A simple append function like this (in F#):

let rec app s t =
   match s with
      | [] -> t
      | (x::ss) -> x :: (app ss t)

will crash when s becomes big, since the function is not tail recursive. I noticed that F#'s standard append function does not crash with big lists, so it must be implemented differently. So I wondered: How does a tail recursive definition of append look like? I came up with something like this:

let rec comb s t =
   match s with
      | [] -> t
      | (x::ss) -> comb ss (x::t)
let app2 s t = comb (List.rev s) t 

which works, but looks rather odd. Is there a more elegant definition?


Traditional (not tail-recursive)

let rec append a b =
    match a, b with
    | [], ys -> ys
    | x::xs, ys -> x::append xs ys

With an accumulator (tail-recursive)

let append2 a b =
    let rec loop acc = function
        | [] -> acc
        | x::xs -> loop (x::acc) xs
    loop b (List.rev a)

With continuations (tail-recursive)

let append3 a b =
    let rec append = function
        | cont, [], ys -> cont ys
        | cont, x::xs, ys -> append ((fun acc -> cont (x::acc)), xs, ys)
    append(id, a, b)

Its pretty straight-forward to convert any non-tail recursive function to recursive with continuations, but I personally prefer accumulators for straight-forward readability.

| improve this answer | |
  • In the first example, what's the point of doing pattern matching on b if it's the same in all patterns? You can simply use b – Rubys May 19 '10 at 17:15
  • You're sure it's working? I get > append2 [1;2] [3;4];; val it : int list = [2; 3; 4] and > append3 [1;2] [3;4];; val it : int list = [1; 3; 4] Though I don't see the error, append2 looks ok to me.. – martingw May 19 '10 at 21:00
  • Very strange. Your code is perfectly fine, it runs with fsc. Does not run within fsi, though. Not the first issue I have with fsi on mono. – martingw May 19 '10 at 21:24
  • One last observation: The difference between append2 and append3 is not just readability: append2 [1..10000000] [] works, and append3 [1..10000000] [] leads to a stack overflow. – martingw May 19 '10 at 21:37
  • @martingw: append2 and append3 are correct, there's no reason whatsoever why you'd get a wrong result. Additionally, append3 is tail recursive, but you still might a stack overflow if you run the code in debug mode since tail calls are disabled by default (see stackoverflow.com/questions/1416415/…). – Juliet May 19 '10 at 22:33

In addition to what Juliet posted:

Using sequence expressions
Internally, sequence expressions generate tail-recursive code, so this works just fine.

let append xs ys = 
  [ yield! xs
    yield! ys ]

Using mutable .NET types
David mentioned that F# lists can be mutated - that's however limited only to F# core libraries (and the feature cannot be used by users, because it breaks the functional concepts). You can use mutable .NET data types to implement a mutation-based version:

let append (xs:'a[]) (ys:'a[]) = 
  let ra = new ResizeArray<_>(xs)
  for y in ys do ra.Add(y)
  ra |> List.ofSeq

This may be useful in some scenarios, but I'd generally avoid mutation in F# code.

| improve this answer | |

From a quick glance at the F# sources, it seems the tail is internally mutable. A simple solution would be to reverse the first list before consing its elements to the second list. That, along with reversing the list, are trivial to implement tail recursively.

| improve this answer | |

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.