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Initial and terminal object : ウィキペディア英語版
Initial and terminal objects

In category theory, a branch of mathematics, an initial object of a category C is an object ''I'' in C such that for every object ''X'' in C, there exists precisely one morphism ''I'' → ''X''.
The dual notion is that of a terminal object (also called terminal element): ''T'' is terminal if for every object ''X'' in C there exists a single morphism ''X'' → ''T''. Initial objects are also called coterminal or universal, and terminal objects are also called final.
If an object is both initial and terminal, it is called a zero object or null object. A pointed category is one with a zero object.
A strict initial object ''I'' is one for which every morphism into ''I'' is an isomorphism.
==Examples==

* The empty set is the unique initial object in the category of sets; every one-element set (singleton) is a terminal object in this category; there are no zero objects.
*Similarly, the empty space is the unique initial object in the category of topological spaces; every one-point space is a terminal object in this category.
* In the category Rel of sets and relations, the empty set is the unique zero object.
* In the category of non-empty sets, there are no initial objects. The singletons are not initial: while every non-empty set admits a function from a singleton, this function is in general not unique.
* In the category of pointed sets (whose objects are non-empty sets together with a distinguished element; a morphism from to being a function with , every singleton is a zero object. Similarly, in the category of pointed topological spaces, every singleton is a zero object.
* In the category of semigroups, the empty semigroup is the unique initial object and any singleton semigroup is a terminal object. There are no zero objects. In the subcategory of monoids, however, every trivial monoid (consisting of only the identity element) is a zero object.
* In the category of groups, any trivial group is a zero object. There are zero objects also for the category of abelian groups, category of pseudo-rings Rng ( the zero ring), category of modules over a ring, and category of vector spaces over a field; see zero object (algebra) for details. This is the origin of the term "zero object".
* In the category of rings with unity and unity-preserving morphisms, the ring of integers Z is an initial object. The zero ring consisting only of a single element 0 = 1 is a terminal object.
* In the category of fields, there are no initial or terminal objects. However, in the subcategory of fields of fixed characteristic, the prime field is an initial object.
* Any partially ordered set can be interpreted as a category: the objects are the elements of , and there is a single morphism from to if and only if . This category has an initial object if and only if has a least element; it has a terminal object if and only if has a greatest element.
* All monoids may be considered, in their own right, to be categories with a single object. In this sense, each monoid is a category that consists of one object and a collection of specific morphisms to itself. This one object is neither initial or terminal unless the monoid is trivial, in which case it is both.
* In the category of graphs, the null graph, containing no vertices nor edges, is an initial object. If loops are permitted, then the graph with a single vertex and one loop is terminal. The category of simple graphs does not have a terminal object.
* Similarly, the category of all small categories with functors as morphisms has the empty category as initial object and the category 1 (with a single object and morphism) as terminal object.
* Any topological space can be viewed as a category by taking the open sets as objects, and a single morphism between two open sets and if and only if . The empty set is the initial object of this category, and is the terminal object. This is a special case of the case "partially ordered set", mentioned above. Take the set of open subsets.
* If is a topological space (viewed as a category as above) and is some small category, we can form the category of all contravariant functors from to , using natural transformations as morphisms. This category is called the ''category of presheaves on X with values in C''. If has an initial object , then the constant functor which sends every open set to is an initial object in the category of presheaves. Similarly, if has a terminal object, then the corresponding constant functor serves as a terminal presheaf.
* In the category of schemes, Spec(Z) the prime spectrum of the ring of integers is a terminal object. The empty scheme (equal to the prime spectrum of the zero ring) is an initial object.
* If we fix a homomorphism of abelian groups, we can consider the category consisting of all pairs where is an abelian group and is a group homomorphism with . A morphism from the pair to the pair is defined to be a group homomorphism with the property . The kernel of ƒ is a terminal object in this category; this is nothing but a reformulation of the universal property of kernels. With an analogous construction, the cokernel of ƒ can be seen as an initial object of a suitable category.
* In the category of interpretations of an algebraic model, the initial object is the initial algebra, the interpretation that provides as many distinct objects as the model allows and no more.

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