Linear Algebraic Groups

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"[The first] ten chapters...are an efficient, accessible, and self-contained introduction to affine algebraic groups over an algebraically closed field. The author includes exercises and the book is certainly usable by graduate students as a text or for self-study...the author [has a] student-friendly style… [The following] seven chapters... would also be a good introduction to rationality issues for algebraic groups. A number of results from the literature…appear for the first time in a text." –Mathematical Reviews (Review of the Second Edition)

"This book is a completely new version of the first edition. The aim of the old book was to present the theory of linear algebraic groups over an algebraically closed field. Reading that book, many people entered the research field of linear algebraic groups. The present book has a wider scope. Its aim is to treat the theory of linear algebraic groups over arbitrary fields. Again, the author keeps the treatment of prerequisites self-contained. The material of the first ten chapters covers the contents of the old book, but the arrangement is somewhat different and there are additions, such as the basic facts about algebraic varieties and algebraic groups over a ground field, as well as an elementary treatment of Tannaka's theorem. These chapters can serve as a text for an introductory course on linear algebraic groups. The last seven chapters are new. They deal with algebraic groups over arbitrary fields. Some of the material has not been dealt with before in other texts, such as Rosenlicht's results about solvable groups in Chapter 14, the theorem of Borel and Tits on the conjugacy over the ground field of maximal split tori in an arbitrary linear algebraic group in Chapter 15, and the Tits classification of simple groups over a ground field in Chapter 17. The book includes many exercises and a subject index." –Zentralblatt Math (Review of the Second Edition)

Author(s): T. A. Springer (auth.)
Series: Modern Birkhäuser CIassics
Edition: 2
Publisher: Birkhäuser Basel
Year: 1998

Language: English
Pages: 334
Tags: Linear and Multilinear Algebras, Matrix Theory; Group Theory and Generalizations; Algebraic Geometry; Algebra; Number Theory

Front Matter....Pages i-xiii
Some Algebraic Geometry....Pages 1-20
Linear Algebraic Groups, First Properties....Pages 21-41
Commutative Algebraic Groups....Pages 42-56
Derivations, Differentials, Lie Algebras....Pages 57-77
Topological Properties of Morphisms, Applications....Pages 78-97
Parabolic Subgroups, Borel Subgroups, Solvable Groups....Pages 98-113
Weyl Group, Roots, Root Datum....Pages 114-131
Reductive Groups....Pages 132-153
The Isomorphism Theorem....Pages 154-174
The Existence Theorem....Pages 175-184
More Algebraic Geometry....Pages 185-207
F -groups: General Results....Pages 208-222
F -tori....Pages 223-236
Solvable F -groups....Pages 238-251
F reductive Groups....Pages 252-268
Reductive F -Groups....Pages 269-284
Classification....Pages 285-319
Back Matter....Pages 320-334