Complex Analysis with MATHEMATICA (R)
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Preface; 1. Why you need complex numbers; 2. Complex algebra and geometry; 3. Cubics, quartics and visualization of complex roots; 4. Newton-Raphson iteration and complex fractals; 5. A complex view of the real logistic map; 6. The Mandelbrot set; 7. Symmetric chaos in the complex plane; 8. Complex functions; 9. Sequences, series and power series; 10. Complex differentiation; 11. Paths and complex integration; 12. Cauchy's theorem; 13. Cauchy's integral formula and its remarkable consequences; 14. Laurent series, zeroes, singularities and residues; 15. Residue calculus: integration, summation and the augment principle; 16. Conformal mapping I: simple mappings and Mobius transforms; 17. Fourier transforms; 18. Laplace transforms; 19. Elementary applications to two-dimensional physics; 20. Numerical transform techniques; 21. Conformal mapping II: the Schwarz-Christoffel transformation; 22. Tiling the Euclidean and hyperbolic planes; 23. Physics in three and four dimensions I; 24. Physics in three and four dimensions II; Index.
This book presents a way of learning complex analysis, using Mathematica. Includes CD with electronic version of the book.