Commutative Algebra/Sequences of modules

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We aim now to prove that if ${\displaystyle R}$ is a ring, ${\displaystyle R}$-mod is an Abelian category. We do so by verifying that modules have all the properties required for being an Abelian category.

Theorem 10.1:

The category of modules has kernels.

Proof:

For ${\displaystyle R}$-modules ${\displaystyle M,N}$ and a morphism ${\displaystyle f:M\to N}$ we define

${\displaystyle \ker f:=\{m\in M|f(m)=0\}}$.

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-category-theoretic comment

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