Hasse–Arf theorem

E207315

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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Hasse–Arf theorem canonical 3

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Predicate Object
instanceOf mathematical theorem
result in local class field theory
theorem in algebraic number theory
appliesTo Galois groups of abelian extensions of local fields
finite abelian extensions of local fields
asserts jumps in the upper numbering ramification filtration of abelian extensions occur at integers
clarifies structure of higher ramification groups in abelian extensions
concerns abelian extensions of local fields
jumps in the ramification filtration
ramification filtration
upper numbering ramification groups
context Galois theory of local fields
local class field theory
valuation theory
contrastsWith non-abelian extensions where upper ramification breaks may be non-integral
field algebraic number theory
local field theory
ramification theory
holdsFor finite abelian Galois extensions of non-archimedean local fields
implies Artin conductors of characters of abelian local Galois groups are integers
Swan conductors of characters of abelian local Galois groups are integers
breaks in the upper ramification filtration of abelian extensions are integers
ramification breaks of abelian extensions in upper numbering are not fractional
involves Galois group filtration by higher ramification groups
complete discretely valued fields with finite residue field
discrete valuation fields
namedAfter Cahit Arf
Helmut Hasse
relatedTo Artin conductor
Herbrand function
Swan conductor
ramification breaks
relates upper numbering and lower numbering of ramification groups
status classical theorem in local field theory
fundamental result in algebraic number theory
typeOf integrality theorem in ramification theory
usedIn analysis of wild ramification
computation of discriminants of abelian extensions
local class field theory reciprocity
study of conductors of Galois representations
study of local L-factors
uses lower numbering of ramification groups
upper numbering of ramification groups

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Referenced by (3)

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

Helmut Hasse notableWork Hasse–Arf theorem
Cahit Arf knownFor Hasse–Arf theorem
Cahit Arf notableConcept Hasse–Arf theorem