must commute for all i, j. The direct limit is often denoted

$X\; =\; \backslash varinjlim\; X\_i$

Unlike for algebraic objects, the direct limit may not exist in an arbitrary category. If it does, however, it is unique in a strong sense: given any another direct limit X there exists is a unique isomorphism X → X commuting with the canonical morphisms.

We note that a direct system in category C admits an alternative description in terms of functors. Any directed poset I can be considered as a small category where the morphisms consist of arrows i → j if and only if i ≤ j. A direct system is then just a covariant functor I → C.

Examples

• Let I be any directed poset with a greatest element m. The direct limit of any corresponding direct system is isomorphic to X_m and the canonical morphism φ_m : X_m → X is an isomorphism.
• Let p be a prime number. Consider the direct system composed of the groups Z/pⁿZ and the homomorphisms Z/pⁿZ → Z/pⁿ⁺¹Z which are induced by multiplication by p. The direct limit of this system consists of all the pⁿth roots of unity, and is called the p^∞-group.
• Let F be a C-valued sheaf on a topological space X. Fix a point x in X. The open neighborhoods of x form a directed poset ordered by inclusion (U ≤ V if and only if U contains V). The corresponding direct system is (F(U), r_U,V) where r is the restriction map. The direct limit of this system is called the stalk of F at x, denoted F_x. The canonical morphisms F(U) → F_x are called germs.
• Direct limits in the category of topological spaces are given by placing the final topology on the underlying set-theoretic direct limit.

Related constructions and generalizations

The categorical dual of the direct limit is called the inverse limit (or projective limit). More general concepts are the limits and colimits of category theory. The terminology is somewhat confusing: direct limits are colimits while inverse limits are limits.

Category theory | Abstract algebra