Profinite sets as limits of finite sets. #
We show that any profinite set is isomorphic to the limit of its discrete (hence finite) quotients.
Definitions #
There are a handful of definitions in this file, given X : Profinite:
X.fintypeDiagramis the functorDiscreteQuotient X ⥤ FintypeCatwhose limit is isomorphic toX(the limit taking place inProfiniteviaFintypeCat.toProfinite, see 2).X.diagramis an abbreviation forX.fintypeDiagram ⋙ FintypeCat.toProfinite.X.asLimitConeis the cone overX.diagramwhose cone point isX.X.isoAsLimitConeLiftis the isomorphismX ≅ (Profinite.limitCone X.diagram).Xinduced by liftingX.asLimitCone.X.asLimitConeIsois the isomorphismX.asLimitCone ≅ (Profinite.limitCone X.diagram)induced byX.isoAsLimitConeLift.X.asLimitis a term of typeIsLimit X.asLimitCone.X.lim : CategoryTheory.Limits.LimitCone X.asLimitConeis a bundled combination of 3 and 6.
The functor DiscreteQuotient X ⥤ Fintype whose limit is isomorphic to X.
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@[reducible, inline]
An abbreviation for X.fintypeDiagram ⋙ FintypeCat.toProfinite.
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A cone over X.diagram whose cone point is X.
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The isomorphism between X and the explicit limit of X.diagram,
induced by lifting X.asLimitCone.
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The isomorphism of cones X.asLimitCone and Profinite.limitCone X.diagram.
The underlying isomorphism is defeq to X.isoAsLimitConeLift.
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A bundled version of X.asLimitCone and X.asLimit.
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- X.lim = { cone := X.asLimitCone, isLimit := X.asLimit }