| Author: |
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Sanford L. Segal
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| Title: |
 |
Nine Introductions in Complex Analysis - Revised Edition, Volume 208 (North-Holland Mathematics Studies) |
| Moochable copies: |
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No copies available |
| Topics: |
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| Published in: |
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English |
| Binding: |
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Hardcover |
| Pages: |
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500 |
| Date: |
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2007-10-24 |
| ASIN/ISBN: |
|
0444518312 |
| Publisher: |
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Elsevier Science |
| Weight: |
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2.4 pounds |
| Size: |
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6.46 x 9.45 x 1.1 inches |
| Edition: |
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Revised |
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| Description: |
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Product Description
The book addresses many topics not usually in "second course in complex analysis" texts. It also contains multiple proofs of several central results, and it has a minor historical perspective.
- Proof of Bieberbach conjecture (after DeBranges)
- Material on asymptotic values
- Material on Natural Boundaries
- First four chapters are comprehensive introduction to entire and metomorphic functions
- First chapter (Riemann Mapping Theorem) takes up where "first courses" usually leave off
|
| URL: |
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http://bookmooch.com/0444518312 |
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