Contents

Definition

A wide pullback or wide fiber product or wide fibre product in a category $\mathcal{C}$ is a product (of arbitrary cardinality) in a slice category $\mathcal{C} \downarrow C$. In terms of $\mathcal{C}$, this can be expressed as a limit over a category obtained from a discrete category by adjoining a terminal object.

Yet more explicitly, the wide pullback of a family of morphisms $f_i\colon A_i \to C$ (a wide cospan) is an object $P$ equipped with projection $p_i\colon P\to A_i$ such that $f_i p_i$ is independent of $i$, and which is universal with this property.

Binary wide pullbacks are the same as ordinary pullbacks, a.k.a. fiber products.

Of course, a wide pushout is a wide pullback in the opposite category.

Properties

• A category has wide pullbacks (of all small cardinalities) if and only if it has (binary) pullbacks and cofiltered limits.

• The saturation of the class of wide pullbacks is the class of limits over categories $C$ whose fundamental groupoid $\Pi_1(C)$ is trivial.

On the other hand, together with a terminal object, wide pullbacks generate all limits:

Related concepts

• connected limit

Analogues in dependent type theory:

• wide pullback type

• wide pushout type

References

The terminology wide pullback appears in:

• Paul Taylor, Quantitative domains, groupoids and linear logic, Category Theory and Computer Science: Manchester, UK, September 5–8, 1989 Proceedings. Springer Berlin Heidelberg, 1989.

Wide pullbacks are considered under the term fibred product in:

• Robert Paré, Simply connected limits. Can. J. Math., Vol. XLH, No. 4, 1990, pp. 731-746, CMS