Cohomology of arithmetic groups and automorphic forms : proceedings of a conference held in Luminy/Marseille, France, May 22-27, 1989 /
Cohomology of arithmetic groups serves as a tool in studying possible relations between the theory of automorphic forms and the arithmetic of algebraic varieties resp. the geometry of locally symmetric spaces. These proceedings will serve as a guide to this still rapidly developing area of mathemati...
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| Other Authors: | , |
| Format: | eBook |
| Language: | English |
| Published: |
Berlin ; New York :
Springer-Verlag,
[1990]
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| Series: | Lecture notes in mathematics (Springer-Verlag) ;
1447. |
| Subjects: | |
| Online Access: | Connect to the full text of this electronic book |
Table of Contents:
- J. Schwermer: Cohomology of arithmetic groups, automorphic forms and L-Functions
- N. Wallach: Limit multiplicities in L(G)
- A. Ash, A. Borel: Generalized modular symbols
- S. Bcherer: On Yoshida's theta lift
- G. Harder: Some results on the Eisenstein cohomology of arithmetic subgroups of GLn
- M. Harris: Period invariants of Hilbert modular forms, I: Trilinear differential operators and L-functions
- R.-P. Holzapfel: An effective finiteness theorem for ball lattices
- Y. Konno: Unitary representations with nonzero multiplicities in L(G)
- J.-P. Labesse: Signature des varits modulaires de Hilbert et reprsentations didrales
- T. Oda: The Riemann-Hodge period relation for Hilbert modular forms of weight 2
- M. Reeder: Modular symbols and the Steinberg representation
- J. Rohlfs: Lefschetz numbers for arithmetic groups
- J. Rohlfs, B. Speh: Boundary contributions to Lefschetz numbers for arithmetic groups I
- S.P. Wang: Embedding of Flensted-Jensen modules in L(G) in the noncompact case
- List of talks
- List of participants.