Buy this book
- About this book
-
A complex torus is a connected compact complex Lie group. Any complex 9 9 torus is of the form X =
- Reviews
-
"…Now, whereas the theory of complex abelian varieties has reached a highly advanced stage of its development, after nearly two hundred years of vast and intense research, comparatively few deep results have been known, so far, about the structure and geometry of general complex tori…From what has been said at the beginning of this review, the uniqueness of this first comprehensive monograph on general complex tori, together with its excellent arrangement of the presented material, has already made it a standard text on the subject, and therefore it must be seen as both a really needed and a highly welcome complement to the literature on the related areas of mathematics…"
–Zentralblatt Math
"Authors have conducted a thorough investigation of these objects. In this volume they present a comprehensive account of their achievements…Containing a great number of new results this monograph will be a standard reference for years to come."
--Zentralblatt Math
"…general complex tori had a scarce literature so far. This gap is filled by the present book… With its complete up-to-date bibliography the book may serve as both manual and graduate text."
--ASM
- Table of contents (7 chapters)
-
-
Complex Tori
Pages 1-33
-
Nondegenerate Complex Tori
Pages 35-62
-
Embeddings into Projective Space
Pages 63-90
-
Intermediate Jacobians
Pages 91-114
-
Families of Complex Tori
Pages 115-178
-
Table of contents (7 chapters)
Recommended for you
Bibliographic Information
- Bibliographic Information
-
- Book Title
- Complex Tori
- Authors
-
- Herbert Lange
- Christina Birkenhake
- Series Title
- Progress in Mathematics
- Series Volume
- 177
- Copyright
- 1999
- Publisher
- Birkhäuser Basel
- Copyright Holder
- Springer Science+Business Media New York
- eBook ISBN
- 978-1-4612-1566-0
- DOI
- 10.1007/978-1-4612-1566-0
- Hardcover ISBN
- 978-0-8176-4103-0
- Softcover ISBN
- 978-1-4612-7195-6
- Series ISSN
- 0743-1643
- Edition Number
- 1
- Number of Pages
- XV, 255
- Topics
