Does a function $\mathit{f}:\mathbb{R}→\mathbb{R}$ being non-elementary (not expressible as a combination of finitely many elementary operations), imply that it is not computable?
The particular case I am wondering about is if the exact solution for the perimeter of an ellipse is computable. I am aware that the only readily available solutions are approximations, but I wonder if it might be computable in principle.
Obviously the perimeter of an ellipse is a computable function of the parameters (e.g. semi-major and semi-minor axes). What it means for this to be computable is precisely that we can compute approximations that converge within desired accuracy.
This perspective is a core definition of computable analysis, which provides notions of computability for functions on the reals.
In particular, in that account the computable functions on the reals do not generally align with the elementary functions. One can see this simply by diagonalizing against the elementary functions. That is, make a (computable) list of all of them, and then design a function $d(x)$ that at $x=n$ deviates from the $n$th function on the list, but otherwise smoothly joins these values. This is a computable function that is not elementary.
