Serre’s conjecture on Galois representations
E253116
Serre’s conjecture on Galois representations is a landmark statement in number theory that predicts which two-dimensional mod p Galois representations of the absolute Galois group of the rationals arise from modular forms.
All labels observed (5)
| Label | Occurrences |
|---|---|
| Serre level | 1 |
| Serre’s conjecture on Galois representations canonical | 1 |
| Serre’s conjecture on modular forms | 1 |
| strong Serre conjecture | 1 |
| weak Serre conjecture | 1 |
How this entity was disambiguated
This entity first appeared as the object of triple T2306393 — 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: Serre’s conjecture on Galois representations Context triple: [Jean-Pierre Serre, notableWork, Serre’s conjecture on Galois representations]
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A.
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.
-
B.
Birch and Swinnerton-Dyer Conjecture
The Birch and Swinnerton-Dyer Conjecture is a central unsolved problem in number theory that predicts a deep connection between the arithmetic of rational points on an elliptic curve and the behavior of its associated L-function at a specific value.
-
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.
Weil conjectures
The Weil conjectures are a set of deep statements about the zeta functions of algebraic varieties over finite fields that guided the development of modern algebraic geometry and were ultimately proved using étale cohomology.
-
E.
Hilbert’s irreducibility theorem
Hilbert’s irreducibility theorem is a fundamental result in number theory and algebraic geometry that ensures many polynomial equations with parameterized coefficients retain irreducibility for infinitely many specializations of those parameters.
- F. None of above. chosen
- G. Unsure - the case is ambiguous/there is not enough information to decide.
Target entity: Serre’s conjecture on Galois representations Target entity description: Serre’s conjecture on Galois representations is a landmark statement in number theory that predicts which two-dimensional mod p Galois representations of the absolute Galois group of the rationals arise from modular forms.
-
A.
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.
-
B.
Birch and Swinnerton-Dyer Conjecture
The Birch and Swinnerton-Dyer Conjecture is a central unsolved problem in number theory that predicts a deep connection between the arithmetic of rational points on an elliptic curve and the behavior of its associated L-function at a specific value.
-
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.
Weil conjectures
The Weil conjectures are a set of deep statements about the zeta functions of algebraic varieties over finite fields that guided the development of modern algebraic geometry and were ultimately proved using étale cohomology.
-
E.
Hilbert’s irreducibility theorem
Hilbert’s irreducibility theorem is a fundamental result in number theory and algebraic geometry that ensures many polynomial equations with parameterized coefficients retain irreducibility for infinitely many specializations of those parameters.
- F. None of above. chosen
Statements (46)
| Predicate | Object |
|---|---|
| instanceOf |
conjecture in number theory
ⓘ
mathematical conjecture ⓘ statement about Galois representations ⓘ |
| appliesTo | continuous representations Gal(ℚ̄/ℚ) → GL₂(𝔽_p) ⓘ |
| assumes | odd irreducible two-dimensional mod p Galois representations ⓘ |
| concerns |
absolute Galois group of the rationals
ⓘ
modular forms ⓘ two-dimensional mod p Galois representations ⓘ |
| context | ℚ as base field ⓘ |
| domain | representations of Gal(ℚ̄/ℚ) ⓘ |
| excludes | even Galois representations ⓘ |
| field |
algebraic number theory
ⓘ
arithmetic geometry ⓘ number theory ⓘ |
| generalizes | modularity of elliptic curves over ℚ ⓘ |
| hasConsequence |
classification of odd irreducible two-dimensional mod p representations of Gal(ℚ̄/ℚ)
ⓘ
every such representation arises from a cuspidal eigenform ⓘ |
| hasPart |
Serre’s conjecture on Galois representations
self-linksurface differs
ⓘ
surface form:
strong Serre conjecture
Serre’s conjecture on Galois representations self-linksurface differs ⓘ
surface form:
weak Serre conjecture
|
| hasVariant |
generalisations to Hilbert modular forms
ⓘ
generalisations to totally real fields ⓘ |
| implies | such representations are modular ⓘ |
| influenced |
developments in modularity lifting theorems
ⓘ
research on Galois representations mod p ⓘ |
| involves |
Serre conductor
ⓘ
Serre’s conjecture on Galois representations self-linksurface differs ⓘ
surface form:
Serre level
Serre weight ⓘ |
| isRelatedTo |
Fontaine–Mazur conjecture
ⓘ
Langlands program ⓘ Taniyama–Shimura–Weil conjecture ⓘ Taniyama–Shimura–Weil conjecture ⓘ
surface form:
modularity theorem
|
| isSpecialCaseOf | modularity conjectures for Galois representations ⓘ |
| namedAfter | Jean-Pierre Serre ⓘ |
| predicts | which two-dimensional mod p Galois representations arise from modular forms ⓘ |
| proofCompletedInYear | 2008 ⓘ |
| proposedBy | Jean-Pierre Serre ⓘ |
| provedBy |
Chandrashekhar Khare
ⓘ
Jean-Pierre Wintenberger ⓘ |
| relates |
Galois representations
ⓘ
modular forms ⓘ |
| requires | odd determinant ⓘ |
| specifies |
level of the modular form
ⓘ
nebentypus character of the modular form ⓘ weight of the modular form ⓘ |
| status | proved ⓘ |
| yearProposed | 1987 ⓘ |
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Subject: Serre’s conjecture on Galois representations Description of subject: Serre’s conjecture on Galois representations is a landmark statement in number theory that predicts which two-dimensional mod p Galois representations of the absolute Galois group of the rationals arise from modular forms.
Referenced by (5)
Full triples — surface form annotated when it differs from this entity's canonical label.