Elementary Category Theory - 2

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Tsakanikas Nickos
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Joined: Tue Nov 10, 2015 8:25 pm

Elementary Category Theory - 2

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Post by Tsakanikas Nickos »

Suppose that \( \mathcal{C} \) is a category with a zero object. Suppose that the morphism \( a \) is the kernel of a morphism \( \displaystyle \gamma : X \longrightarrow Y \). Show that if coker(\( a \)) exists, then \( a = \) ker(coker \( a \)).
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