It is known that the complement of an analytic set is connected. In general, the complement of a proper complex analytic set in a connected complex manifold is an arcwise connected dense open set. My question is this:
If $f: X \rightarrow Y$ is an onto analytic mapping, where $X$ and $Y$ are connected complex manifolds, and if $A \subseteq X$ is an analytic set, is it necessarily true that the complement of $f(A)$ in $Y$ is connected?