FORSTER LECTURES ON RIEMANN SURFACES PDF
Lectures on Riemann Surfaces [Otto Forster] on *FREE* shipping on qualifying offers. Lecture, Conceptual foundations of the unified theory of weak and Lectures on Riemann surfaces, by Otto Forster, Graduate Texts in Math., vol. This book grew out of lectures on Riemann surfaces which the author gave at the universities of Munich, Regensburg and Munster. Its aim is to.
|Published (Last):||23 June 2008|
|PDF File Size:||17.54 Mb|
|ePub File Size:||15.62 Mb|
|Price:||Free* [*Free Regsitration Required]|
Good set of execises. Author and Subject Index. Amazon Drive Cloud storage from Amazon.
Follow the Author
Buen tratamiento del tema de Superficies de Riemann cerradas y abiertas. As well we look more closely at analytic functions which surfsces a special multi-valued behavior.
Amazon Renewed Refurbished products with a warranty.
Home Questions Tags Users Unanswered. English Choose a language for shopping. In particular this includes the Riemann surfaces of algebraic functions. Email Required, but never shown. You just need basic background but you can also go further if you want. Alexa Actionable Analytics for the Web.
Amazon Rapids Fun stories for kids on the go. Learn more about Amazon Prime. Would you like to tell us about a lower price? Get to Know Us. Take everything on 1 to one lecgures and multiply by the adjugate matrix. Sign up or log in Sign up using Google.
Forster: Riemann Surfaces
Account Options Sign in. Sheaf cohomology is an important technical tool. In the proof Forster introduces a function. Riemann Surfaces Graduate Texts in Mathematics v.
It’s a wonderful book, despite those two problems I have asked, and maybe more. The book is divided into three chapters. Really good book, even for a first aproach to the topic of Riemann Surfaces.
I will check this out. Try the Kindle edition and experience these great reading features: Check this carefully, because I haven’t thought about Forster’s book in a long time and because my first answer was wrong. Write a customer review.
The main classical results, like the Riemann-Roch Theorem, Abel’s Theorem and the Jacobi inversion problem, are presented. Amazon Inspire Digital Educational Resources.
Product details Paperback Publisher: Withoutabox Submit to Film Festivals. In the first chapter we consider Riemann surfaces as covering spaces and develop a few basics from topology which are needed for this. Selected pages Page 2. The argument is similar to the proof of Nakayama’s lemma.
How should I understand this theorem? Is there something wrong or am I misunderstanding some stuff?
The second chapter is devoted to compact Forstwr surfaces.