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)

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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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Referenced by (5)

Full triples — surface form annotated when it differs from this entity's canonical label.

Jean-Pierre Serre notableWork Serre’s conjecture on Galois representations
Jean-Pierre Serre notableWork Serre’s conjecture on Galois representations
this entity surface form: Serre’s conjecture on modular forms
Serre’s conjecture on Galois representations hasPart Serre’s conjecture on Galois representations self-linksurface differs
this entity surface form: weak Serre conjecture
Serre’s conjecture on Galois representations hasPart Serre’s conjecture on Galois representations self-linksurface differs
this entity surface form: strong Serre conjecture
Serre’s conjecture on Galois representations involves Serre’s conjecture on Galois representations self-linksurface differs
this entity surface form: Serre level