Cohomologie Galoisienne
E253118
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.
All labels observed (2)
| Label | Occurrences |
|---|---|
| Cohomologie Galoisienne canonical | 1 |
| Cohomology of Number Fields | 1 |
How this entity was disambiguated
This entity first appeared as the object of triple T2306396 — 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: Cohomologie Galoisienne Context triple: [Jean-Pierre Serre, notableWork, Cohomologie Galoisienne]
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A.
Weil cohomology
Weil cohomology is a type of cohomology theory for algebraic varieties that satisfies specific axioms enabling the proof of the Weil conjectures and the development of modern algebraic geometry.
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B.
L’intégration dans les groupes topologiques et ses applications
L’intégration dans les groupes topologiques et ses applications is a foundational mathematical monograph by André Weil that develops the theory of integration on topological groups and explores its far-reaching applications in analysis and number theory.
-
C.
Hilbert’s twelfth problem
Hilbert’s twelfth problem is one of David Hilbert’s famous list of 23 problems, asking for a general explicit class field theory that would generate all abelian extensions of a given number field using special values of analytic functions.
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D.
Hasse–Arf theorem
The Hasse–Arf theorem is a fundamental result in algebraic number theory that precisely characterizes the jumps in the ramification filtration of abelian extensions of local fields, showing they occur at integer values.
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E.
Sur les courbes algébriques et les variétés qui s’en déduisent
Sur les courbes algébriques et les variétés qui s’en déduisent is a foundational 1948 monograph by André Weil that helped establish modern algebraic geometry and introduced key ideas leading to the Weil conjectures.
- F. None of above. chosen
- G. Unsure - the case is ambiguous/there is not enough information to decide.
Target entity: Cohomologie Galoisienne Target entity description: 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.
-
A.
Weil cohomology
Weil cohomology is a type of cohomology theory for algebraic varieties that satisfies specific axioms enabling the proof of the Weil conjectures and the development of modern algebraic geometry.
-
B.
L’intégration dans les groupes topologiques et ses applications
L’intégration dans les groupes topologiques et ses applications is a foundational mathematical monograph by André Weil that develops the theory of integration on topological groups and explores its far-reaching applications in analysis and number theory.
-
C.
Hilbert’s twelfth problem
Hilbert’s twelfth problem is one of David Hilbert’s famous list of 23 problems, asking for a general explicit class field theory that would generate all abelian extensions of a given number field using special values of analytic functions.
-
D.
Hasse–Arf theorem
The Hasse–Arf theorem is a fundamental result in algebraic number theory that precisely characterizes the jumps in the ramification filtration of abelian extensions of local fields, showing they occur at integer values.
-
E.
Sur les courbes algébriques et les variétés qui s’en déduisent
Sur les courbes algébriques et les variétés qui s’en déduisent is a foundational 1948 monograph by André Weil that helped establish modern algebraic geometry and introduced key ideas leading to the Weil conjectures.
- F. None of above. chosen
Statements (49)
| Predicate | Object |
|---|---|
| instanceOf |
mathematics book
ⓘ
monograph ⓘ |
| appliesTo |
algebraic varieties
ⓘ
local fields ⓘ number fields ⓘ |
| author | Jean-Pierre Serre ⓘ |
| field |
algebra
ⓘ
algebraic geometry ⓘ number theory ⓘ |
| focusesOn | systematic development of Galois cohomology ⓘ |
| hasAbbreviation | CG ⓘ |
| hasAuthor | Jean-Pierre Serre ⓘ |
| hasReputation | foundational work on Galois cohomology ⓘ |
| influenced |
arithmetic geometry
ⓘ
modern number theory ⓘ theory of motives ⓘ |
| language | French ⓘ |
| mainSubject | Galois cohomology ⓘ |
| mathematicalArea |
algebraic number theory
ⓘ
arithmetic algebraic geometry ⓘ |
| originalLanguage | French ⓘ |
| publisher | Springer ⓘ |
| relatedTo |
Grothendieck’s cohomological methods
ⓘ
Serre duality in arithmetic contexts ⓘ étale cohomology ⓘ |
| series | Lecture Notes in Mathematics ⓘ |
| topic |
Brauer group
ⓘ
Galois group ⓘ
surface form:
Galois groups
Galois modules ⓘ Galois representations ⓘ Hilbert symbol ⓘ Kummer theory ⓘ Poitou–Tate duality ⓘ Tate cohomology ⓘ Shafarevich group of a torus ⓘ
surface form:
Tate–Shafarevich group
Weil group ⓘ class field theory ⓘ cohomological dimension ⓘ cohomology of local fields ⓘ cohomology of number fields ⓘ cohomology of profinite groups ⓘ continuous cochains ⓘ global class field theory ⓘ global fields ⓘ group cohomology ⓘ local class field theory ⓘ local fields ⓘ |
| usedAs |
graduate textbook
ⓘ
research reference ⓘ |
How these facts were elicited
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Subject: Cohomologie Galoisienne Description of subject: 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.
Referenced by (2)
Full triples — surface form annotated when it differs from this entity's canonical label.