delooping of a non-trivial finite group

notation: $BG$
objects: a single object
morphisms: the elements of a non-trivial finite group $G$
Related categories: $BG$ , $B\IN$
nLab Link

Every group $G$ yields a groupoid $BG$ with a single object $*$ , morphisms given by the elements of $G$ , and composition given by the group operation. In this example, we consider the case of a non-trivial finite group $G$ (such as $G = C_2$ ).

Satisfied Properties

Assigned properties

Deduced properties

is inhabited
has a generating set
has directed limits
is left cancellative
is mono-regular
has pullbacks
is self-dual
is well-powered
is strongly connected
is locally cartesian closed
is essentially small
is locally small
is countable
is essentially finite
is subobject-trivial
has directed colimits
is epi-regular
has pushouts
is right cancellative
is well-copowered
is locally cocartesian coclosed
is quotient-trivial
is Cauchy complete
has coreflexive equalizers
has effective cocongruences
has effective congruences
has reflexive coequalizers
is semi-strongly connected
has filtered colimits
has sequential limits
is balanced
has wide pullbacks
is locally essentially small
is essentially countable
is locally finite
has cofiltered limits
has sequential colimits
has wide pushouts
has a cogenerating set
has a cogenerator
is finitely accessible
is accessible
has quotients of congruences
has filtered-colimit-stable monomorphisms
has sifted colimits
is coaccessible
has coquotients of cocongruences
has cofiltered-limit-stable epimorphisms
has cosifted limits
is ℵ₁-accessible
is locally poly-presentable

Unsatisfied Properties

Assigned properties

is not trivial

Deduced properties*

is not Grothendieck abelian
is not thin
is not essentially discrete
does not have equalizers
does not have zero morphisms
does not have binary copowers
is not discrete
is not sifted
does not have a multi-terminal object
does not have countable powers
is not core-thin
does not have powers
does not have finite powers
does not have coequalizers
does not have binary powers
is not cosifted
does not have a multi-initial object
does not have countable copowers
does not have copowers
does not have finite copowers
is not preadditive
does not have biproducts
is not complete
is not finitely complete
is not multi-complete
does not have a terminal object
does not have binary products
does not have kernels
does not satisfy CIP
is not filtered
does not have binary coproducts
is not pointed
is not normal
does not have products
does not have countable products
does not have finite products
does not have connected limits
is not gaunt
is not one-way
is not cocomplete
is not finitely cocomplete
is not multi-cocomplete
does not have an initial object
does not have cokernels
does not satisfy CSP
is not cofiltered
is not conormal
does not have coproducts
does not have countable coproducts
does not have finite coproducts
does not have connected colimits
is not Malcev
is not unital
does not have a natural numbers object
is not locally finitely presentable
is not locally ℵ₁-presentable
is not locally presentable
is not locally strongly finitely presentable
is not locally multi-presentable
is not locally finitely multi-presentable
is not additive
is not abelian
is not multi-algebraic
is not cartesian closed
is not regular
does not have disjoint coproducts
does not have disjoint finite coproducts
is not infinitary distributive
is not countably distributive
is not distributive
does not have exact filtered colimits
does not have cartesian filtered colimits
is not extensive
is not infinitary extensive
does not have a strict initial object
does not have a subobject classifier
does not have a regular subobject classifier
is not direct
is not an elementary topos
is not a Grothendieck topos
is not co-Malcev
is not counital
is not locally copresentable
is not cocartesian coclosed
is not coregular
does not have disjoint products
does not have disjoint finite products
is not infinitary codistributive
is not countably codistributive
is not codistributive
does not have exact cofiltered limits
does not have cocartesian cofiltered limits
is not coextensive
is not infinitary coextensive
does not have a strict terminal object
does not have a quotient object classifier
does not have a regular quotient object classifier
is not inverse
is not split abelian
is not finitary algebraic
is not Barr-exact
is not Barr-coexact

*This also uses the deduced satisfied properties.

Unknown properties

There is 1 property for which the database doesn't have an answer if it is satisfied or not. Please help to contribute the data!

is a generalized variety

Special objects

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Special morphisms

isomorphisms: every morphism
monomorphisms: every morphism
epimorphisms: every morphism
regular monomorphisms: same as monomorphisms
regular epimorphisms: same as isomorphisms