Let $f:X \rightarrow (Y, \mathcal{Y})$ be an abstract function, with $\mathcal{Y}$ a $\sigma$-algebra on $Y$. Endow $X$ with $f^{-1}(\mathcal{Y})$. Is then $f(X)$ a measurable set in $Y$? If not, are there simple conditions on $f$ making $f(X)$ measurable? If $\mathcal{Y}$ were a $\sigma$-ring, would this modify anything?
More concisely (and generally): when is the image of a measurable set under a measurable function a measurable set?
There are actually positive results if you change the context a little bit. Suppose that $X$ is a separable complete metric space, i.e., a Polish space, and assume that $Y$ is something like $\mathbb R^n$, a Polish space that carries a measure that interacts nicely with the topology like the Lebesgue measure.
Now, if $f:X\to Y$ is Borel measurable, then for every Borel set $B\subseteq X$ the image $f[B]$ is not necessarily Borel in $Y$, but it is Lebesgue measurable in $Y$.
Consider $\mathcal{Y}=\left\{\emptyset,Y\right\}$. Every non-surjective function from $f$ on a non-empty set $X$ is measurable, but the image of any non-empty subset is not measurable. Using similar constructions you can get many counterexamples. I would not expect any nice, simple and non-trivial conditions in the case of general $\sigma$-algebras or $\sigma$-rings.
Let $X$ and $Y$ be standard Borel spaces, and $f : X \to Y$ be Borel.
If $A \subseteq X$ is Borel, and $f | _A : A \to Y$ is injective, then $f(A)$ is Borel in $Y$.
(This is corollary 15.2 in "Classical descriptive set theory" by Kechris.)
It is well known that for any continuous function $f$, $f$ sends all measurable sets to measurable ones if and only if $f$ has Luzin's-(N)-property. I.e. $f$ sends all null sets to null ones. By [1], Luzin's-(N)-property is a $\Pi^1_1$-complete property. So there is no simple description.
[1].P. Holick ́y, S. P. Ponomarev, L. Zaj ́ıˇcek & M. Zelen ́y (1998/99): Structure of the set of continuous functions with Luzin’s property (N). Real Anal. Exchange 24(2), pp. 635–656.
