Unipotent and Nilpotent Classes in Simple Algebraic Groups and Lie Algebras

Unipotent and Nilpotent Classes in Simple Algebraic Groups and Lie Algebras
Title Unipotent and Nilpotent Classes in Simple Algebraic Groups and Lie Algebras PDF eBook
Author Martin W. Liebeck
Publisher American Mathematical Soc.
Pages 394
Release 2012-01-25
Genre Mathematics
ISBN 0821869205

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This book concerns the theory of unipotent elements in simple algebraic groups over algebraically closed or finite fields, and nilpotent elements in the corresponding simple Lie algebras. These topics have been an important area of study for decades, with applications to representation theory, character theory, the subgroup structure of algebraic groups and finite groups, and the classification of the finite simple groups. The main focus is on obtaining full information on class representatives and centralizers of unipotent and nilpotent elements. Although there is a substantial literature on this topic, this book is the first single source where such information is presented completely in all characteristics. In addition, many of the results are new--for example, those concerning centralizers of nilpotent elements in small characteristics. Indeed, the whole approach, while using some ideas from the literature, is novel, and yields many new general and specific facts concerning the structure and embeddings of centralizers.

Lie Groups and Algebraic Groups

Lie Groups and Algebraic Groups
Title Lie Groups and Algebraic Groups PDF eBook
Author Arkadij L. Onishchik
Publisher Springer Science & Business Media
Pages 347
Release 2012-12-06
Genre Mathematics
ISBN 364274334X

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This book is based on the notes of the authors' seminar on algebraic and Lie groups held at the Department of Mechanics and Mathematics of Moscow University in 1967/68. Our guiding idea was to present in the most economic way the theory of semisimple Lie groups on the basis of the theory of algebraic groups. Our main sources were A. Borel's paper [34], C. ChevalIey's seminar [14], seminar "Sophus Lie" [15] and monographs by C. Chevalley [4], N. Jacobson [9] and J-P. Serre [16, 17]. In preparing this book we have completely rearranged these notes and added two new chapters: "Lie groups" and "Real semisimple Lie groups". Several traditional topics of Lie algebra theory, however, are left entirely disregarded, e.g. universal enveloping algebras, characters of linear representations and (co)homology of Lie algebras. A distinctive feature of this book is that almost all the material is presented as a sequence of problems, as it had been in the first draft of the seminar's notes. We believe that solving these problems may help the reader to feel the seminar's atmosphere and master the theory. Nevertheless, all the non-trivial ideas, and sometimes solutions, are contained in hints given at the end of each section. The proofs of certain theorems, which we consider more difficult, are given directly in the main text. The book also contains exercises, the majority of which are an essential complement to the main contents.

Conjugacy Classes in Semisimple Algebraic Groups

Conjugacy Classes in Semisimple Algebraic Groups
Title Conjugacy Classes in Semisimple Algebraic Groups PDF eBook
Author James E. Humphreys
Publisher American Mathematical Soc.
Pages 218
Release 1995
Genre Education
ISBN 0821852760

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Provides a useful exposition of results on the structure of semisimple algebraic groups over an arbitrary algebraically closed field. After the fundamental work of Borel and Chevalley in the 1950s and 1960s, further results were obtained over the next thirty years on conjugacy classes and centralizers of elements of such groups.

Lie Theory

Lie Theory
Title Lie Theory PDF eBook
Author Jean-Philippe Anker
Publisher Springer Science & Business Media
Pages 341
Release 2012-12-06
Genre Mathematics
ISBN 0817681922

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* First of three independent, self-contained volumes under the general title, "Lie Theory," featuring original results and survey work from renowned mathematicians. * Contains J. C. Jantzen's "Nilpotent Orbits in Representation Theory," and K.-H. Neeb's "Infinite Dimensional Groups and their Representations." * Comprehensive treatments of the relevant geometry of orbits in Lie algebras, or their duals, and the correspondence to representations. * Should benefit graduate students and researchers in mathematics and mathematical physics.

Representations of Algebraic Groups

Representations of Algebraic Groups
Title Representations of Algebraic Groups PDF eBook
Author Jens Carsten Jantzen
Publisher American Mathematical Soc.
Pages 594
Release 2003
Genre Mathematics
ISBN 082184377X

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Gives an introduction to the general theory of representations of algebraic group schemes. This title deals with representation theory of reductive algebraic groups and includes topics such as the description of simple modules, vanishing theorems, Borel-Bott-Weil theorem and Weyl's character formula, and Schubert schemes and lne bundles on them.

Algebraic Groups

Algebraic Groups
Title Algebraic Groups PDF eBook
Author J. S. Milne
Publisher Cambridge University Press
Pages 665
Release 2017-09-21
Genre Mathematics
ISBN 1107167485

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Comprehensive introduction to the theory of algebraic group schemes over fields, based on modern algebraic geometry, with few prerequisites.

Centres of Centralizers of Unipotent Elements in Simple Algebraic Groups

Centres of Centralizers of Unipotent Elements in Simple Algebraic Groups
Title Centres of Centralizers of Unipotent Elements in Simple Algebraic Groups PDF eBook
Author Ross Lawther
Publisher American Mathematical Soc.
Pages 201
Release 2011
Genre Mathematics
ISBN 0821847694

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Let G be a simple algebraic group defined over an algebraically closed field k whose characteristic is either 0 or a good prime for G, and let uEG be unipotent. The authors study the centralizer CG(u), especially its centre Z(CG(u)). They calculate the Lie algebra of Z(CG(u)), in particular determining its dimension; they prove a succession of theorems of increasing generality, the last of which provides a formula for dim Z(CG(u)) in terms of the labelled diagram associated to the conjugacy class containing u.