Eisenstein Cohomology for GLN and the Special Values of Rankin–Selberg L-Functions

Name: Eisenstein Cohomology for GLN and the Special Values of Rankin–Selberg L-Functions
Brand: Princeton University Press
SKU: 9780691197883
Price: 192.2 EUR
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A01=Anantharam Raghuram

A01=Günter Harder

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Algebraic group

Algebraic number theory

Arithmetic group

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Automorphic form

Base change

Basis (linear algebra)

Borel subgroup

Calculation

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Coefficient

Cohomology

Combination

Commutative ring

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Diagram (category theory)

Dimension

Dirichlet character

Discrete series representation

Eigenvalues and eigenvectors

Eisenstein series

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Euler product

Field of fractions

Freydoon Shahidi

Galois group

Group (mathematics)

Group scheme

Harish-Chandra

Hecke character

Hecke L-function

Hecke operator

Induced representation

Irreducible representation

L-function

Langlands dual group

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Lie algebra

Lie algebra cohomology

Linear combination

Linear map

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Maximal torus

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Natural transformation

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Rational number

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Ring of integers

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Two-dimensional space

Unitary group

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Product details

ISBN 9780691197883
Dimensions: 156 x 235mm
Publication Date: 03 Dec 2019
Publisher: Princeton University Press
Publication City/Country: US
Product Form: Hardback
Language: English

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This book studies the interplay between the geometry and topology of locally symmetric spaces, and the arithmetic aspects of the special values of L-functions.

The authors study the cohomology of locally symmetric spaces for GL(N) where the cohomology groups are with coefficients in a local system attached to a finite-dimensional algebraic representation of GL(N). The image of the global cohomology in the cohomology of the Borel–Serre boundary is called Eisenstein cohomology, since at a transcendental level the cohomology classes may be described in terms of Eisenstein series and induced representations. However, because the groups are sheaf-theoretically defined, one can control their rationality and even integrality properties. A celebrated theorem by Langlands describes the constant term of an Eisenstein series in terms of automorphic L-functions. A cohomological interpretation of this theorem in terms of maps in Eisenstein cohomology allows the authors to study the rationality properties of the special values of Rankin–Selberg L-functions for GL(n) x GL(m), where n + m = N. The authors carry through the entire program with an eye toward generalizations.

This book should be of interest to advanced graduate students and researchers interested in number theory, automorphic forms, representation theory, and the cohomology of arithmetic groups.

Günter Harder is professor emeritus of mathematics at the University of Bonn and former director of the Max Planck Institute for Mathematics. He is the author of the two-volume Lectures on Algebraic Geometry. A. Raghuram is professor and chair of mathematics at the Indian Institute of Science Education and Research, Pune.