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Mumford-Tate groups and domains their geometry and arithmetic

Author: M Green; Phillip Griffiths; Matthew D Kerr
Publisher: Princeton Princeton University Press 2012, 2012
Series: Annals of mathematics studies, no. 183
Edition/Format:   eBook : Document : EnglishView all editions and formats
Summary:
Mumford-Tate groups are the fundamental symmetry groups of Hodge theory, a subject which rests at the center of contemporary complex algebraic geometry. This book is the first comprehensive exploration of Mumford-Tate groups and domains. Containing basic theory and a wealth of new views and results, it will become an essential resource for graduate students and researchers. Although Mumford-Tate groups can be  Read more...
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Material Type: Document, Internet resource
Document Type: Internet Resource, Computer File
All Authors / Contributors: M Green; Phillip Griffiths; Matthew D Kerr
ISBN: 9780691154244 0691154244 9780691154251 0691154252 9781400842735 1400842735
OCLC Number: 880843764
Description: 1 online resource
Series Title: Annals of mathematics studies, no. 183
Responsibility: Mark Green, Phillip Griffiths, and Matt Kerr

Abstract:

Mumford-Tate groups are the fundamental symmetry groups of Hodge theory, a subject which rests at the center of contemporary complex algebraic geometry. This book is the first comprehensive exploration of Mumford-Tate groups and domains. Containing basic theory and a wealth of new views and results, it will become an essential resource for graduate students and researchers. Although Mumford-Tate groups can be defined for general structures, their theory and use to date has mainly been in the classical case of abelian varieties. While the book does examine this area, it focuses on the nonclassical case. The general theory turns out to be very rich, such as in the unexpected connections of finite dimensional and infinite dimensional representation theory of real, semisimple Lie groups. The authors give the complete classification of Hodge representations, a topic that should become a standard in the finite-dimensional representation theory of noncompact, real, semisimple Lie groups. They also indicate that in the future, a connection seems ready to be made between Lie groups that admit discrete series representations and the study of automorphic cohomology on quotients of Mumford-Tate domains by arithmetic groups. Bringing together complex geometry, representation theory, and arithmetic, this book opens up a fresh perspective on an important subject.

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