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presheaf

From Wiktionary, the free dictionary

English

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Etymology

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From pre- +‎ sheaf.

Noun

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presheaf (plural presheaves or presheafs)

  1. (category theory, sheaf theory) An abstract mathematical construct which associates data to the open sets of a topological space, generalizing the situation of functions, fiber bundles, manifold structure, etc. on a topological space (but not necessarily in such a way as to make the local and global data compatible, as in a sheaf). Formally, A contravariant functor whose domain is a category whose objects are open sets of a topological space (called the base space or underlying space) and whose morphisms are inclusion mappings. The image of each open set under is an object whose elements are called sections, and are which are said to be over the given open set; the image of each inclusion map under is a morphism , called the restriction from to and denoted or .[1]
    • 2011 June 27, Tom Leinster, “An informal introduction to topos theory”, in arXiv.org[1], Cornell University Library, retrieved 2018-03-18:
      Let X be a topological space. (Following tradition, I will switch from my previous convention of using X to denote an object of a topos.) Write Open(X) for its poset of open subsets. A presheaf on X is a functor . It assigns to each open subset U a set F(U), whose elements are called sections over U (for reasons to be explained). It also assigns to each open a function , called restriction from U to V and denoted by . I will write Psh(X) for the category of presheaves on X.

      Examples 3.1      i. Let F(U) = {continuous functions }; restriction is restriction.

Usage notes

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  • If the base space is denoted as X and the presheaf's codomain is denoted A, then the presheaf is said to be "on X, with values in A".

Hyponyms

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References

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  1. ^ jocaps. "presheaf of a topological basis". PlanetMath.org. Freely available at http://planetmath.org/presheafofatopologicalbasis