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Cohomology of Arithmetic Groups and Automorphic Forms : Proceedings of a Conference held in Luminy/Marseille, France, May 22-27 1989 / edited by Jean-Pierre Labesse, Joachim Schwermer.
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View onlineMath/Physics/Astronomy Library QA3 .L28 v.1-999 470,523,830,849:2nd ed. v.1000-1722,1762,1781,1799-2099,2100-2192-2218 2219-2223-2258,2260-2271,2273-2274-2277,2279-2281,2283-2289,2291,2293-2294,2296,2298-2299,2300-2311,2313-2379,2381-2384 2385-2386,2388-2389
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LIBRA QA3 .L28 Scattered vols.
Mixed Availability
- Format:
- Book
- Series:
- Lecture Notes in Mathematics, 0075-8434 ; 1447.
- Lecture Notes in Mathematics, 0075-8434 ; 1447
- Language:
- English
- Subjects (All):
- Number theory.
- Geometry, Algebraic.
- Number Theory.
- Algebraic Geometry.
- Local Subjects:
- Number Theory.
- Algebraic Geometry.
- Physical Description:
- 1 online resource (VI, 362 pages).
- Contained In:
- Springer eBooks
- Place of Publication:
- Berlin, Heidelberg : Springer Berlin Heidelberg : Imprint: Springer, 1990.
- System Details:
- text file PDF
- Summary:
- 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 mathematics. Besides two survey articles, the contributions are original research papers.
- Contents:
- Cohomology of arithmetic groups, automorphic forms and L-functions
- Limit multiplicities in L 2(??G)
- Generalized modular symbols
- On Yoshida's theta lift
- Some results on the Eisenstein cohomology of arithmetic subgroups of GL n
- Period invariants of Hilbert modular forms, I: Trilinear differential operators and L-functions
- An effective finiteness theorem for ball lattices
- Unitary representations with nonzero multiplicities in L2(??G)
- Signature des variétés modulaires de Hilbert et representations diédrales
- The Riemann-Hodge period relation for Hilbert modular forms of weight 2
- Modular symbols and the Steinberg representation
- Lefschetz numbers for arithmetic groups
- Boundary contributions to Lefschetz numbers for arithmetic groups I
- Embedding of Flensted-Jensen modules in L 2(??G) in the noncompact case.
- Other Format:
- Printed edition:
- ISBN:
- 9783540468769
- Access Restriction:
- Restricted for use by site license.
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