I'm trying to implement a type-safe binomial heap. For this, I have two data types whose element types are parametrized by their type-encoded indexes:

```
data Zero
data Succ a = Succ
{-| A GADT representation of lists with type-encoded length.
Unlike the most common implementation, the type paramater
for values is of kind * -> *. Each element type is
parametrized by its index (counting from the end of the vector),
so the type-encoded numbers decrease from start to end.
-}
data Vec n a where
Nil :: Vec Zero a
Cons :: a n -> Vec n a -> Vec (Succ n) a
{-| A GADT representation of lists whose values are of kind
* -> *. Each element type is parametrized by its by its
index (counting from the start of the vector), so the
type-encoded numbers increase from start to end.
Unlike Vec the type-encode number here doesn't represent
the length, it can be arbitrary (just increasing).
-}
data RVec n a where
RNil :: RVec n a
RCons :: a n -> RVec (Succ n) a -> RVec n a
```

`Vec`

encodes values with decreasing number parameter, where the last element is always parametrized by `Zero`

. `RVec`

encodes values with increasing number parameter with no other restriction (this is why `RNil`

can produce `RVec`

of any number).

This allows me (for example) to have a list of trees with increasing/decreasing heights, checked by the type system. After implementing a large part of my project, I realized I need a seemingly simple function, which I wasn't able to implement:

```
vreverse :: Vec n a -> RVec Zero a
```

It should simply reverse the order of the given list. Any ideas? Thanks in advance.

`vreverse' :: Vec n a -> RVec m a`

, starting the`RVec`

from an arbitrary point. I think you can define that recursively, and then you can specialize that to the case of`RVec Zero a`

. – Louis Wasserman Aug 17 '12 at 20:19`Vec n a -> RVec m a`

. Since the last element of`Vec n a`

is of type`a Zero`

, the resultmustbe`RVec Zero a`

so that its first element is of type`a Zero`

too. – Petr Pudlák Aug 17 '12 at 20:40