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Structure of Algebraic Groups and Geometric Applications
Michael Brion, University of Grenoble I, Martin d'Heres, France, Preena Samuel, Institute of Mathematical Science, Tamilnadu, India, and V. Uma, Indian Institute of Technology, Chennai, India
A publication of Hindustan Book Agency.
cover
Hindustan Book Agency
2012; 128 pp; softcover
ISBN-13: 978-93-80250-46-5
List Price: US$45
Member Price: US$36
Order Code: HIN/55
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This book originates from a series of 10 lectures given by Michel Brion at the Chennai Mathematical Institute during January 2011. The book presents Chevalley's theorem on the structure of connected algebraic groups, over algebraically closed fields, as the starting point of various other structure results developed in the recent past.

Chevalley's structure theorem states that any connected algebraic group over an algebraically closed field is an extension of an abelian variety by a connected affine algebraic group. This theorem forms the foundation for the classification of anti-affine groups which plays a central role in the development of the structure theory of homogeneous bundles over abelian varieties and for the classification of complete homogeneous varieties. All these results are presented in this book.

The book begins with an overview of the results, the proofs of which constitute the rest of the book. Various open questions also have been indicated in the course of the exposition. This book assumes certain preliminary knowledge of linear algebraic groups, abelian varieties, and algebraic geometry.

A publication of Hindustan Book Agency; distributed within the Americas by the American Mathematical Society. Maximum discount of 20% for all commercial channels.

Readership

Graduate students and research mathematicians interested in algebraic geometry.

Table of Contents

  • Overview
  • Proof of Chevalley's theorem
  • Applications and developments
  • Complete homogeneous varieties
  • Anti-affine groups
  • Homogeneous vector bundles
  • Homogeneous principal bundles
  • Bibliography
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