I was studing some algebra by my own and I was wondering if this propiety is true:
Let $M$ be a module over a ring $A$ and $S\subseteq M$ a submodule, if $M$ is Noetherian, then $S$ is Noetherian.
I think I could use this prop:
Let $0\rightarrow M^\prime \rightarrow M \rightarrow M^{\prime\prime}\rightarrow 0$ be an exact sequence of $A$-modules. Then:
$M$ is Noetherian if and only if, $M^\prime$ and $M^{\prime\prime}$ are Noetherian.
and clearly I have $S\rightarrow M\rightarrow 0$ if I consider inclusion. But I can't find the other side homomorphism.
Thanks for your help.