A pro-object of a category $C$ is a “formal cofiltered limit” of objects of $C$.
The category of pro-objects of $C$ is written $pro$-$C$. Such a category is sometimes called a pro-category, but notice that that is not the same thing as a pro-object in Cat.
“Pro” is short for “projective”. ( Projective limit is an older term for limit.) It is in contrast to “ind” in the dual notion of ind-object, standing for “inductive”, (and corresponding to inductive limit, the old term for colimit). In some (often older) sources, the term ‘projective system’ is used more or less synonymously for pro-object.
The definition of arrows in the category of pro-objects in $\mathcal{C}$ is perhaps more intuitive in the dual case of ind-objects (pro-objects in $C^{op}$), where it can be seen as stipulating that the objects of $C$ are finitely presentable in $ind$-$C$.
A pro-object in a category $\mathcal{C}$ is a functor $F: \mathcal{D} \rightarrow \mathcal{C}$ for some small cofiltered category $\mathcal{D}$.
Pro-objects in a category $\mathcal{C}$ assemble into a category as follows.
Let $\mathcal{C}$ be a category. The category of pro-objects in $\mathcal{C}$ is the category defined as follows.
That the associativity and identity axioms hold follows immediately from the fact that they hold in $\mathcal{C}$.
For brevity, we sometimes write the hom set between $F: \mathcal{D} \to \mathcal{C}$ and $G: \mathcal{E} \to \mathcal{C}$ as
where the limit and colimit is taken in the category Set of sets.
We can give an explicit description of the arrows of pro-$\mathcal{C}$ as follows. First, for any object $e$ of $\mathcal{E}$, we introduce a relation $\sim$ on arrows with target $G(e)$ which identifies an arrow $f: F(d) \rightarrow G(e)$ with an arrow $f': F(d') \rightarrow G(e)$ for objects $d$ and $d'$ of $\mathcal{D}$ and an object $e$ of $\mathcal{E}$, if there is an object $d''$ of $\mathcal{D}$, an arrow $g: d'' \rightarrow d$ of $\mathcal{D}$, and an arrow $g': d'' \rightarrow d'$ of $\mathcal{D}$, such that $f \circ F(g) = f' \circ F(g')$.
This relation $\sim$ is in fact an equivalence relation. Symmetry is obvious. Reflexivity is immediately demonstrated using the identity arrows of $\mathcal{D}$. Transitivity would not hold for an arbitrary category, but follows from the assumption that $\mathcal{D}$ is cofiltered. Indeed, suppose that we have a zig-zag in $\mathcal{D}$ as follows.
The fact that $\mathcal{D}$ is cofiltered ensures that there is an object $d''$ of $\mathcal{D}$ fitting into the following diagram.
Suppose that we have arrows $f_{0} : F(d_{0}) \rightarrow G(e)$, $f_{1}: F(d_{1}) \rightarrow G(e)$, and $f_{2}: F(d_{2}) \rightarrow G(e)$ such that $g_{0}$ and $g_{1}$ exhibit that $f_{0} \sim f_{1}$, and such that $g_{2}$ and $g_{3}$ exhibit that $f_{1} \sim f_{2}$. Then
This exhibits that $f_{0} \sim f_{2}$, as required.
With this equivalence relation $\sim$ to hand, we can give our explicit description of the arrows of pro-$\mathcal{C}$: an arrow of pro-$\mathcal{C}$ from a pro-object $F: \mathcal{D} \rightarrow \mathcal{C}$ to a pro-object $G: \mathcal{E} \rightarrow \mathcal{C}$ can be taken to be a set $\left\{ f_{e} : F\left(d_{e}\right) \rightarrow G(e) \right\}$ of arrows of $\mathcal{C}$, one for every object $e$ of $\mathcal{E}$, such that, for every arrow $g: e \rightarrow e'$ of $E$, $G(g) \circ f_{e} \sim G(g) \circ f_{e'}$.
In other words: a set $\left\{ f_{e} : F\left(d_{e}\right) \rightarrow G(e) \right\}$ of arrows of $\mathcal{C}$, one for every object $e$ of $\mathcal{E}$, such that, for every arrow $g: e \rightarrow e'$ of $E$, there is an object $d$ of $\mathcal{D}$, an arrow $g_{e} : d \rightarrow d_{e}$ of $\mathcal{D}$, and an arrow $g_{e'}: d \rightarrow d_{e'}$ of $\mathcal{D}$ such that $G(g) \circ f_{e} \circ F(g_{e}) = G(g) \circ f_{e'} \circ F(g_{e'})$.
Two such sets $\left\{ f_{e} \right\}_{e \in Ob(\mathcal{E})}$ and $\left\{ f'_{e} \right\}_{e \in Ob(\mathcal{E})}$ are equal, i.e. define the same arrow from $F$ to $G$, if $f_{e} \sim f'_{e}$ for every object $e$ of $\mathcal{E}$.
Another, equivalent, definition is to let $pro$-$C$ be the full subcategory of the opposite functor category/presheaf category $[C,Set]^{op}$ determined by those functors which are cofiltered limits of representables. This is reasonable since the copresheaf category $[C,Set]^{op}$ is the free completion of $C$, so $pro$-$C$ is the “free completion of $C$ under cofiltered limits.” See also at pro-representable functor.
