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Global element

In category theory, a global element of an object A from a category is a morphism

where is a terminal object of the category. Roughly speaking, global elements are a generalization of the notion of "elements" from the category of sets, and they can be used to import set-theoretic concepts into category theory. However, unlike a set, an object of a general category need not be determined by its global elements (not even up to isomorphism).

Examples

  • In the category of sets, the terminal objects are the singletons, so a global element of can be assimilated to an element of in the usual (set-theoretic) sense. More precisely, there is a natural isomorphism .
  • Similarly, in the category of (small) categories, terminals objects are unit categories (having a single object and a single morphism which is the identity of that object). Consequently, a global element of a category is simply an object of that category. More precisely, there is a natural isomorphism (where is the objects functor).
  • In the category of graphs, the terminal objects are graphs with a single vertex and a single self-loop on that vertex, whence the global elements of a graph are its self-loops.
  • In an overcategory , the object is terminal. The global elements of an object are the sections of .

In topos theory

In an elementary topos the global elements of the subobject classifier form a Heyting algebra when ordered by inclusion of the corresponding subobjects of the terminal object. For example, Grph happens to be a topos, whose subobject classifier is a two-vertex directed clique with an additional self-loop (so five edges, three of which are self-loops and hence the global elements of ). The internal logic of Grph is therefore based on the three-element Heyting algebra as its truth values.

References

See also