Character Theory for the Odd Order Theorem
Character Theory for the Odd Order Theorem
March 2000
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9780521646604
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The famous and important theorem of W. Feit and J. G. Thompson states that every group of odd order is solvable, and the proof of this has roughly two parts. The first part appeared in Bender and Glauberman's Local Analysis for the Odd Order Theorem which was number 188 in this series. This book, first published in 2000, provides the character-theoretic second part and thus completes the proof. Also included here is a revision of a theorem of Suzuki on split BN-pairs of rank one; a prerequisite for the classification of finite simple groups. All researchers in group theory should have a copy of this book in their library.
- The long awaited second part of an extremely famous proof
- Author is an expert in this field
- Original work has been much updated
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July 2013Adobe eBook Reader
9781107109018
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Table of Contents
- Part I. Character Theory for the Odd Order Theorem
- Part II. A Thereom of Suzuki:
- 1. General properties of G
- 2. The first case
- 3. The structure of H
- 4. Characterisation of PSU (3, q)
- Appendices.
