James S. Milne

Étale Cohomology

Name: Étale Cohomology
Brand: Princeton University Press
SKU: 9780691171104
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A01=James S. Milne

Abelian category

Affine variety

Age Group_Uncategorized

Alexander Grothendieck

Algebraic closure

Algebraic cycle

Algebraic equation

Algebraic space

Algebraically closed field

Author_James S. Milne

automatic-update

Base change

Brauer group

Category of sets

Category1=Non-Fiction

Category=PBMW

Category=PBPH

Category=PBX

Chow's lemma

Closed immersion

Codimension

Cohomology

Cohomology ring

Cokernel

Commutative diagram

Complex number

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Dedekind domain

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Diagram (category theory)

Direct limit

eq_isMigrated=2

eq_nobargain

Existential quantification

Fibration

Field of fractions

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Functor

Fundamental group

G-module

Galois cohomology

Galois extension

Galois group

Group scheme

Henselian ring

Integral domain

Intersection (set theory)

Invertible sheaf

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Language_English

Lefschetz pencil

Local ring

Morphism

Noetherian

Open set

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Presheaf (category theory)

Price_€50 to €100

Principal homogeneous space

Profinite group

Projection (mathematics)

Projective variety

PS=Active

Residue field

Sheaf (mathematics)

Sheaf of modules

softlaunch

Spectral sequence

Stein factorization

Subalgebra

Subcategory

Subgroup

Subring

Subset

Surjective function

Theorem

Topological space

Topology

Torsion sheaf

Torsor (algebraic geometry)

Vector bundle

Weil conjecture

Yoneda lemma

Zariski topology

Zariski's main theorem

Product details

ISBN 9780691171104
Weight: 454g
Dimensions: 152 x 229mm
Publication Date: 21 Mar 2017
Publisher: Princeton University Press
Publication City/Country: US
Product Form: Paperback
Language: English

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One of the most important mathematical achievements of the past several decades has been A. Grothendieck's work on algebraic geometry. In the early 1960s, he and M. Artin introduced etale cohomology in order to extend the methods of sheaf-theoretic cohomology from complex varieties to more general schemes. This work found many applications, not only in algebraic geometry, but also in several different branches of number theory and in the representation theory of finite and p-adic groups. Yet until now, the work has been available only in the original massive and difficult papers. In order to provide an accessible introduction to etale cohomology, J. S. Milne offers this more elementary account covering the essential features of the theory. The author begins with a review of the basic properties of flat and etale morphisms and of the algebraic fundamental group. The next two chapters concern the basic theory of etale sheaves and elementary etale cohomology, and are followed by an application of the cohomology to the study of the Brauer group. After a detailed analysis of the cohomology of curves and surfaces, Professor Milne proves the fundamental theorems in etale cohomology -- those of base change, purity, Poincare duality, and the Lefschetz trace formula. He then applies these theorems to show the rationality of some very general L-series. Originally published in 1980. The Princeton Legacy Library uses the latest print-on-demand technology to again make available previously out-of-print books from the distinguished backlist of Princeton University Press. These editions preserve the original texts of these important books while presenting them in durable paperback and hardcover editions. The goal of the Princeton Legacy Library is to vastly increase access to the rich scholarly heritage found in the thousands of books published by Princeton University Press since its founding in 1905.

J. S. Milne is Professor Emeritus of Mathematics at the University of Michigan at Ann Arbor.