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2. Initial and terminal objects - Wikipedia

   en.wikipedia.org/wiki/Initial_and_terminal_objects

   For example, the initial object in any concrete category with free objects will be the free object generated by the empty set (since the free functor, being left adjoint to the forgetful functor to Set, preserves colimits). Initial and terminal objects may also be characterized in terms of universal properties and adjoint functors.

3. Category of sets - Wikipedia

   en.wikipedia.org/wiki/Category_of_sets

   Every set is a projective object in Set (assuming the axiom of choice). The finitely presentable objects in Set are the finite sets. Since every set is a direct limit of its finite subsets, the category Set is a locally finitely presentable category. If C is an arbitrary category, the contravariant functors from C to Set are often an important ...

4. Category of topological spaces - Wikipedia

   en.wikipedia.org/wiki/Category_of_topological_spaces

   Examples of limits and colimits in Top include: The empty set (considered as a topological space) is the initial object of Top; any singleton topological space is a terminal object. There are thus no zero objects in Top. The product in Top is given by the product topology on the Cartesian product.

5. Initial algebra - Wikipedia

   en.wikipedia.org/wiki/Initial_algebra

   Dually, a final coalgebra is a terminal object in the category of F-coalgebras. The finality provides a general framework for coinduction and corecursion. For example, using the same functor 1 + (−) as before, a coalgebra is defined as a set X together with a function f : X → (1 + X).

6. Category of rings - Wikipedia

   en.wikipedia.org/wiki/Category_of_rings

   Examples of limits and colimits in Ring include: The ring of integers Z is an initial object in Ring. The zero ring is a terminal object in Ring. The product in Ring is given by the direct product of rings. This is just the cartesian product of the underlying sets with addition and multiplication defined component-wise.

7. Comma category - Wikipedia

   en.wikipedia.org/wiki/Comma_category

   Essentially, we create a category whose objects are cones, and where the limiting cone is a terminal object; then, each universal morphism for the limit is just the morphism to the terminal object. This works in the dual case, with a category of cocones having an initial object.