Abs[z] is not a holomorphic function, so its derivative is not well defined on the complex plane (the default domain that Mathematica works with). This is in contradistinction to, e.g.,
Sin[z], whose complex derivative (i.e., with respect to its argument) is always defined.
More simply put,
Abs[z] depends on both
z*, so should really be thought as a two argument function.
Sin[z] only depends on
z, so makes sense with a single argument.
As pointed out by Leonid, once you restrict the domain to the reals, then the derivative is well defined (except maybe at
x=0, where they've taken the average of the left and right derivatives)
In:= FullSimplify[Abs'[x],x \[Element] Reals]
As pointed out by Szabolcs (in a comment),
FunctionExpand will simplify the numerical expressions, but "Some transformations used by FunctionExpand are only generically valid".
ComplexExpand also gives numeric results, but I don't trust it. It seems to take the derivative assuming the
Abs is in the real domain, then substitutes in the numeric/complex arguments. That said, if you know that everything you're doing is in the reals, then
ComplexExpand is your friend.