Galois cohomology
E839567
Galois cohomology is a branch of mathematics that studies Galois groups and their actions on modules using cohomological methods, providing powerful tools for understanding field extensions, algebraic number theory, and arithmetic geometry.
All labels observed (1)
| Label | Occurrences |
|---|---|
| Galois cohomology canonical | 5 |
How this entity was disambiguated
This entity first appeared as the object of triple T10063343 — resolving that mention is where its identity was fixed. The disambiguator weighed these candidate entities and picked the highlighted one (or “None”, minting a new entity). This is how homonymy is resolved: the same surface form can point to different entities.
Target entity: Galois cohomology Context triple: [Hasse norm theorem, hasFormulationIn, Galois cohomology]
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A.
Cohomologie Galoisienne
Cohomologie Galoisienne is a foundational monograph by Jean-Pierre Serre that systematically develops Galois cohomology and its deep applications in number theory and algebraic geometry.
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B.
Galois representations
Galois representations are homomorphisms from Galois groups of field extensions into matrix groups that encode deep arithmetic information and link number theory with algebraic geometry and modular forms.
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C.
Algebraic Groups and Class Fields
"Algebraic Groups and Class Fields" is a influential mathematical monograph that develops the deep connections between algebraic group theory and class field theory within number theory and arithmetic geometry.
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D.
Galois theory
Galois theory is a branch of abstract algebra that studies field extensions and polynomial equations through the structure of their associated symmetry groups.
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E.
étale cohomology
Étale cohomology is a cohomology theory in algebraic geometry that allows one to apply topological and cohomological methods to schemes, particularly over fields with nontrivial arithmetic such as finite fields.
- F. None of above. chosen
- G. Unsure - the case is ambiguous/there is not enough information to decide.
Target entity: Galois cohomology Target entity description: Galois cohomology is a branch of mathematics that studies Galois groups and their actions on modules using cohomological methods, providing powerful tools for understanding field extensions, algebraic number theory, and arithmetic geometry.
-
A.
Cohomologie Galoisienne
Cohomologie Galoisienne is a foundational monograph by Jean-Pierre Serre that systematically develops Galois cohomology and its deep applications in number theory and algebraic geometry.
-
B.
Galois representations
Galois representations are homomorphisms from Galois groups of field extensions into matrix groups that encode deep arithmetic information and link number theory with algebraic geometry and modular forms.
-
C.
Algebraic Groups and Class Fields
"Algebraic Groups and Class Fields" is a influential mathematical monograph that develops the deep connections between algebraic group theory and class field theory within number theory and arithmetic geometry.
-
D.
Galois theory
Galois theory is a branch of abstract algebra that studies field extensions and polynomial equations through the structure of their associated symmetry groups.
-
E.
étale cohomology
Étale cohomology is a cohomology theory in algebraic geometry that allows one to apply topological and cohomological methods to schemes, particularly over fields with nontrivial arithmetic such as finite fields.
- F. None of above. chosen
Statements (60)
| Predicate | Object |
|---|---|
| instanceOf |
branch of mathematics
ⓘ
cohomology theory ⓘ |
| appliesTo |
absolute Galois groups
ⓘ
algebraic extensions of fields ⓘ algebraic number fields ⓘ field extensions ⓘ global fields ⓘ local fields ⓘ |
| field |
algebra
ⓘ
arithmetic geometry ⓘ number theory ⓘ |
| formalDefinition | right derived functors of the fixed-point functor for Galois modules ⓘ |
| hasCanonicalReference | Serre: Galois Cohomology NERFINISHED ⓘ |
| hasHistoricalDevelopmentBy |
Chevalley
NERFINISHED
ⓘ
Serre NERFINISHED ⓘ Tate NERFINISHED ⓘ |
| hasKeyConcept |
Brauer group
NERFINISHED
ⓘ
Galois module ⓘ Hilbert 90 NERFINISHED ⓘ Hochschild–Serre spectral sequence NERFINISHED ⓘ Kummer theory NERFINISHED ⓘ Poitou–Tate duality NERFINISHED ⓘ Shapiro lemma NERFINISHED ⓘ Tate cohomology NERFINISHED ⓘ Tate–Shafarevich group NERFINISHED ⓘ cohomological dimension of a field ⓘ cohomology group H^n(G,M) ⓘ continuous cochains ⓘ corestriction map ⓘ cup product ⓘ fundamental class in H^2 ⓘ inflation–restriction sequence ⓘ local Tate duality NERFINISHED ⓘ norm map ⓘ profinite Galois group ⓘ restriction map ⓘ |
| relatedTo |
Galois representations
NERFINISHED
ⓘ
K-theory of fields NERFINISHED ⓘ Selmer group NERFINISHED ⓘ Weil group NERFINISHED ⓘ class field theory ⓘ motivic cohomology ⓘ étale cohomology ⓘ |
| studies |
Galois groups
ⓘ
actions of Galois groups on modules ⓘ continuous group cohomology of Galois groups ⓘ |
| typicalGroup | absolute Galois group of a field ⓘ |
| typicalModule |
discrete Galois module
GENERATED
ⓘ
finite Galois module GENERATED ⓘ p-adic Galois representation GENERATED ⓘ |
| usedIn |
classification of central simple algebras
ⓘ
description of the Brauer group of a field ⓘ obstructions to local-global principles ⓘ study of principal homogeneous spaces ⓘ study of rational points on varieties ⓘ study of torsors under algebraic groups ⓘ |
| usesMethod |
Ext functors
ⓘ
derived functors ⓘ group cohomology ⓘ homological algebra ⓘ |
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Subject: Galois cohomology Description of subject: Galois cohomology is a branch of mathematics that studies Galois groups and their actions on modules using cohomological methods, providing powerful tools for understanding field extensions, algebraic number theory, and arithmetic geometry.
Referenced by (5)
Full triples — surface form annotated when it differs from this entity's canonical label.