walking commutative square

notation: $\{0 \to 1\}^2$
objects: four objects $a,b,c,d$
morphisms: morphisms $a \to b$ , $b \to d$ , $a \to c$ , $c \to d$ , identities, and one morphism $a \to d$
Related categories: $\{0 \to 1 \rightrightarrows 2\}$ , $\{0 \to 1\}$
nLab Link

This category consists of a commutative square:

$\begin{array}{ccc} a & \rightarrow & b \\ \downarrow && \downarrow \\ c & \rightarrow & d \end{array}$

Its name comes from the fact that a functor out of it is the same as a commutative square in the target category. Notice that the category is isomorphic to the product category

\{0 \to 1\} \times \{0 \to 1\}

of the walking morphism with itself. Hence, most (but not all) properties are inherited from it. It is also isomorphic to the partial order of positive divisors of

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Satisfied Properties

Properties from the database

is finite
is infinitary distributive
is locally cartesian closed
is locally strongly finitely presentable
is self-dual
is skeletal
is small

Deduced properties

has coproducts
has finite products
has binary products
has a terminal object
has finite powers
has binary powers
is connected
has a multi-terminal object
is countably distributive
has countable coproducts
is distributive
has finite coproducts
has a strict initial object
has an initial object
is essentially small
is locally small
has a generating set
is locally essentially small
is well-copowered
is well-powered
is countable
is essentially finite
is essentially countable
is regular
is finitely complete
has equalizers
has coreflexive equalizers
has pullbacks
is Cauchy complete
is finitely accessible
has wide pullbacks
has connected limits
is complete
has products
has countable products
has powers
has countable powers
has cofiltered limits
has sequential limits
is multi-complete
is thin
is codistributive
is one-way
is direct
has reflexive coequalizers
is left cancellative
is cocomplete
is cartesian closed
is locally finitely presentable
is locally ℵ₁-presentable
is locally presentable
has exact filtered colimits
has filtered colimits
has sifted colimits
has directed colimits
has cartesian filtered colimits
is ℵ₁-accessible
is accessible
is a generalized variety
is locally multi-presentable
is multi-cocomplete
is locally finitely multi-presentable
is locally poly-presentable
is multi-algebraic
has a natural numbers object
is inhabited
has a generator
is Malcev
is filtered
is sifted
has connected colimits
is finitely cocomplete
has cosifted limits
has copowers
has binary coproducts
has coequalizers
has countable copowers
has sequential colimits
has pushouts
has directed limits
has wide pushouts
has finite copowers
has binary copowers
has a multi-initial object
has a strict terminal object
has a cogenerating set
is inverse
is right cancellative
has a regular subobject classifier
has a cogenerator
is coregular
is coaccessible
is locally copresentable
has a regular quotient object classifier
is co-Malcev
is cosifted
is cofiltered
is infinitary codistributive
is countably codistributive
is cocartesian coclosed
has cocartesian cofiltered limits
is locally cocartesian coclosed

Unsatisfied Properties

Properties from the database

Deduced properties*

does not have disjoint finite coproducts
does not have disjoint coproducts
is not pointed
does not have zero morphisms
does not have kernels
does not have biproducts
is not extensive
is not infinitary extensive
is not normal
is not preadditive
is not additive
is not abelian
is not Grothendieck abelian
is not split abelian
is not essentially discrete
is not discrete
is not a groupoid
is not balanced
is not mono-regular
does not have a subobject classifier
is not an elementary topos
is not a Grothendieck topos
is not strongly connected
is not unital
does not have cokernels
does not have disjoint finite products
does not have disjoint products
is not coextensive
is not infinitary coextensive
is not epi-regular
is not conormal
does not have a quotient object classifier
is not counital

*This also uses the deduced satisfied properties.

Unknown properties

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Special objects

terminal object: $d$
initial object: $a$
products: $b \times c = a$ , $x \times x = x$ , $a \times x = a$ , $d \times x = x$
coproducts: $b \sqcup c = d$ , $a \sqcup x = x$ , $d \sqcup x = d$ , $x \sqcup x = x$

Special morphisms

isomorphisms: the four identities
monomorphisms: every morphism
epimorphisms: every morphism
regular monomorphisms: same as isomorphisms
regular epimorphisms: same as isomorphisms