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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.
Universal constructions are functorial in nature: if one can carry out the construction for every object in a category C then one obtains a functor on C. Furthermore, this functor is a right or left adjoint to the functor U used in the definition of the universal property. [2] Universal properties occur everywhere in mathematics.
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.
Given a diagram F: J → C (thought of as an object in C J), a natural transformation ψ : Δ(N) → F (which is just a morphism in the category C J) is the same thing as a cone from N to F. To see this, first note that Δ(N)(X) = N for all X implies that the components of ψ are morphisms ψ X : N → F(X), which all share the domain N.
However, LH does not have a terminal object, and thus is not Cartesian closed. If C has pullbacks and for every arrow p : X → Y, the functor p * : C/Y → C/X given by taking pullbacks has a right adjoint, then C is locally Cartesian closed. If C is locally Cartesian closed, then all of its slice categories C/X are also locally Cartesian closed.
The diagonal functor : assigns to each object of the diagram , and to each morphism : in the natural transformation in (given for every object of by =). Thus, for example, in the case that J {\displaystyle {\mathcal {J}}} is a discrete category with two objects, the diagonal functor C → C × C {\displaystyle {\mathcal {C}}\rightarrow ...
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Let C be a category with finite products and a terminal object 1. A list object over an object A of C is: an object L A, a morphism o A : 1 → L A, and; a morphism s A : A × L A → L A; such that for any object B of C with maps b : 1 → B and t : A × B → B, there exists a unique f : L A → B such that the following diagram commutes: