Summary and Info
Pt. I. The Processes of Analysis -- I. Complex Numbers -- II. The Theory of Convergence -- III. Continuous Functions and Uniform Convergence -- IV. The Theory of Riemann Integration -- V. The fundamental properties of Analytic Functions; Taylor's, Laurent's, and Liouville's Theorems -- VI. The Theory of Residues; application to the evaluation of Definite Integrals -- VII. The expansion of functions in Infinite Series -- VIII. Asymptotic Expansions and Summable Series -- IX. Fourier Series and Trigonometrical Series -- X. Linear Differential Equations -- XI. Integral Equations -- Pt. II. The Transcendental Functions -- XII. The Gamma Function -- XIII. The Zeta Function of Riemann -- XIV. The Hypergeometric Function -- XV. Legendre Functions -- XVI. The Confluent Hypergeometric Function -- XVII. Bessel Functions -- XVIII. The Equations of Mathematical Physics -- XIX. Mathieu Functions -- XX. Elliptic Functions. General theorems and the Weierstrassian Functions -- XXI. The Theta Functions -- XXII. The Jacobian Elliptic Functions -- XXIII. Ellipsoidal Harmonics and Lame's Equation
More About the Author
Edmund Taylor Whittaker FRS FRSE (24 October 1873 – 24 March 1956) was an English mathematician who contributed widely to applied mathematics, mathematical physics and the theory of special functions.
Review and Comments
Rate the Book
A course of modern analysis : an introduction to the general theory of infinite processes and of analytic functions, with an account of the principal transcendental functions 0 out of 5 stars based on 0 ratings.