self-dual

A category is self-dual if it is equivalent to its opposite (or dual) category.

Dual property: self-dual (self-dual)
nLab Link

Relevant implications

accessible andself-dual implies coaccessible
binary copowers andself-dual implies binary powers
binary coproducts andself-dual implies binary products
binary powers andself-dual implies binary copowers
binary products andself-dual implies binary coproducts
cartesian closed andself-dual implies cocartesian coclosed
cartesian filtered colimits andself-dual implies cocartesian cofiltered limits
co-Malcev andself-dual implies Malcev
coaccessible andself-dual implies accessible
cocartesian coclosed andself-dual implies cartesian closed
cocartesian cofiltered limits andself-dual implies cartesian filtered colimits
cocomplete andself-dual implies complete
codistributive andself-dual implies distributive
coequalizers andself-dual implies equalizers
coextensive andself-dual implies extensive
cofiltered limits andself-dual implies filtered colimits
cofiltered andself-dual implies filtered
cogenerating set andself-dual implies generating set
cogenerator andself-dual implies generator
cokernels andself-dual implies kernels
complete andself-dual implies cocomplete
connected colimits andself-dual implies connected limits
connected limits andself-dual implies connected colimits
conormal andself-dual implies normal
copowers andself-dual implies powers
coproducts andself-dual implies products
coreflexive equalizers andself-dual implies reflexive coequalizers
coregular andself-dual implies regular
cosifted limits andself-dual implies sifted colimits
cosifted andself-dual implies sifted
counital andself-dual implies unital
countable copowers andself-dual implies countable powers
countable coproducts andself-dual implies countable products
countable powers andself-dual implies countable copowers
countable products andself-dual implies countable coproducts
countably codistributive andself-dual implies countably distributive
countably distributive andself-dual implies countably codistributive
directed colimits andself-dual implies directed limits
directed limits andself-dual implies directed colimits
disjoint coproducts andself-dual implies disjoint products
disjoint finite coproducts andself-dual implies disjoint finite products
disjoint finite products andself-dual implies disjoint finite coproducts
disjoint products andself-dual implies disjoint coproducts
distributive andself-dual implies codistributive
epi-regular andself-dual implies mono-regular
equalizers andself-dual implies coequalizers
extensive andself-dual implies coextensive
filtered colimits andself-dual implies cofiltered limits
filtered andself-dual implies cofiltered
finite copowers andself-dual implies finite powers
finite coproducts andself-dual implies finite products
finite powers andself-dual implies finite copowers
finite products andself-dual implies finite coproducts
finitely cocomplete andself-dual implies finitely complete
finitely complete andself-dual implies finitely cocomplete
generating set andself-dual implies cogenerating set
generator andself-dual implies cogenerator
Grothendieck abelian andself-dual implies trivial
groupoid implies directed colimits andepi-regular andpushouts andright cancellative andself-dual andwell-copowered
groupoid implies directed limits andleft cancellative andmono-regular andpullbacks andself-dual andwell-powered
infinitary codistributive andself-dual implies infinitary distributive
infinitary coextensive andself-dual implies infinitary extensive
infinitary distributive andself-dual implies infinitary codistributive
infinitary extensive andself-dual implies infinitary coextensive
initial object andself-dual implies terminal object
kernels andself-dual implies cokernels
left cancellative andself-dual implies right cancellative
locally cartesian closed andself-dual implies locally cocartesian coclosed
locally cocartesian coclosed andself-dual implies locally cartesian closed
locally copresentable andself-dual implies locally presentable
locally presentable andself-dual implies locally copresentable
Malcev andself-dual implies co-Malcev
mono-regular andself-dual implies epi-regular
multi-cocomplete andself-dual implies multi-complete
multi-complete andself-dual implies multi-cocomplete
multi-initial object andself-dual implies multi-terminal object
multi-terminal object andself-dual implies multi-initial object
normal andself-dual implies conormal
powers andself-dual implies copowers
products andself-dual implies coproducts
pullbacks andself-dual implies pushouts
pushouts andself-dual implies pullbacks
quotient object classifier andself-dual implies subobject classifier
reflexive coequalizers andself-dual implies coreflexive equalizers
regular quotient object classifier andself-dual implies regular subobject classifier
regular subobject classifier andself-dual implies regular quotient object classifier
regular andself-dual implies coregular
right cancellative andself-dual implies left cancellative
self-dual andsequential colimits implies sequential limits
self-dual andsequential limits implies sequential colimits
self-dual andsifted colimits implies cosifted limits
self-dual andsifted implies cosifted
self-dual andstrict initial object implies strict terminal object
self-dual andstrict terminal object implies strict initial object
self-dual andsubobject classifier implies quotient object classifier
self-dual andterminal object implies initial object
self-dual andunital implies counital
self-dual andwell-copowered implies well-powered
self-dual andwell-powered implies well-copowered
self-dual andwide pullbacks implies wide pushouts
self-dual andwide pushouts implies wide pullbacks
trivial implies essentially discrete andessentially finite andfinitary algebraic andGrothendieck topos andself-dual andsplit abelian

Examples

There are 16 categories with this property.

Counterexamples

There are 54 categories without this property.

Unknown

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

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