Here's one way to implement something similar to what you ask about.

### Nat

First note that you define `Nat`

as a class and then use it as a type. I think it makes sense to have it as a type, so let's define it as such.

```
data Z
data S n
data Nat n where
Zero :: Nat Z
Succ :: Nat n -> Nat (S n)
```

### LessThan

We can also define `LessThan`

as a type.

```
data LessThan n m where
LT1 :: LessThan Z (S Z)
LT2 :: LessThan n m -> LessThan n (S m)
LT3 :: LessThan n m -> LessThan (S n) (S m)
```

Note that I just toke your three properties and turned them into data constructors. The idea of this type is that a fully normalized value of type `LessThan n m`

is a proof that `n`

is less than `m`

.

### Work-around for existentials

Now you ask about:

```
foo :: exists n. (LessThan n m) => Nat m -> Nat n
```

But there exists no exists in Haskell. Instead, we can define a datatype just for `foo`

:

```
data Foo m where
Foo :: Nat n -> LessThan n m -> Foo m
```

Note that `n`

is effectively existenially quantified here, because it shows up in the arguments of the data constructor `Foo`

but not in its result. Now we can state the type of `foo`

:

```
foo :: Nat m -> Foo m
```

### A lemma

Before we can implement the example from the question, we have to prove a little lemma about `LessThan`

. The lemma says that `n`

is less than `S n`

for all `n`

. We prove it by induction on `n`

.

```
lemma :: Nat n -> LessThan n (S n)
lemma Zero = LT1
lemma (Succ n) = LT3 (lemma n)
```

### Implementation of foo

Now we can write the code from the question:

```
foo :: Nat m -> Foo m
foo (Succ n) = Foo n (lemma n)
foo Zero = foo Zero
```

`foo :: exists n...`

– really? So you want to allow`foo`

to return any type it likes, with the only constraint that it be "less than`m`

"? That's not possible in Haskell (not just like that), and rightly so. Or do you rather mean,`foo`

can return any type the caller requests, as long as it's less than`m`

? – leftaroundabout Jul 10 '13 at 20:58somenat that is strictly less than the input" (without sayingwhatthat number is...) – Ranjit Jhala Jul 10 '13 at 23:34isup to the function (or the guy how implements it, if you prefer that)? – leftaroundabout Jul 10 '13 at 23:39the type systemas opposed to as data, which is why`LessThan`

needs to be in the type system too. It's safe to ignore type level programming until you're very confident with Haskell. – AndrewC Jul 11 '13 at 8:43