coregular
A functor is coregular when it preserves finite colimits and regular monomorphisms. This notion is used in particular when and are coregular categories.
- Dual property: regular
- Related properties: preserves regular monomorphisms, right exact
Relevant implications
Examples
There are 15 functors with this property.
- binary coproduct functor on sets
- binary diagonal functor on the category of sets
- countable copower functor on sets
- discrete topology functor
- doubling functor on sets
- forgetful functor for topological spaces
- forgetful functor from groups to monoids
- free group functor
- identity functor on the category of sets
- monoid ring functor
- opposite category functor
- opposite monoid functor
- trivial functor from the category of groups
- trivial functor from the category of sets
- walking isomorphism object inclusion
Counterexamples
There are 21 functors without this property.
- abelianization functor for groups
- binary product functor on sets
- contravariant power set functor
- covariant power set functor
- enveloping group functor
- forgetful functor for groups
- forgetful functor for rings
- forgetful functor for vector spaces
- forgetful functor from abelian groups to groups
- forgetful functor from groups to pointed sets
- forgetful functor from rings to monoids
- functor of continuous functions
- fundamental group functor
- group of units functor
- indiscrete topology functor
- modulo p functor
- p-torsion functor
- path components functor
- sequences functor on sets
- squaring functor on sets
- torsion functor
Unknown
There are 0 functors for which the database has no information on whether they satisfy this property.
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