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Harish-Chandra homomorphisms for p-adic groups by Roger Howe

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Published by Published for the Conference Board of the Mathematical Sciences by the American Mathematical Society in Providence, R.I .
Written in English

Subjects:

  • Lie groups.,
  • Representations of groups.,
  • p-adic groups.,
  • Homomorphisms (Mathematics)

Book details:

Edition Notes

StatementRoger Howe ; with the collaboration of Allen Moy.
SeriesRegional conference series in mathematics,, no. 59
ContributionsMoy, Allen, 1955-, Conference Board of the Mathematical Sciences.
Classifications
LC ClassificationsQA1 .R33 no. 59, QA387 .R33 no. 59
The Physical Object
Paginationxi, 76 p. ;
Number of Pages76
ID Numbers
Open LibraryOL2537731M
ISBN 100821807099
LC Control Number85018649

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This book introduces a systematic new approach to the construction and analysis of semisimple \(p\)-adic groups. The basic construction presented here provides an analogue in certain cases of the Harish-Chandra homomorphism, which has played an essential role in the theory of semisimple Lie groups. Harish-Chandra Homomorphisms for ${\mathfrak p}$-Adic Groups About this Title. Roger Howe and Allen Moy. The Harish-Chandra Homomorphism in the Unramified Anisotropic Case American Mathematical Society Charles Street Providence, Cited by: Harish-Chandra Homomorphisms for ${\mathfrak p}$-Adic Groups (Cbms Regional Conference Series in Mathematics) 作者: Roger Howe / Allen Moy 出版社: American Mathematical Society 出版年: 定价: USD 装帧: Paperback ISBN: The Mathematical Legacy of Harish-Chandra by Harish-Chandra, , available at Book Depository with free delivery worldwide.

Introduction to Harmonic Analysis on Reductive P-adic Groups: Based on lectures by Harish-Chandra at The Institute for Advanced Study, Allan G. Silberger Based on a series of lectures given by Harish-Chandra at the Institute for Advanced Study in , this book provides an introduction to the theory of harmonic analysis on. In mathematics, a Lie group (pronounced / l iː / "Lee") is a group whose elements are organized continuously and smoothly, as opposed to discrete groups, where the elements are separated—this makes Lie groups differentiable groups are named after Norwegian mathematician Sophus Lie, who laid the foundations of the theory of continuous transformation groups. Harish-Chandra Homomorphisms for ${\mathfrak p}$-Adic Groups (Cbms Regional Conference Series in Mathematics) by Roger Howe, Allen Moy. Classification of finite simple groups; cyclic; alternating; Lie type; sporadic; Lagrange's theorem; Sylow theorems; Hall's theorem; p-group; Elementary abelian group.

Harish-Chandra Memorial Talk G. DANIEL MOSTOW 51 Harish-Chandra Memorial Talk V. S. VARADARAJAN 55 An Elementary Introduction to Harish-Chandra's Work REBECCA A. HERB 59 Stabilization of a Family of Differential Equations JAMES ARTHUR 77 Orbital Integrals of Nilpotent Orbits DAN BARBASCH 97 Representation Theory of p-adic Groups: A View from. 59 Roger Howe and Allen Moy, Harish-Chandra homomorphisms for p-adic groups, 58 H. Blaine Lawson, Jr., The theory of gauge fields in four dimensions, 57 Jerry L. Kazdan, Prescribing the curvature of a Riemannian manifold, 56 Hari Bercovici, Ciprian Foia§, and Carl Pearcy, Dual algebras with applications to invariant. 59 Roger Howe and Allen Moy, Harish-Chandra homomorphisms for p-adic groups, 58 H. Blaine Lawson, Jr., The theory of gauge fields in four dimensions, 57 Jerry L. Kazdan, Prescribing the curvature of a Riernannian manifold, 56 Hari Bercovici, Ciprian Foia§, and Carl Pearcy, Dual algebras with applications to. 59 Ri>ger Howe and Allen Moy, Harish-Chandra homomorphisms for p-adic groups, 58 fl. Blaine Lawson, Jr., The theory of gauge fields in four dimensions, 57 Jerry L. Kazdan, Prescribing the curvature of a Riemannian manifold, 56 Hari Bercovici, Ciprian Foia§, and Carl Pearcy, Dual algebras with applications to invariant.