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# Linked list partition function and reversed results

I wrote this F# function to partition a list up to a certain point and no further -- much like a cross between `takeWhile` and `partition`.

``````let partitionWhile c l =
let rec aux accl accr =
match accr with
| [] -> (accl, [])
| h::t ->
if c h then
aux (h::accl) t
else
(accl, accr)
aux [] l
``````

The only problem is that the "taken" items are reversed:

``````> partitionWhile ((>=) 5) [1..10];;
val it : int list * int list = ([5; 4; 3; 2; 1], [6; 7; 8; 9; 10])
``````

Other than resorting to calling `rev`, is there a way this function could be written that would have the first list be in the correct order?

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Here's a continuation-based version. It's tail-recursive and returns the list in the original order.

``````let partitionWhileCps c l =
let rec aux f = function
| h::t when c h -> aux (fun (acc, l) -> f ((h::acc), l)) t
| l -> f ([], l)
aux id l
``````

Here are some benchmarks to go along with the discussion following Brian's answer (and the accumulator version for reference):

``````let partitionWhileAcc c l =
let rec aux acc = function
| h::t when c h -> aux (h::acc) t
| l -> (List.rev acc, l)
aux [] l

let test =
let l = List.init 10000000 id
(fun f ->
let r = f ((>) 9999999) l
printfn "%A" r)

test partitionWhileCps // Real: 00:00:06.912, CPU: 00:00:07.347, GC gen0: 78, gen1: 65, gen2: 1
test partitionWhileAcc // Real: 00:00:03.755, CPU: 00:00:03.790, GC gen0: 52, gen1: 50, gen2: 1
``````

`Cps` averaged ~7s, `Acc` ~4s. In short, continuations buy you nothing for this exercise.

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Thanks for all your effort! – Rei Miyasaka Aug 27 '11 at 12:07

I expect you can use continuations, but calling `List.rev` at the end is the best way to go.

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Other than because it's easier, is there a reason to favor an accumulator + `List.rev` over CPS? – Daniel Aug 26 '11 at 4:28
Easier to write, easier to read, and probably more performant. – Brian Aug 26 '11 at 5:52
I'm going to have to read up on continuations more before I can say anything... hm.... – Rei Miyasaka Aug 26 '11 at 8:17
I don't know about more performant as using continuations seemed very efficient, but I definitely stand behind easier to write/read. – David Grenier Aug 26 '11 at 11:44
@David Yeah, I'm still trying to wrap my head around Daniel's answer. It's not a form I'm familiar with. Though as with most functional idioms and probably programming idioms in general, I think it might become fairly readable once it clicks. Performance might be something that I'd have to measure quite a few times... – Rei Miyasaka Aug 26 '11 at 13:04

I usually prefer Sequences over List as they are lazy and you got `List.toSeq` and `Seq.toList` functions to convert between them. Below is the implementation of your `partitionWhile` function using sequences.

``````let partitionWhile (c:'a -> bool) (l:'a list) =
seq { while e.MoveNext() do yield e.Current}
use e = (l |> List.toSeq).GetEnumerator()
(e |> fromEnum |> Seq.takeWhile c |> Seq.toList)
``````
-

You can rewrite the function like this:

``````let partitionWhile c l =
let rec aux xs =
match xs with
| [] -> ([], [])
| h :: t ->
if c h then
let (good, bad) = aux t in
else
([], h :: t)
aux l
``````

Yes, as Brian has noted it is no longer tail recursive, but it answers the question as stated. Incidentally, `span` in Haskell is implemented exactly the same way in Hugs:

``````span p []       = ([],[])
span p xs@(x:xs')
| p x       = (x:ys, zs)
| otherwise = ([],xs)
where (ys,zs) = span p xs'
``````

A good reason for preferring this version in Haskell is laziness: In the first version all the good elements are visited before the list is reversed. In the second version the first good element can be returned immediately.

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FYI, this is not tail-recursive, so it will blow up with `StackOverflowException` on a very large list. – Brian Aug 26 '11 at 1:43
Seems like a rather risky way to implement an algorithm that might be used for huge lists. Does Haskell provide a larger stack or something? – Rei Miyasaka Aug 26 '11 at 2:15
@Rei The reason is laziness. I'd better mention that too. – antonakos Aug 26 '11 at 2:53

I don't think I'm the only one to learn a lot from (struggling with) Daniel's CPS solution. In trying to figure it out, it helped me change several potentially (to the beginner) ambiguous list references, like so:

``````    let partitionWhileCps cond l1 =

let rec aux f l2 =
match l2 with
| h::t when cond h ->   aux  (fun (acc, l3) -> f (h::acc, l3))  t
| l4 -> f ([], l4)

aux id l1
``````

(Note that "[]" in the l4 match is the initial acc value.) I like this solution because it feels less kludgey not having to use List.rev, by drilling to the end of the first list and building the second list backwards. I think the other main way to avoid .rev would be to use tail recursion with a cons operation. Some languages optimize "tail recursion mod cons" in the same way as proper tail recursion (but Don Syme has said that this won't be coming to F#).

So this is not tail-recursive safe in F#, but it makes my answer an answer and avoids List.rev (this is ugly to have to access the two tuple elements and would be a more fitting parallel to the cps approach otherwise, I think, like if we only returned the first list):

``````    let partitionWhileTrmc cond l1 =

let rec aux acc l2 =
match l2 with
| h::t when cond h ->  ( h::fst(aux acc t), snd(aux acc t))
| l3 -> (acc, l3)

aux [] l1
``````
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