cofiltered

A category is cofiltered if every finite diagram admits a cone. Equivalently, it is inhabited, for every two objects $x,y$ there is a span $x \leftarrow p \rightarrow y$ (not necessarily universal), and every parallel pair $x \rightrightarrows y$ is equalized by some morphism $e \to x$ (not necessarily universal).

Dual property: filtered
Related properties: cofiltered limits, finitely complete
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Relevant implications

cofiltered andself-dual implies filtered
cofiltered implies cosifted
equalizers andsemi-strongly connected implies cofiltered
filtered andself-dual implies cofiltered
finitely complete implies cofiltered
initial object implies cofiltered

Examples

There are 59 categories with this property.

category of abelian groups
category of abelian sheaves
category of algebras
category of Banach spaces with linear contractions
category of combinatorial species
category of commutative algebras
category of commutative monoids
category of commutative rings
category of finite abelian groups
category of finite groups
category of finite ordered sets
category of finite sets
category of finite sets and injections
category of finitely generated abelian groups
category of free abelian groups
category of groups
category of Hausdorff spaces
category of left modules over a division ring
category of left modules over a ring
category of locally ringed spaces
category of M-sets
category of measurable spaces
category of metric spaces with continuous maps
category of metric spaces with non-expansive maps
category of metric spaces with ∞ allowed
category of monoids
category of pairs of sets
category of pointed sets
category of pointed topological spaces
category of posets
category of prosets
category of pseudo-metric spaces with non-expansive maps
category of rings
category of rngs
category of schemes
category of sets
category of sets and relations
category of sheaves
category of simplicial sets
category of small categories
category of smooth manifolds
category of topological spaces
category of vector spaces
category of Z-functors
delooping of the additive monoid of ordinal numbers
dual of the category of sets
poset [0,1]
poset of extended natural numbers
poset of natural numbers
poset of ordinal numbers
proset of integers w.r.t. divisibility
trivial category
walking commutative square
walking composable pair
walking fork
walking idempotent
walking isomorphism
walking morphism
walking span

Counterexamples

There are 11 categories without this property.

category of fields
category of finite sets and bijections
category of finite sets and surjections
category of non-empty sets
delooping of a non-trivial finite group
delooping of an infinite countable group
delooping of the additive monoid of natural numbers
discrete category on two objects
empty category
simplex category
walking parallel pair

Unknown

There are 0 categories for which the database has no information on whether they satisfy this property.

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