I was chatting with Sadek Drobi on twitter when be brought up that F# didn't seem to support Infinite Types. It turns out that in C# you can do something along these lines:

delegate RecDelegate<T> RecDelegate<T>(T x);

However, after some experimentation on both our parts, we determined that the same in F# seems impossible both implicit and explicitly.


type 'a specialF = 'a->specialF<'a>

error FS0191: This type definition involves an immediate cyclic reference through an abbreviation, struct field or inheritance relation.


let rec specialF (x: 'a) = specialF

Type mismatch. Expecting a 'b but given a 'a -> 'b. The resulting type would be infinite when unifying ''b' and ''a -> 'b'.

Of course, these are intentionally simple samples.

I was wondering if I am somehow mistaken. Perhaps I missed some type of necessary annotation?

  • Is there a practical application here, or was the question just a result of investigating for fun? – Brian Aug 5 '09 at 17:58
  • 1
    As far as I understand, there are no practical referentially transparent applications. However, one example would be that with some kind of closed-over mutable state this can be useful for repeated applications. ex: add(1)(2)(3)(4) -- where any number of applications can be done. – Rick Minerich Aug 6 '09 at 17:41
  • Here's an OCaml program I wrote that uses this feature to avoid a level of indirection using rectypes. ffconsultancy.com/languages/ray_tracer/code/1/ray.ml – Jon Harrop Dec 27 '12 at 18:13

You can also do something like

type 'a RecType = RecType of ('a -> 'a RecType)

to create a named type through which to perform the recursion. Now this works:

let rec specialF = RecType (fun _ -> specialF)
type d<'T> = delegate of 'T -> d<'T>  //'
let del : d<int> = null
let anotherDel = del.Invoke(1).Invoke(2).Invoke(3)

I think you need a named type that is representable directly in CLI to break the recursion, so in F# this means you need an actual delegate type as well.


Recursive record types should work as well.

type A = { A : A }
let rec a : A = { A = a }

I'd be interested in a practical application. Or even an impractical one :)

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