Schaum's Outline of Complex Variables, 2/e
1. Complex Numbers
2. Functions, Limits, and Continuity
3. Complex Differentiation and the Cauchy-Riemann Equations
4. Complex Integration and Cauchy's Theorem
5. Cauchy's Integral Formulas and Related Theorems
6. Infinite Series. Taylor's and Laurent Series.
7. The Residue Theorem. Evaluations of Integrals and Series.
8. Conformal Mapping
9. Physical Applications of Conformal Mapping
10. Special Topics
The Late MURRAY R. SPIEGEl received the M.S degree in Physics and
the Ph.D. in Mathematics from Cornell University. He had positions
at Harvard University, Columbia University, Oak Ridge and
Rensselaer Polytechnic Insitute, and served as a mathematical
consultant at several large Companies. His last Position was
professor and Chairman of mathematics at the Rensselaer Polytechnic
Institute Hartford Graduate Center. He was interested in most
branches of mathematics at the Rensselaer polytechnic Institute,
Hartford Graduate Center. He was interested in most branches of
mathematics, especially those which involve applications to physics
and engineering problems. He was the author of numerous journal
articles and 14 books on various topics in mathematics.
He is a Ph.D and a Professor of Mathematics in Temple
University
John J. Schiller, is an Associate Professor of Mathematics at
Temple University. He received his Ph.D. at the University of
Pennsylvania and has published research papers in the areas of
Riemann surfaces, discrete mathematics biology. He has also
coauthored texts in finite mathematics, precalculus, and calculus.
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