About: T-structure

An Entity of Type: musical work, from Named Graph: http://dbpedia.org, within Data Space: dbpedia.org

In the branch of mathematics called homological algebra, a t-structure is a way to axiomatize the properties of an abelian subcategory of a derived category. A t-structure on consists of two subcategories of a triangulated category or stable infinity category which abstract the idea of complexes whose cohomology vanishes in positive, respectively negative, degrees. There can be many distinct t-structures on the same category, and the interplay between these structures has implications for algebra and geometry. The notion of a t-structure arose in the work of Beilinson, Bernstein, Deligne, and Gabber on perverse sheaves.

Property	Value
dbo:abstract	In the branch of mathematics called homological algebra, a t-structure is a way to axiomatize the properties of an abelian subcategory of a derived category. A t-structure on consists of two subcategories of a triangulated category or stable infinity category which abstract the idea of complexes whose cohomology vanishes in positive, respectively negative, degrees. There can be many distinct t-structures on the same category, and the interplay between these structures has implications for algebra and geometry. The notion of a t-structure arose in the work of Beilinson, Bernstein, Deligne, and Gabber on perverse sheaves. (en)
dbo:wikiPageID	1798923 (xsd:integer)
dbo:wikiPageLength	32862 (xsd:nonNegativeInteger)
dbo:wikiPageRevisionID	1113641275 (xsd:integer)
dbo:wikiPageWikiLink	dbr:Motive_(algebraic_geometry) dbr:Derived_category dbr:Perverse_sheaves dbr:Complex_analytic_space dbr:Mathematics dbr:Opposite_category dbr:Long_exact_sequence dbr:Standard_conjectures_on_algebraic_cycles dbr:Koszul_duality dbr:Spectrum_(topology) dbr:Triangulated_category dbr:Well-behaved dbr:Perverse_sheaf dbr:Adjoint_functor dbr:Algebraic_variety dbr:Direct_sum dbr:Graded_ring dbc:Category_theory dbc:Homological_algebra dbr:Abelian_category dbr:Homological_algebra dbr:Homotopy_group dbr:Sphere_spectrum dbr:Intersection_cohomology dbr:Infinity_category dbr:Compact_object_(category_theory) dbr:Beilinson-Soulé_conjecture
dbp:wikiPageUsesTemplate	dbt:Lowercase_title dbt:Reflist
dcterms:subject	dbc:Category_theory dbc:Homological_algebra
gold:hypernym	dbr:Piece
rdf:type	dbo:MusicalWork
rdfs:comment	In the branch of mathematics called homological algebra, a t-structure is a way to axiomatize the properties of an abelian subcategory of a derived category. A t-structure on consists of two subcategories of a triangulated category or stable infinity category which abstract the idea of complexes whose cohomology vanishes in positive, respectively negative, degrees. There can be many distinct t-structures on the same category, and the interplay between these structures has implications for algebra and geometry. The notion of a t-structure arose in the work of Beilinson, Bernstein, Deligne, and Gabber on perverse sheaves. (en)
rdfs:label	T-structure (en)
owl:sameAs	wikidata:T-structure https://global.dbpedia.org/id/zY45
prov:wasDerivedFrom	wikipedia-en:T-structure?oldid=1113641275&ns=0
foaf:isPrimaryTopicOf	wikipedia-en:T-structure
is dbo:knownFor of	dbr:Alexander_Beilinson
is dbo:wikiPageRedirects of	dbr:Heart_(category_theory)
is dbo:wikiPageWikiLink of	dbr:Semi-simplicity dbr:Decomposition_theorem_of_Beilinson,_Bernstein_and_Deligne dbr:Derived_category dbr:Glossary_of_category_theory dbr:Perverse_sheaf dbr:Alexander_Beilinson dbr:Bridgeland_stability_condition dbr:Heart_(category_theory) dbr:Motivic_cohomology dbr:Stable_∞-category
is dbp:knownFor of	dbr:Alexander_Beilinson
is foaf:primaryTopic of	wikipedia-en:T-structure