ebooks and download videos Search All  Title  Author 
Home / Nonfiction / Mathematics / Number Theory

Period Spaces for "p"-divisible Groups (AM-141)

| £95.82 | €107.76 | Ca$155.46 | Au$153.42
by Michael Rapoport & Thomas Zink
What is this?DRM-PDF | by download   add to wish list
Period Spaces for "p"-divisible Groups (AM-141) by Michael Rapoport & Thomas Zink

In this monograph p-adic period domains are associated to arbitrary reductive groups. Using the concept of rigid-analytic period maps the relation of p-adic period domains to moduli space of p-divisible groups is investigated. In addition, non-archimedean uniformization theorems for general Shimura varieties are established.

The exposition includes background material on Grothendieck's "mysterious functor" (Fontaine theory), on moduli problems of p-divisible groups, on rigid analytic spaces, and on the theory of Shimura varieties, as well as an exposition of some aspects of Drinfelds' original construction. In addition, the material is illustrated throughout the book with numerous examples.

To view this DRM protected ebook on your desktop or laptop you will need to have Adobe Digital Editions installed. It is a free software. We also strongly recommend that you sign up for an AdobeID at the Adobe website. For more details please see FAQ 1&2. To view this ebook on an iPhone, iPad or Android mobile device you will need the Adobe Digital Editions app, or BlueFire Reader or Txtr app. These are free, too. For more details see this article.

SHARE  Share by Email  Share on Facebook  Share on Twitter  Share on Linked In  Share on Delicious
or call in the US toll free 1-888-866-9150 product ID: 862592

Ebook Details
Pages: 353
Size: 14.4 MB
Publisher: Princeton University Press
Date published:   2016
ISBN: 9781400882601 (DRM-PDF)

DRM Settings
Copying:not allowed
Printing:not allowed
Read Aloud:  not allowed

This product is listed in the following category:

Nonfiction > Mathematics > Number Theory

These authors have products in the following categories:

Nonfiction > Mathematics > Number Theory
Nonfiction > Mathematics > Topology
Nonfiction > Mathematics > Functional Analysis

If you find anything wrong with this product listing, perhaps the description is wrong, the author is incorrect, or it is listed in the wrong category, then please contact us. We will promptly address your feedback.

Submit 5 page SummaryWhat is this?

© 2016