Overview

Full Product Details

Author:   Jens Carsten Jantzen
Publisher:   American Mathematical Society
Imprint:   American Mathematical Society
Edition:   2nd Revised edition
Volume:   No. 107
Dimensions:   Width: 17.60cm , Height: 2.90cm , Length: 25.30cm
Weight:   0.995kg
ISBN:  

9780821843772

ISBN 10:   082184377
Pages:   576
Publication Date:   30 August 2007
Audience:   College/higher education ,  Professional and scholarly ,  Postgraduate, Research & Scholarly ,  Professional & Vocational
Format:   Paperback
Publisher's Status:   Active
Availability:   In Print  
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Table of Contents

Part I. General theory: Schemes Group schemes and representations Induction and injective modules Cohomology Quotients and associated sheaves Factor groups Algebras of distributions Representations of finite algebraic groups Representations of Frobenius kernels Reduction mod $p$ Part II. Representations of reductive groups: Reductive group Simple $G$-modules Irreducible representations of the Frobenius kernels Kempf's vanishing theorem The Borel-Bott-Weil theorem and Weyl's character formula The linkage principle The translation functors Filtrations of Weyl modules Representations of $G_rT$ and $G_rB$ Geometric reductivity and other applications of the Steinberg modules Injective $G_r$-modules Cohomology of the Frobenius kernels Schubert schemes Line bundles on Schubert schemes Truncated categories and Schur algebras Results over the integers Lusztig's conjecture and some consequences Radical filtrations and Kazhdan-Lusztig polynomials Tilting modules Frobenius splitting Frobenius splitting and good filtrations Representations of quantum groups References List of notations Index.

Reviews

This is an authoritative [book] which, in its updated form, will continue to be the research worker's main reference. From a practical point of view, the scheme adopted of adding new material in the final chapters and keeping the structure of the rest of the book largely unchanged is extremely convenient for all those familiar with the first edition. We are extremely lucky to have such a superb text. -- Bulletin of the London Mathematical Society

“This is an authoritative [book] which, in its updated form, will continue to be the research worker’s main reference. From a practical point of view, the scheme adopted of adding new material in the final chapters and keeping the structure of the rest of the book largely unchanged is extremely convenient for all those familiar with the first edition. We are extremely lucky to have such a superb text. -- Bulletin of the London Mathematical Society

oThis is an authoritative [book] which, in its updated form, will continue to be the research workerAEs main reference. From a practical point of view, the scheme adopted of adding new material in the final chapters and keeping the structure of the rest of the book largely unchanged is extremely convenient for all those familiar with the first edition. We are extremely lucky to have such a superb text. -- Bulletin of the London Mathematical Society

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