourier Series and Trigonometrical Series
Chapter X Linear Differential Equations
Chapter XI Integral Equations
PART II. THE TRANSCENDENTAL FUNCTIONS
Chapter XII The Gamma Function
$\S 12 \cdot 1$
$\S 12 \cdot 1$
$\S 12 \cdot 11$
$\S 12\cdot 12$
Chapter XIII The Zeta Function of Riemann
Chapter XIV The Hypergeometric Function
Chapter XV Legendre Functions
Chapter XVI The Confluent Hypergeometric Function
Chapter XVII Bessel Functions
Chapter XVIII The Equations of Mathematical Physics
Chapter XIX Mathieu Functions
Chapter XX Elliptic Functions, General theorems of the Weierstrassian Functions
Chapter XXI The Theta Functions
Chapter XXII The Jacobian Elliptic Functions
Chapter XXIII Ellipsoidal Harmonics and Lamé's Equation
APPENDIX
LIST OF AUTHORS QUOTED
GENERAL INDEX