Cocycle category: Difference between revisions

Template:Short description In category theory, a branch of mathematics, the cocycle category of objects X, Y in a model category is a category in which the objects are pairs of maps ${\displaystyle X\stackrel{f}{\leftarrow }Z\stackrel{g}{\to }Y}$ and the morphisms are obvious commutative diagrams between them.^[1] It is denoted by ${\displaystyle H(X,Y)}$. (It may also be defined using the language of 2-category.)

One has: if the model category is right proper and is such that weak equivalences are closed under finite products,

${\displaystyle {\pi }_{0}H(X,Y)\to [X,Y],(f,g)\mapsto g\circ f^{-1}}$

is bijective.

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