The equivalence with the previous definition is seen as follows. To a functor $F: I \to C$, compose with the co-Yoneda embedding $C \to [C,Set]^{op}$ to obtain a functor $\tilde F: I \to [C, Set]^{op}$, and then take $|F| = lim \tilde F \in [C,Set]^\mathrm{op}$. Explicitly, $|F|(c) = colim \tilde F^{op}$. This yields a functor $Pro(C) \to [C,Set]^{op}$, and its essential image manifestly consists of the functors which are cofiltered limits of the duals of representables. To see that this functor is fully faithful, we compute, for $F: I \to C$ and $G: J \to C$:
$Hom(|F|,|G|) = Nat(colim \tilde G^\mathrm{op}, colim \tilde F^\mathrm{op})$
$= lim_{J^{op}} Nat(\tilde G^\mathrm{op}, colim \tilde F^\mathrm{op})$
$= lim_{J^{op}} colim_{I^\mathrm{op}} Nat(\tilde G^\mathrm{op}, \tilde F^\mathrm{op})$
$= lim_{J^{op}}colim_{I^\mathrm{op}} Hom_\mathcal{C}(F,G)$
as in $Pro(C)$. Here we have used the definition of a colimit, the fact that representables are compact objects (this follows from the fact that colimits are computed “levelwise” in a functor category), and the Yoneda lemma.
The category of pro-objects in $\mathcal{C}$ is the opposite category of that of ind-objects in the opposite catgegory of $\mathcal{C}$:
(e.g. Kashiwara-Schapira 06, p. 138)
In some cases, pro-objects in a category $\mathcal{C}$ can be viewed as actual limits in a certain category. We prove here some results of this kind.
Let $\mathcal{C}$ be a category, and let $\mathcal{A}$ be a category with cofiltered limits. Suppose that there exists a fully faithful functor $R: \mathcal{C} \rightarrow \mathcal{A}$. Then $pro-\mathcal{C}$ is equivalent to the full subcategory $pro^{\mathcal{A}}-\mathcal{C}$ of $\mathcal{A}$ whose objects are isomorphic to $lim(R \circ D)$ for some diagram $D$ in $\mathcal{C}$ (this can be given a constructive interpretation according to whether the reader prefers to avoid the axiom of choice in the proof), where $lim$ is the limit functor for diagrams in $\mathcal{A}$.
An equivalence of categories is given by the functor $pro-\mathcal{C} \rightarrow pro^{\mathcal{A}}-\mathcal{C}$ which on objects sends a pro-object $d: \mathcal{D} \rightarrow \mathcal{C}$ to the limit of the functor $R \circ d: \mathcal{D} \rightarrow \mathcal{A}$, and on arrows sends the limit of the diagram in the category of sets
to the limit of the diagram in the category of sets
using the natural transformation arising from applying $R$, and then applies the natural isomorphism between the limit of the above diagram and the diagram in the category of sets
Since $R$ is fully faithful, the natural transformation from the diagram
to the diagram
is in fact a natural isomorphism. Since, by definition, the objects of $pro^{\mathcal{A}}-\mathcal{C}$ are exactly those isomorphic to those arising by applying the functor $pro-\mathcal{C} \rightarrow pro^{\mathcal{A}}-\mathcal{C}$ to the objects of pro-$\mathcal{C}$, it follows immediately that this functor is one half of an equivalence of categories.
Let $\mathcal{C}$ be the category Grp of groups, and let $\mathcal{A}$ be the category $\mathsf{Top-Grp}$ of topological groups. The fully faithful functor $\mathsf{Set} \rightarrow \mathsf{Top}$ sending a set to the discrete topological space on this set gives rise to a fully faithful functor $\mathsf{Grp} \rightarrow \mathsf{Top-Grp}$. Then Proposition implies that the category pro-$\mathsf{FinGrp}$ of pro-objects in $\mathsf{FinGrp}$, that is to say of profinite groups, is equivalent to the full sub-category of topological groups whose objects are obtained as a cofiltered limit of finite groups (viewed as topological groups via the discrete topology).
Though it is less well-known, one can in Example evidently replace $\mathsf{Top}$ with any category $\mathcal{A}$ for which there is a fully faithful functor $\mathsf{Set} \rightarrow \mathcal{A}$ which preserves finite products. See discrete object for one general setting in which such a functor exists. For example, one can take $\mathcal{D}$ to be the category sSet of simplicial sets.
Both Example and Remark generalise from $\mathsf{Grp}$ to any finite product theory, that is to say to the category of models of a finite product sketch. They generalise further to any finite limit theory, that is to say to the category of models of a finite limit sketch, if the functor $\mathsf{Set} \rightarrow \mathcal{A}$ moreover preserves finite limits.
Since every (dg-)coalgebra is the filtered colimit of its finite-dimensional subalgebras (see at coalgebra – as filtered colimit), the linear dual of a (dg-)coalgebra is canonically a pro-object in finite dimensional (dg-)algebras. This plays a role for instance for constructing model structures for L-infinity algebras, see there.
Procategories were used by Artin and Mazur in their work on étale homotopy theory. They associated to a scheme a ‘pro-homotopy type’. (This is discussed briefly at étale homotopy.) The important thing to note is that this was a pro-object in the homotopy category of simplicial sets, i.e., in the pro-homotopy category. Friedlander rigidified their construction to get an object in the pro-category of simplicial sets, and this opened the door to use of ‘homotopy pro-categories’.
The form of shape theory developed by Mardešić and Segal, at about the same time as the work in algebraic geometry, again used the pro-homotopy category. Strong shape, developed by Edwards and Hastings, and also Porter and also in further work by Mardešić and Segal, used various forms of rigidification to get to the pro-category of spaces, or of simplicial sets. There methods of model category theory could be used.
pro-object / pro-object in an (∞,1)-category
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