Level one algebraic cusp forms of classical groups of small rank / [electronic resource] Gaëtan Chenevier, David Renard.
Material type:
TextSeries: Memoirs of the American Mathematical Society ; v. 1121Publisher: Providence, Rhode Island : American Mathematical Society, 2015Description: 1 online resource (pages cm.)Content type: - text
- unmediated
- volume
- 9781470425098 (online)
- 512.7/4 23
- QA243 .C54 2015
| Item type | Current library | Collection | Call number | Status | Date due | Barcode | Item holds | |
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eBook
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e-Library | EBook | Available |
Includes bibliographical references.
Chapter 1. Introduction Chapter 2. Polynomial invariants of finite subgroups of compact connected Lie groups Chapter 3. Automorphic representations of classical groups : review of Arthur's results Chapter 4. Determination of $\Pi _{\rm alg}^\bot ({\rm PGL}_n)$ for $n\leq 5$ Chapter 5. Description of $\Pi _{\rm disc}({\rm SO}_7)$ and $\Pi _{\rm alg}^{\rm s}({\rm PGL}_6)$ Chapter 6. Description of $\Pi _{\rm disc}({\rm SO}_9)$ and $\Pi _{\rm alg}^{\rm s}({\rm PGL}_8)$ Chapter 7. Description of $\Pi _{\rm disc}({\rm SO}_8)$ and $\Pi _{\rm alg}^{\rm o}({\rm PGL}_8)$ Chapter 8. Description of $\Pi _{\rm disc}({\rm G}_2)$ Chapter 9. Application to Siegel modular forms Appendix A. Adams-Johnson packets Appendix B. The Langlands group of $\mathbb {Z}$ and Sato-Tate groups Appendix C. Tables Appendix D. The $121$ level $1$ automorphic representations of ${\rm SO}_{25}$ with trivial coefficients
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Electronic reproduction. Providence, Rhode Island : American Mathematical Society. 2015
Mode of access : World Wide Web
Description based on print version record.