Nievergelt / Narasimhan | Complex Analysis in One Variable | Buch | 978-1-4612-6647-1 | sack.de

Buch, Englisch, 381 Seiten, Format (B × H): 155 mm x 235 mm, Gewicht: 604 g

Nievergelt / Narasimhan

Complex Analysis in One Variable


Buch, Englisch, 381 Seiten, Format (B × H): 155 mm x 235 mm, Gewicht: 604 g

ISBN: 978-1-4612-6647-1
Verlag: Birkhäuser Boston

The original edition of this book has been out of print for some years. The appear­ ance of the present second edition owes much to the initiative of Yves Nievergelt at Eastern Washington University, and the support of Ann Kostant, Mathematics Editor at Birkhauser. Since the book was first published, several people have remarked on the absence of exercises and expressed the opinion that the book would have been more useful had exercises been included. In 1997, Yves Nievergelt informed me that, for a decade, he had regularly taught a course at Eastern Washington based on the book, and that he had systematically compiled exercises for his course. He kindly put his work at my disposal. Thus, the present edition appears in two parts. The first is essentially just a reprint of the original edition. I have corrected the misprints of which I have become aware (including those pointed out to me by others), and have made a small number of other minor changes.
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Zielgruppe

Research

Autoren/Hrsg.

Nievergelt, Yves
Narasimhan, Raghavan

Fachgebiete

Weitere Infos & Material

I Complex Analysis in One Variable.- 1 Elementary Theory of Holomorphic Functions.- 2 Covering Spaces and the Monodromy Theorem.- 3 The Winding Number and the Residue Theorem.- 4 Picard’s Theorem.- 5 Inhomogeneous Cauchy-Riemann Equation and Runge’s Theorem.- 6 Applications of Runge’s Theorem.- 7 Riemann Mapping Theorem and Simple Connectedness in the Plane.- 8 Functions of Several Complex Variables.- 9 Compact Riemann Surfaces.- 10 The Corona Theorem.- 11 Subharmonic Functions and the Dirichlet Problem.- II Exercises.- 0 Review of Complex Numbers.- 1 Elementary Theory of Holomorphic Functions.- 2 Covering Spaces and the Monodromy Theorem.- 3 The Winding Number and the Residue Theorem.- 4 Picard’s Theorem.- 5 The Inhomogeneous Cauchy—Riemann Equation and Runge’s Theorem.- 6 Applications of Runge’s Theorem.- 7 The Riemann Mapping Theorem and Simple Connectedness in the Plane.- 8 Functions of Several Complex Variables.- 9 Compact Riemann Surfaces.- 10 The Corona Theorem.- 11 Subharmonic Functions and the Dirichlet Problem.- Notes for the exercises.- References for the exercises.

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