I'm trying to create a typed expression parser in Haskell, which works great so far, but I'm currently struggling to implement higher order functions. I've boiled the problem down to a simple example:

```
{-# LANGUAGE TypeFamilies,GADTs,FlexibleContexts,RankNTypes #-}
-- A function has an argument type and a result type
class Fun f where
type FunArg f
type FunRes f
-- Expressions are either constants of function applications
data Expr a where
Const :: a -> Expr a
App :: Fun f => f -> FunArg f -> Expr (FunRes f)
-- A very simple function
data Plus = Plus
-- Which takes two integer expressions and returns an integer expression
instance Fun Plus where
type FunArg Plus = (Expr Int,Expr Int)
type FunRes Plus = Int
-- A more complicated function which lifts a function to lists (like in haskell)
data Map f r = Map f
-- For this we need the concept of lifting function arguments:
class Liftable a where
type LiftRes a
-- A singleton argument is lifted by changing the expression type from a to [a]
instance Liftable (Expr a) where
type LiftRes (Expr a) = Expr [a]
-- Two function arguments are lifted by lifting each argument
instance (Liftable a,Liftable b) => Liftable (a,b) where
type LiftRes (a,b) = (LiftRes a,LiftRes b)
-- Now we can declare a function instance for Map
instance (Fun f,Liftable (FunArg f),r ~ LiftRes (FunArg f)) => Fun (Map f r) where
type FunArg (Map f r) = r
type FunRes (Map f r) = [FunRes f]
-- Now a parser for functions:
parseFun :: [String] -> (forall f. Fun f => f -> a) -> a
-- The parser for the plus function is easy:
parseFun ["plus"] f = f Plus
-- But the parser for map is not possible:
parseFun ("map":sym) f
= parseFun sym (\fun -> f (Map fun))
```

The problem seems to be that there is no way to convince the type checker that every LiftRes is itself Liftable, because recursive class declarations are forbidden.

My question is: How do I make this work? Are there other examples of typed expression parsers from which I could take hints?

**EDIT:** It seems that this discussion about type family constraints seems to be very related. However, I fail to make their solution work in my case, maybe someone can help with that?