**[Edit]**

The general question seems incredibly hard to solve. Here is a significantly restricted version of this question.

How do I determine equality of functions?

lets say we have

```
function f() {
// black box code.
}
function g() {
// black box code.
}
```

We take a mathematical definition of a function. So

`if for all x in domain, f(x) === g(x) then f === g`

- How do we handle domains?
- How can we otherwise determine if
`f === g`

Checks by source code is silly because

```
function f(i) {
return i % 2;
}
function g(i) {
var returnVal = i % 2;
return returnVal;
}
```

Are obvouisly equal. These are trivial examples but you can imagine more complex functions being equal but not source-equal.

You may assume that `f`

and `g`

have no side effects that we care about.

**[Edit]**

As @Pointy mentioned it's probably best to constrain the domain. Rather then having the equality function try and guess the domain, the user of the equality function should supply a domain.

It doesn't make sense to ask whether two functions are equal without defining their domain somewhere.

To simply the problem we can assume to domain is the set of all integers or a subset of that so we need a function:

```
function equal (f, g, domain) {
}
```

The structure of the domain is irrelevant and can be made to make the problem as easy as possible. You can also assume that `f`

and `g`

act nicely on the domain of integers and don't crash&burn.

You may assume that `f`

and `g`

halt!

Again @Pointy points out a good example of non-deterministic functions

What if we limit `f`

& `g`

to be deterministic.

notpossible. – Pointy Jan 30 '11 at 16:45