Limits in lattice categories are given by infimums and supremums. #
The limit cone over any functor from a finite diagram into a SemilatticeInf
with OrderTop
.
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The colimit cocone over any functor from a finite diagram into a SemilatticeSup
with OrderBot
.
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The limit of a functor from a finite diagram into a SemilatticeInf
with OrderTop
is the
infimum of the objects in the image.
The colimit of a functor from a finite diagram into a SemilatticeSup
with OrderBot
is the supremum of the objects in the image.
A finite product in the category of a SemilatticeInf
with OrderTop
is the same as the infimum.
A finite coproduct in the category of a SemilatticeSup
with OrderBot
is the same as the
supremum.
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The binary product in the category of a SemilatticeInf
with OrderTop
is the same as the
infimum.
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The binary coproduct in the category of a SemilatticeSup
with OrderBot
is the same as the
supremum.
The pullback in the category of a SemilatticeInf
with OrderTop
is the same as the infimum
over the objects.
The pushout in the category of a SemilatticeSup
with OrderBot
is the same as the supremum
over the objects.
The limit cone over any functor into a complete lattice.
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The colimit cocone over any functor into a complete lattice.
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The limit of a functor into a complete lattice is the infimum of the objects in the image.
The colimit of a functor into a complete lattice is the supremum of the objects in the image.