Free Delivery Over $100
|
|
|||
|
||||
OverviewIn this paper the authors provide an extension of the theory of descent of Ginzburg-Rallis-Soudry to the context of essentially self-dual representations, that is, representations which are isomorphic to the twist of their own contragredient by some Hecke character. The authors' theory supplements the recent work of Asgari-Shahidi on the functorial lift from (split and quasisplit forms of) $GSpin_{2n}$ to $GL_{2n}$. Full Product DetailsAuthor: Joseph Hundley , Eitan SayagPublisher: American Mathematical Society Imprint: American Mathematical Society Weight: 0.210kg ISBN: 9781470416676ISBN 10: 1470416670 Pages: 125 Publication Date: 30 September 2016 Audience: Professional and scholarly , Professional & Vocational Format: Paperback Publisher's Status: Active Availability: Out of stock  The supplier is temporarily out of stock of this item. It will be ordered for you on backorder and shipped when it becomes available. Table of ContentsIntroduction Part 1. General matters: Some notions related to Langlands functoriality Notation The Spin groups $GSpin_{m}$ and their quasisplit forms ``Unipotent periods'' Part 2. Odd case: Notation and statement Unramified correspondence Eisenstein series I: Construction and main statements Descent construction Appendix I: Local results on Jacquet functors Appendix II: Identities of unipotent periods Part 3. Even case: Formulation of the main result in the even case Notation Unramified correspondence Eisenstein series Descent construction Appendix III: Preparations for the proof of Theorem 15.0.12 Appendix IV: Proof of Theorem 15.0.12 Appendix V: Auxiliary results used to prove Theorem 15.0.12 Appendix VI: Local results on Jacquet functors Appendix VII: Identities of unipotent periods Bibliography.ReviewsAuthor InformationJoseph Hundley, State University of New York at Buffalo, New York, USA. Eitan Sayag, Hebrew University of Jerusalem, Israel. Tab Content 6Author Website:Countries AvailableAll regions |
||||
