Weil divisor

E244844

A Weil divisor is a formal integer linear combination of irreducible subvarieties of codimension one on an algebraic variety, used to study its geometric and arithmetic properties.

All labels observed (1)

Label Occurrences
Weil divisor canonical 1

How this entity was disambiguated

Statements (47)

Predicate Object
instanceOf divisor in algebraic geometry
mathematical object
alsoCalled divisor
appearsIn Weil conjectures
associatedTo valuation of the function field
canBePulledBackAlong proper morphism under suitable conditions
canBePushedForwardAlong proper morphism
canBeRestrictedTo subvariety
coincidesWithCartierDivisorOn nonsingular variety
definedAs formal integer linear combination of irreducible subvarieties of codimension one
definedOn algebraic variety
differsFromCartierDivisorOn singular variety
encodes zeros and poles of rational functions
generalizes divisor on a smooth projective curve
hasCoefficientType integer
hasComponentType irreducible subvariety of codimension one
hasConditionForEffectiveness all coefficients are nonnegative integers
hasEquivalenceRelation linear equivalence of divisors
hasGroupStructure abelian group under addition
hasNotation Div(X) for group of Weil divisors on a variety X
hasOperation addition
intersection with curves
linear equivalence
subtraction
hasSubClass Cartier divisor
effective Weil divisor
principal divisor
hasSupport union of codimension-one subvarieties with nonzero coefficient
isIntegralCombinationOf prime divisors
namedAfter André Weil
primeDivisorDefinedAs irreducible reduced closed subscheme of codimension one
quotientByLinearEquivalenceGives divisor class group Cl(X)
relatedTo Cartier divisor
Picard group
class group
line bundle
principal divisor
usedIn algebraic geometry
arithmetic geometry
birational geometry
intersection theory
minimal model program
theory of linear systems on varieties
usedToDefine Weil divisor class
divisor class group
usedToStudy arithmetic properties of varieties
geometric properties of varieties

How these facts were elicited

Referenced by (1)

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

André Weil notableConcept Weil divisor