Motivation: I'd like to be able to use toy functional programming in languages without first-order functions, by using natural numbers instead of functions.
A universal function is a function f : N -> (N -> N), equivalently f : N * N -> N that enumerates all possible computable functions. In other words, there's a number k such that f(k) is the squaring function, there's a number j such that f(j) is the n-th prime function etc.
To write such a function, one can take any Turing-complete language (programming language compiler, lambda calculus, Turing machines...) and enumerate all programs. I'd like to allow not only evaluation, but also operations on functions like addition, composition, currying. For example, given indices of two functions f,g I'd like to know what is the index of the function f+g, or f composed with g. This would allow "toy functional programming".
What is a good way to write such code library? I'm not looking for a minimalistic Turing tarpit that will struggle to compute factorial of 10, nor I don't want to write an advanced compiler. It should have some basic functions like addition and possibility to write loop, but not much more.
Solutions in all high-level languages are welcome. Pseudocode, Haskell and Python are preferred. You can assume arbitrary precision arithmetic. Using
eval or similar is not allowed.
Clarification: Enumerated functions will consist of all partial recursive (computable) ones - this includes functions that don't halt on some inputs. The universal function will hang in that cases; of course this is unavoidable. See also: m-recursive functions - http://en.wikipedia.org/wiki/Μ-recursive_function.