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This compiles fine:

type List a = [a]

But when I introduce a class constraint, the compiler asks for RankNTypes to be included:

type List2 a = Num a => [a]

After including that extension, it compiles fine. Why is that extension required for compiling the code ?

Edit: Why do I need the constraint in the first place ?

I was inspecting this Lens type (type RefF a b = Functor f => (b -> f b) -> (a -> f a)) from this post and found out that it actually needed RankNTypes because of the Functor constraint.

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Why do you want a constraint inside of a type alias in the first place? –  Thomas M. DuBuisson Apr 8 at 18:34
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Indeed, GHC isn't smart enough to see something like foo :: List2 a -> a -> a; foo _ a = a + 1 and correctly determine that List a requires a Num instance and lift it to the a after List2 –  jozefg Apr 8 at 18:37
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Constraints on type synonyms are usually considered a code smell. The RankNTypes extension is needed because it's essentially equivalent to doing type List2 a = forall a. Num a => [a]. This is the same problem that plagues the famed lens library. It can be used for great purposes, but there is some type magic going on to make it work. –  bheklilr Apr 8 at 18:39
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To compare some similar types, consider type T1 b = forall a . Num a => [a] -> b which is a "more genuine" candidate for RankNTypes or data T2 = forall a . Num a => T2 [a] which is existential. –  J. Abrahamson Apr 8 at 19:18
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Type synonyms don't add new meaning, List2 requires RankNTypes because it is saying, wherever you see List2 a, insert Num a => [a], and if a class constraint appears anywhere except at the left-hand side, the type has a higher rank (and there is no guarantee that List2 will only be used in places where it would place the constraint on the left hand side). For example: let h n = replicate n 0; h :: Int -> List2 a is valid and equivalent to let h n = replicate n 0; h :: Int -> (forall a . Num a => [a]). Unless you write something like [0,1,2] :: List2 a which is a rank1 type. –  user2407038 Apr 8 at 22:30

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