I thought it'd be neat to allow arbitrary chained comparison in Haskell, so you could do simple range checks like:

```
x <= y < z
```

And more complex stuff like

```
x /= y < z == a
```

Where the above two are semantically equivalent to

```
x <= y && y < z
x /= y && y < z && z == a
```

Just seeing if I could get the syntax to work.

So I got most of the way there using a couple of type classes:

```
{-# LANGUAGE MultiParamTypeClasses, FlexibleInstances #-}
module ChainedOrd where
import Prelude hiding ((<), (<=), (>), (>=), (==), (/=))
class Booly v a where
truthy :: v -> a
falsy :: v -> a
instance Booly a Bool where
truthy = const True
falsy = const False
instance Booly a (Maybe a) where
truthy = Just
falsy = const Nothing
class ChainedOrd a b where
(<),(>),(<=),(>=),(==),(/=) :: (Booly b c) => a -> b -> c
infixl 4 <
infixl 4 >
infixl 4 <=
infixl 4 >=
infixl 4 ==
infixl 4 /=
instance Ord a => ChainedOrd a a where
x < y = case compare x y of LT -> truthy y ; _ -> falsy y
x > y = case compare x y of GT -> truthy y ; _ -> falsy y
x <= y = case compare x y of GT -> falsy y ; _ -> truthy y
x >= y = case compare x y of LT -> falsy y ; _ -> truthy y
x == y = case compare x y of EQ -> truthy y ; _ -> falsy y
x /= y = case compare x y of EQ -> falsy y ; _ -> truthy y
instance Ord a => ChainedOrd (Maybe a) a where
Just x < y = case compare x y of LT -> truthy y ; _ -> falsy y
Nothing < y = falsy y
Just x > y = case compare x y of GT -> truthy y ; _ -> falsy y
Nothing > y = falsy y
Just x <= y = case compare x y of GT -> falsy y ; _ -> truthy y
Nothing <= y = falsy y
Just x >= y = case compare x y of LT -> falsy y ; _ -> truthy y
Nothing >= y = falsy y
Just x == y = case compare x y of EQ -> truthy y ; _ -> falsy y
Nothing == y = falsy y
Just x /= y = case compare x y of EQ -> falsy y ; _ -> truthy y
Nothing /= y = falsy y
```

Which compiles fine, but doesn't quite seem to allow chaining, due to the problem of intermediate types.

```
-- works
checkRange1 :: Ord a => a -> a -> a -> Bool
checkRange1 x y z = x `lem` y <= z
where lem :: Ord a => a -> a -> Maybe a
lem = (<=)
-- works
checkRange2 :: Ord a => a -> a -> a -> Bool
checkRange2 x y z = (x <= y) `leb` z
where leb :: Ord a => Maybe a -> a -> Bool
leb = (<=)
```

`checkRange1`

and `checkRange2`

work fine, since they both put a constraint on the intermediate type (either
as a result of the first comparison, or as an argument to the second).

```
-- error
checkRange3 :: Ord a => a -> a -> a -> Bool
checkRange3 x y z = (x <= y) <= z
```

When I try to let the compiler infer the intermediate type, though, it barks at me.

```
ChainedOrd.hs:64:30:
Ambiguous type variable `a0' in the constraints:
(ChainedOrd a0 a) arising from a use of `<='
at ChainedOrd.hs:64:30-31
(Booly a a0) arising from a use of `<=' at ChainedOrd.hs:64:24-25
Probable fix: add a type signature that fixes these type variable(s)
In the expression: (x <= y) <= z
In an equation for `checkRange3': checkRange3 x y z = (x <= y) <= z
```

Is there any way I can convince the compiler that it should use `Maybe a`

as
the intermediate type `a0`

satisifying `Booly a a0, ChainedOrd a0 a`

, since that's the only instance it knows about?

Failing that, is there another way I can make arbitrary comparison chaining work?