Initial object

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Definition

Suppose ${\mathcal {C}}$ is a category. An initial object in ${\mathcal {C}}$ is an object $A\in \operatorname {Ob} {\mathcal {C}}$ such that for any object $B\in \operatorname {Ob} {\mathcal {C}}$ , there is a unique morphism from $A$ to $B$ .

If an initial object exists, then any two initial objects are isomorphic, and there is a unique isomorphism between them. In particular, the automorphism group of any initial object is trivial.

Examples

Examples of initial objects

The empty set is an initial object in the category of sets.
A one-point set is an initial object in the category of pointed sets.
The trivial group is an initial object in the category of groups.
The ring of integers is an initial object in the category of unital rings.
The empty topological space is an initial object in the category of topological spaces.

Examples of categories without initial objects

The category of fields has no initial object. Every field has a unique field embedding of its prime subfield; however, there are multiple isomorphism classes of prime fields.
The category of nontrivial finite groups has no initial object.

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