![紧黎曼曲面 [Compact Riemann Surfaces]](https://pic.qciss.net/10617607/65b9a3db-194c-4866-b987-daf9cc2f9658.jpg)
出版社: 世界图书出版公司
ISBN:9787510027390
版次:1
商品编码:10617607
包装:平装
外文名称:Compact Riemann Surfaces
开本:16开
出版时间:2010-09-01
用纸:胶版纸
页数:120
正文语种:英文
具体描述
内容简介
These notes form the contents of a Nachdiplomvorlesung given at the Forschungs-institut fiir Mathematik of the Eidgen6ssische Technische Hochschule, Ziirich fromNovember, 1984 to February, 1985. Prof. K. Chandrasekharan and Prof. JiirgenMoser have encouraged me to write them up for inclusion in the series, published byBirkhnser, of notes of these courses at the ETH.Dr. Albert Stadler produced detailed notes of the first part of this course, and veryintelligible class-room notes of the rest. Without this work of Dr. StUrdier, these noteswould not have been written. While I have changed some things (such as the proof ofthe Serre duality theorem, here done entirely in the spirit of Serres original paper), thepresent notes follow Dr. Stadlers fairly closely.
内页插图
目录
1. algebraic functions2. riemann surfaces
3. the sheaf of germs of holomorphic functions
4. the riemann surface of an algebraic function
5. sheaves
6. vector bundles, line bundles and divisors
7. finiteness theorems
8. the dolbeault isomorphism
9. weyls lemma and the serre duality theorem
10. the riemann-roch theorem and some applications
11. further properties of compact riemann surfaces
12. hypereuiptic curves and the canonical map
13. some geometry of curves in projective space
14. bilinear relations
15. the jacobian and abels theorem
16. the riemann theta function
17. the theta divisor
18. torellis theorem
19. riemanns theorem on the singularities of θ
references
前言/序言
These notes form the contents of a Nachdiplomvorlesung given at the Forschungs-institut fiir Mathematik of the Eidgen6ssische Technische Hochschule, Ziirich fromNovember, 1984 to February, 1985. Prof. K. Chandrasekharan and Prof. JiirgenMoser have encouraged me to write them up for inclusion in the series, published byBirkhnser, of notes of these courses at the ETH.Dr. Albert Stadler produced detailed notes of the first part of this course, and veryintelligible class-room notes of the rest. Without this work of Dr. StUrdier, these noteswould not have been written. While I have changed some things (such as the proof ofthe Serre duality theorem, here done entirely in the spirit of Serres original paper), thepresent notes follow Dr. Stadlers fairly closely.
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