Suppose I have a smooth algebraic surface $X$ and a subscheme $Z$ such that the blowup $$Y = Bl(X,Z)$$ is smooth.
Now $Z$ does not have to be smooth, say if it is given by some power of the maximal ideal at a point, but is it nevertheless the case that $Y$ is isomorphic to the iterated blowup of $X$ along smooth points?
Yes. Every proper, birational morphism between smooth algebraic surfaces can be obtained by the iterated blowup at reduced points. I don't have a reference at hand, but it's contained somewhere in Beauville's book. It's probably also in Hartshorne Chapter V.
The basic idea is that given such a morphism $Y \rightarrow X$, there are finitely many points of $X$ where it is not an isomorphism. You can blow up at these and $Y$ will factor through the blow-up. You repeat this process finitely many times and you'll get an isomorphism.
The OP is assuming the blowup is smooth already. In which case maybe the statement follows from the cone theorem in MMP? (overkill for surfaces!)
