In mathematics, the inverse limit (also called the projective limit) is a construction which allows one to "glue together" several related objects, the precise manner of the gluing process being specified by morphisms between the objects. Inverse limits can be defined in any category, but we will initially only consider inverse limits of groups.

Formal definition

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Algebraic objects

We start with the definition of an inverse (or projective) system of groups and homomorphisms. Let (I, ≤) be a directed poset (not all authors require I to be directed). Let (A_i)_i∈I be a family of groups and suppose we have a family of homomorphisms f_ij : A_j → A_i for all i ≤ j (note the order) with the following properties:

1. f_ii is the identity in A_i,
2. f_ik = f_ij O f_jk for all i ≤ j ≤ k.

Then the set of pairs (A_i, f_ij) is called an inverse system of groups and morphisms over I.

We define the inverse limit of the inverse system (A_i, f_ij) as a particular subgroup of the direct product of the A_i's:

$\backslash varprojlim\; A\_i\; =\; \backslash Big\backslash \{(a\_i)\; \backslash in\; \backslash prod\_\{i\backslash in\; I\}A\_i\; \backslash ;\backslash Big|\backslash ;\; a\_i\; =\; f\_\{ij\}(a\_j)\; \backslash mbox\{\; for\; all\; \}\; i\; \backslash leq\; j\backslash Big\backslash \}$

The inverse limit, A, comes equipped with natural projections π_i : A → A_i which pick out the ith component of the direct product. The inverse limit and the natural projections satisfy a universal property described in the next section.

This same construction may be carried out if the A_i's are sets, rings, modules (over a fixed ring), algebras (over a fixed field), etc., and the homomorphisms are homomorphisms in the corresponding category. The inverse limit will also belong to that category.

General definition

The inverse limit can be defined abstractly in an arbitrary category by means of a universal property. Let (X_i, f_ij) be an inverse system of objects and morphisms in a category C (same definition as above). The inverse limit of this system is an object X in C together with morphisms π_i : X → X_i (called projections) satisfying π_i = f_ij O π_j . The pair (X, π_i) must be universal in the sense that for any other such pair (Y, ψ_i) there exists a unique morphism u : Y → X making all the "obvious" identities true; i.e. the diagram.