Category Theory/Abelian categories

Proposition (object in abelian category is decomposed into sum by subobject):

Let ${\mathcal {C}}$ be an abelian category, and let $X\in {\mathcal {C}}$ be an object. Let $f:Y\to X$ be a subobject, and let $Z=\operatorname {Coker} f$ be the corresponding quotient object. Moreover, denote $g=\operatorname {coker} f$ . Then there exists a unique isomorphism $\theta :X\to Y\oplus Z$ such that

\pi _{Z}\circ \theta =g

and

\theta ^{-1}\circ \iota _{Y}=f

.

Proof: $Y\oplus Z$ is a biproduct. First we apply the universal property of a product in order to obtain a morphism

\phi :X\to Y\oplus Z

such that

\pi _{Z}\circ \phi =g

and

\pi _{Y}\circ \phi =0

.

Then we apply the universal property of a coproduct in order to obtain a morphism

\chi :Y\oplus Z\to X

such that

\chi \circ \iota _{Y}=f

and

\chi \circ \iota _{Y}=0

.

Moreover, we get a morphism $Y\otimes X\to Y\otimes 0$ from the projection to $Y$ , and a morphism $0\otimes Z\to Y\oplus Z$ from the inclusion of $Z$ . The latter morphism is the kernel of ${\tilde {f}}:Y\oplus Z\to X$ , and the cokernel of that kernel is $\Box$