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concrete category
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(Definition)
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A concrete category over a category
 is a category
 together with a faithful functor
 . (The functor $U$ is sometimes called the forgetful functor or the underlying functor.)
A concrete category over $\Set$ is called a construct. (Here $\Set$ denotes the category of sets.)
This means that in a construct objects can be interpreted as sets and morphisms as maps.
Remarks:
- An alternative meaning of a concrete category is that of a category with objects that have elements; such objects can be classes, semigroups, monoids, groups, groupoids, topological spaces, and so on.
- Note also the Yoneda-Grothendieck Lemma that relates a category $\mathcal{C}$ to the functor category $\hat{\mathcal{C}}$ of contravariant functors from $\mathcal{C}$ to ${\bf Sets}$ , the category of sets.
- 1
- J. Adámek, H. Herrlich, and G. Strecker.
Abstract and Concrete Categories.
Wiley, New York, 1990.
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"concrete category" is owned by kompik. [ full author list (4) ]
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Cross-references: functor category, topological spaces, groupoids, groups, monoids, semigroups, classes, maps, morphisms, objects, category of sets, functor, faithful functor, category
There are 16 references to this entry.
This is version 9 of concrete category, born on 2006-06-30, modified 2008-10-19.
Object id is 8118, canonical name is ConcreteCategory.
Accessed 3358 times total.
Classification:
| AMS MSC: | 18A05 (Category theory; homological algebra :: General theory of categories and functors :: Definitions, generalizations) |
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Pending Errata and Addenda
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