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I'm scratching my head to figure out the signature of this function

let make_rec f_norec =
  let rec f x = f_norec f x in

which should be

val make_rec : (('a -> 'b) -> 'a -> 'b) -> 'a -> 'b = <fun>.

Note there is a strange recursive definition. Definitely I'm missing some knowledge out there. Can anyone show me how to compute the type of the function (as the type inference system does)?

Great thanks.

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1 Answer 1

up vote 6 down vote accepted

Starting with the inner ones, and working outwards:

  1. let us call the type of x a
  2. then f has type a -> b where b is the result type of f
  3. f_norec takes f and x and it must return the same type as f, hence (a->b) -> a -> b
  4. make_rec takes f_norec, and it returns f. Hence ((a->b)->a->b) -> (a->b). For syntactic reasons, the last pair of parentheses can be omitted.
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Thanks a lot. That is quite pedagogical. –  Zhiyuan Shi Jul 3 '13 at 10:33
What I do not understand, why the last pair of parentheses can be omitted? –  Indicator Jul 20 '13 at 0:58
@Indicator This is how the right associative -> operator works, and it is made this way because if you have a function f :: a -> b -> c then this means that if you supply only the a-argument, you get a function b -> c. This is currying. OTOH, if the type is (a -> b) -> c this means that you have a one argument function that takes another function a -> b and returns a c. –  Ingo Jul 20 '13 at 9:07

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