mixed Hodge structures
E921615
Mixed Hodge structures are algebraic structures on cohomology groups that generalize pure Hodge structures by incorporating a weight filtration, allowing the study of varieties with singularities or non-compactness.
All labels observed (1)
| Label | Occurrences |
|---|---|
| mixed Hodge structures canonical | 1 |
How this entity was disambiguated
This entity first appeared as the object of triple T11365396 — 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: mixed Hodge structures Context triple: [Deligne cohomology, relatedTo, mixed Hodge structures]
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A.
Hodge theory
Hodge theory is a branch of mathematics that studies the relationship between differential forms, cohomology, and complex geometry, particularly on complex manifolds.
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B.
Hodge filtration
The Hodge filtration is a decreasing sequence of complex subspaces on the cohomology of a complex algebraic variety that encodes its Hodge decomposition and mixed Hodge structure.
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C.
Hodge–Riemann bilinear relations
The Hodge–Riemann bilinear relations are fundamental positivity and orthogonality conditions on the intersection form in Hodge theory that underpin results such as the hard Lefschetz theorem and the Hodge index theorem.
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D.
Deligne cohomology
Deligne cohomology is a refined cohomology theory in algebraic geometry that combines singular cohomology and differential forms to capture both topological and arithmetic information about complex algebraic varieties.
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E.
Hodge decomposition
Hodge decomposition is a fundamental result in differential geometry and Hodge theory that expresses differential forms on a Riemannian manifold uniquely as sums of exact, co-exact, and harmonic components.
- F. None of above. chosen
- G. Unsure - the case is ambiguous/there is not enough information to decide.
Target entity: mixed Hodge structures Target entity description: Mixed Hodge structures are algebraic structures on cohomology groups that generalize pure Hodge structures by incorporating a weight filtration, allowing the study of varieties with singularities or non-compactness.
-
A.
Hodge theory
Hodge theory is a branch of mathematics that studies the relationship between differential forms, cohomology, and complex geometry, particularly on complex manifolds.
-
B.
Hodge filtration
The Hodge filtration is a decreasing sequence of complex subspaces on the cohomology of a complex algebraic variety that encodes its Hodge decomposition and mixed Hodge structure.
-
C.
Hodge–Riemann bilinear relations
The Hodge–Riemann bilinear relations are fundamental positivity and orthogonality conditions on the intersection form in Hodge theory that underpin results such as the hard Lefschetz theorem and the Hodge index theorem.
-
D.
Deligne cohomology
Deligne cohomology is a refined cohomology theory in algebraic geometry that combines singular cohomology and differential forms to capture both topological and arithmetic information about complex algebraic varieties.
-
E.
Hodge decomposition
Hodge decomposition is a fundamental result in differential geometry and Hodge theory that expresses differential forms on a Riemannian manifold uniquely as sums of exact, co-exact, and harmonic components.
- F. None of above. chosen
Statements (49)
| Predicate | Object |
|---|---|
| instanceOf |
mathematical concept
ⓘ
structure in Hodge theory ⓘ |
| allowsStudyOf |
non-compact varieties
ⓘ
varieties with singularities ⓘ |
| appearsIn |
Deligne’s mixed Hodge theory
NERFINISHED
ⓘ
study of cohomology with compact support ⓘ study of intersection cohomology ⓘ |
| appliesTo |
cohomology of complex algebraic varieties
ⓘ
cohomology of open varieties ⓘ cohomology of singular varieties ⓘ |
| categoryProperty |
closed under extensions
ⓘ
forms an abelian category ⓘ |
| definedOn | cohomology group ⓘ |
| definedOver |
complex numbers
ⓘ
rational numbers ⓘ real numbers ⓘ |
| field |
Hodge theory
NERFINISHED
ⓘ
algebraic geometry ⓘ algebraic topology ⓘ complex geometry ⓘ |
| generalizes | pure Hodge structure ⓘ |
| hasComponent |
Hodge filtration
ⓘ
weight filtration ⓘ |
| hasFiltration |
decreasing Hodge filtration
ⓘ
increasing weight filtration ⓘ |
| hasInvariant |
Hodge numbers of graded pieces
ⓘ
weight filtration length ⓘ |
| hasMorphisms | strictly compatible with filtrations ⓘ |
| hasUnderlyingObject |
finite-dimensional complex vector space
ⓘ
finite-dimensional rational vector space ⓘ finite-dimensional real vector space ⓘ |
| HodgeFiltrationSymbol | F^• ⓘ |
| introducedBy | Pierre Deligne NERFINISHED ⓘ |
| introducedInContextOf | cohomology of algebraic varieties ⓘ |
| introducedInDecade | 1970s ⓘ |
| property |
each graded piece for the weight filtration carries a pure Hodge structure
ⓘ
functorial in cohomology ⓘ |
| relatedConcept |
Deligne cohomology
NERFINISHED
ⓘ
mixed Hodge module ⓘ variation of Hodge structure ⓘ weight filtration of monodromy ⓘ |
| satisfies |
Hodge decomposition on graded pieces
ⓘ
Hodge symmetry on graded pieces ⓘ |
| usedFor |
study of algebraic cycles
ⓘ
study of degenerations of Hodge structures ⓘ study of fundamental groups of varieties ⓘ study of motives ⓘ study of variation of mixed Hodge structure ⓘ |
| weightFiltrationSymbol | W_• ⓘ |
How these facts were elicited
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Subject: mixed Hodge structures Description of subject: Mixed Hodge structures are algebraic structures on cohomology groups that generalize pure Hodge structures by incorporating a weight filtration, allowing the study of varieties with singularities or non-compactness.
Referenced by (1)
Full triples — surface form annotated when it differs from this entity's canonical label.