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• Cosheaf abstract "In topology, a branch of mathematics, a cosheaf with values in an ∞-category C that admits colimit is a functor F from the category of open subsets of a topological space X (more precisely its nerve) to C such that(1) The F of the empty set is the initial object.(2) For any increasing sequence of open subsets with union U, the canonical map is an equivalence.(3) is the pushout of and .The basic example is where on the right is the singular chain complex of U with coefficients in an abelian group A.Example: If f is a continuous map, then is a cosheaf.".
• Cosheaf wikiPageExternalLink LectureVIII-Poincare.pdf.
• Cosheaf wikiPageID "42012361".
• Cosheaf wikiPageRevisionID "599855651".
• Cosheaf date "February 2014".
• Cosheaf target "Draft:Sheaf".
• Cosheaf subject Category:Algebraic_topology.
• Cosheaf subject Category:Category_theory.
• Cosheaf subject Category:Sheaf_theory.
• Cosheaf comment "In topology, a branch of mathematics, a cosheaf with values in an ∞-category C that admits colimit is a functor F from the category of open subsets of a topological space X (more precisely its nerve) to C such that(1) The F of the empty set is the initial object.(2) For any increasing sequence of open subsets with union U, the canonical map is an equivalence.(3) is the pushout of and .The basic example is where on the right is the singular chain complex of U with coefficients in an abelian group A.Example: If f is a continuous map, then is a cosheaf.".
• Cosheaf label "Cosheaf".
• Cosheaf sameAs m.0_s0g5m.
• Cosheaf sameAs Q16951980.
• Cosheaf sameAs Q16951980.
• Cosheaf wasDerivedFrom Cosheaf?oldid=599855651.
• Cosheaf isPrimaryTopicOf Cosheaf.