The category paths on a quiver. #
When C
is a quiver, paths C
is the category of paths.
When the quiver is itself a category #
We provide path_composition : paths C ⥤ C
.
We check that the quotient of the path category of a category by the canonical relation (paths are related if they compose to the same path) is equivalent to the original category.
A type synonym for the category of paths in a quiver.
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- CategoryTheory.instInhabitedPaths V = { default := default }
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The inclusion of a quiver V
into its path category, as a prefunctor.
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Any prefunctor from V
lifts to a functor from paths V
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Two functors out of a path category are equal when they agree on singleton paths.
A path in a category can be composed to a single morphism.
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- CategoryTheory.composePath Quiver.Path.nil = CategoryTheory.CategoryStruct.id X
- CategoryTheory.composePath (p.cons e) = CategoryTheory.CategoryStruct.comp (CategoryTheory.composePath p) e
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Composition of paths as functor from the path category of a category to the category.
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The canonical relation on the path category of a category: two paths are related if they compose to the same morphism.
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- CategoryTheory.pathsHomRel C p q = ((CategoryTheory.pathComposition C).map p = (CategoryTheory.pathComposition C).map q)
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The functor from a category to the canonical quotient of its path category.
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The functor from the canonical quotient of a path category of a category to the original category.
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The canonical quotient of the path category of a category is equivalent to the original category.
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