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© 2005

Fourier Transforms of Invariant Functions on Finite Reductive Lie Algebras

  • Authors
Book

Part of the Lecture Notes in Mathematics book series (LNM, volume 1859)

Table of contents

  1. Front Matter
    Pages I-XI
  2. Emmanuel Letellier
    Pages 1-4
  3. Emmanuel Letellier
    Pages 33-43
  4. Emmanuel Letellier
    Pages 45-60
  5. Emmanuel Letellier
    Pages 61-113
  6. Emmanuel Letellier
    Pages 115-149
  7. Emmanuel Letellier
    Pages 159-162
  8. Emmanuel Letellier
    Pages 163-165
  9. Back Matter
    Pages 166-167

About this book

Introduction

The study of Fourier transforms of invariant functions on finite reductive Lie algebras has been initiated by T.A. Springer (1976) in connection with the geometry of nilpotent orbits. In this book the author studies Fourier transforms using Deligne-Lusztig induction and the Lie algebra version of Lusztig’s character sheaves theory. He conjectures a commutation formula between Deligne-Lusztig induction and Fourier transforms that he proves in many cases. As an application the computation of the values of the trigonometric sums (on reductive Lie algebras) is shown to reduce to the computation of the generalized Green functions and to the computation of some fourth roots of unity.

Keywords

Deligne-Lusztig induction Fourier transforms Lie Algebras Lie algebra character-sheaves trigonometric sums

Bibliographic information

  • Book Title Fourier Transforms of Invariant Functions on Finite Reductive Lie Algebras
  • Authors Emmanuel Letellier
  • Series Title Lecture Notes in Mathematics
  • Series Abbreviated Title LNM
  • DOI https://doi.org/10.1007/b104209
  • Copyright Information Springer-Verlag Berlin Heidelberg 2005
  • Publisher Name Springer, Berlin, Heidelberg
  • eBook Packages Mathematics and Statistics Mathematics and Statistics (R0)
  • Softcover ISBN 978-3-540-24020-4
  • eBook ISBN 978-3-540-31561-2
  • Series ISSN 0075-8434
  • Series E-ISSN 1617-9692
  • Edition Number 1
  • Number of Pages XI, 165
  • Number of Illustrations 0 b/w illustrations, 0 illustrations in colour
  • Topics Group Theory and Generalizations
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