Ok, more type hackery failure. :) :P

In my week-long pursuit of getting rid of (runtime) `assert(n > 0)`

and instead checking it statically, I've come up with this module:

```
module Nat : sig
type z
type 'n s
type ('a, 'n) nat =
Zero : ('a, z) nat
| Succ : ('a, 'n) nat -> ('a, 'n s) nat
val add : ('a, 'n) nat -> ('a, 'n s) nat
end = struct
type z
type 'n s
type ('a, 'n) nat =
Zero : ('a, z) nat
| Succ : ('a, 'n) nat -> ('a, 'n s) nat
let add n = Succ n
(*
let rec to_int n = function
| Succ a -> 1 + (to_int a)
| Zero -> 0
*)
end
```

This gives Peano numbers where the number is encoded in it's own type:

```
# Zero;;
- : ('a, Nat.z) Nat.nat = Zero
# Succ (Zero);;
- : ('a, Nat.z Nat.s) Nat.nat = Succ Zero
# add (Succ Zero);;
- : ('_a, Nat.z Nat.s Nat.s) Nat.nat = Succ (Succ Zero)
```

However, the last function `to_int`

won't compile:

```
Error: This pattern [Zero -> 0] matches values of type ('a, z) nat
but a pattern was expected which matches values of type
('a, ex#0 s) nat
```

This is, I think, because z and s is different types. Is it possible to make them the same type, and still have them as phantom types?

(Possible duplicate: type level integers in ocaml)

notto use it. My wild guess would be that you will find any technique to remove that`assert (n > 0)`

to have in the end a debatable added value over the sheer simplicity, flexibility and maintainability of the simple`assert (n > 0)`

you start from. It's still good to understand these techniques, as they can be occasionally useful, but if you really want statically verified software I would use not OCaml or Haskell, but Coq. – gasche Mar 30 '13 at 18:44