In 1916 Bieberach conjectured: If f - a univalent holomorphic function on the unit disk - is a member of S - the set of all such functions where D={z:|z| less than 1} and the normalization conditions f(0)=0 and F(0)=1 are added, then |an| is less than n holds true for n=2,3,...This equality holds if and only if f(z) is the Koebe function z over (1-z)2 or one of its rotations. De Branges proved the conjecture in 1984. In the intervening 68 years, a huge number of papers discussed this conjecture and its related problems. This book was originally published in Chinese and makes the full history of the problem available to anyone who has completed the standard material in a one year graduate complex analysis course.
- ISBN10 157146056X
- ISBN13 9781571460561
- Publish Date August 1999
- Publish Status Out of Print
- Out of Print 20 October 2003
- Publish Country US
- Imprint International Press of Boston Inc
- Edition New edition
- Format Hardcover
- Language English