This question is not subjective. A very specific verb is used in the referenced book, and I'd like to understand what the implication of that phrasing is, because I'm afraid I'm misunderstanding something.

From Learn You a Haskell, the following paragraph is the third and last one containing "we assume *".

data Barry t k p = Barry { yabba :: p, dabba :: t k }  

And now we want to make it an instance of Functor. Functor wants types of kind * -> * but Barry doesn't look like it has that kind. What is the kind of Barry? Well, we see it takes three type parameters, so it's going to be something -> something -> something -> *. It's safe to say that p is a concrete type and thus has a kind of *. For k, we assume * and so by extension, t has a kind of * -> *. Now let's just replace those kinds with the somethings that we used as placeholders and we see it has a kind of (* -> *) -> * -> * -> *.

Why are we assuming anything at all? Upon reading "we assume X (i.e. we assume that X is true)" it is natural for me to think that we should also consider the case that X is false. In the specific case of the example, couldn't t be of kind (* -> *) -> * and k of kind (* -> *)? If this was the case, whatever t and k actually were, t k would still be a concrete type, no?

I see that the whole line of reasoning is then checked against the compiler, but I don't think the compiler assumes. If it does, I'd like to know what, if it doesn't then again I'm afraid I'm missing the meaning of the paragraph.

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    You are correct. Indeed, we can have k :: L for any kind L, as long as t :: L -> *. A compiler here must however choose some specific L, or resort to a polykind. A polykind would be the most general option, but here GHC chooses L = * (basic Haskell does not have polykinds, they have to be turned on as an extension). Since it chooses something which is rather arbitrary, LYAH uses the word "assume" (AFAICT). – chi Dec 7 '19 at 21:31
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    Ok, maybe the compiler assumes would have puzzled me at least less than we assume, or not at all. – Enlico Dec 8 '19 at 9:08

In fact, the compiler does assume! But you can ask it not to with the PolyKinds extension. You can read about it in more detail here. With that extension turned on, the kind of Barry will be forall k. (k -> *) -> k -> * -> *.

  • I have posted a related question here, if you are interested. – Enlico May 11 '20 at 20:29

Good point. The author makes a needless assumtion. Perhaps just to make it easier to understand in his Type Foo chapter but people like yourself may rightfully question this.

Both t, k and p are type variables. As we see from yabba :: p it can live alone so it's like a constant function, as if it was a value instead of a type, it's type signature would say Int or Char, whatever... you name it. But since it is a type then it's kind signature is *.

However t type here takes a type variable k to construct a type (dabba :: t k) so we are sure that (no assumtion here) t has a kind signature like * -> * and k has *.

Once we know this... the type Barry t k p's kind signature is (* -> *) -> * -> * -> * which means it takes t then k and then p and give us Barry type.

Edit Make sure to read @luqui's comment below.

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    k is not constrained to be * as you claim it is while deducing t. We could have k :: * -> * and t :: (* -> *) -> *, for example. Add a field doo :: k Int to the record and it will pass with no issue. – luqui Dec 8 '19 at 0:20
  • @luqui.. Yes you are right... I won't delete this answer since your comment is really worth standing. – Redu Dec 8 '19 at 12:28

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