Homological Algebra/Sequences

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Lemma: In an $A b$ -enriched category, if $f$ is a kernel, $g$ is a cokernel of $f$ , then $f$ is a kernel of $g$ .

Corollary: In an abelian category, consider a sequence $a \overset{f}{\to} b \overset{g}{\to} c$ . The following conditions are equivalent:

$g$ is a cokernel of $f$ and $f$ is a kernel of $g$ .
$f$ is a monomorphism and $g$ is a cokernel of $f$ .
$g$ is an epimorphism and $f$ is a kernel of $g$ .

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