Splitting lemma

A short exact sequence splits iff it has a section or a retraction.

Splitting lemma

Splitting lemma: Given a short exact sequence

0\to A \xrightarrow{i} B \xrightarrow{p} C \to 0

of $R$ -modules , the following are equivalent:

There exists a module homomorphism $s\colon C\to B$ with $p\circ s=\mathrm{id}_C$ (a section of $p$ ).
There exists a homomorphism $r\colon B\to A$ with $r\circ i=\mathrm{id}_A$ (a retraction of $i$ ).
The sequence is split exact , i.e. $B\cong A\oplus C$ as a direct sum .

This lemma is the basic bridge between homomorphisms that admit one-sided inverses and internal direct sum decompositions.