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I have been struggling with something that looks like a simple algorithm, but can't find a clean way to express it in a functional style so far. Here is an outline of the problem: suppose I have 2 arrays X and Y,

X = [| 1; 2; 2; 3; 3 |]
Y = [| 5; 4; 4; 3; 2; 2 |]

What I want is to retrieve the elements that match, and the unmatched elements, like:

matched = [| 2; 2; 3 |]
unmatched = [| 1; 3 |], [| 4; 4; 5 |]

In pseudo-code, this is how I would think of approaching the problem:

let rec match matches x y =
    let m = find first match from x in y
    if no match, (matches, x, y)
        let x' = remove m from x
        let y' = remove m from y
        let matches' = add m to matches
        match matches' x' y'

The problem I run into is the "remove m from x" part - I can't find a clean way to do this (I have working code, but it's ugly as hell). Is there a nice, idiomatic functional way to approach that problem, either the removal part, or a different way to write the algorithm itself?

share|improve this question
up vote 4 down vote accepted

This could be solved easily using the right data structures, but in case you wanted to do it manually, here's how I would do it in Haskell. I don't know F# well enough to translate this, but I hope it is similar enough. So, here goes, in (semi-)literate Haskell.

overlap xs ys =

I start by sorting the two sequences to get away from the problem of having to know about previous values.

  go (sort xs) (sort ys)

The two base cases for the recursion are easy enough to handle -- if either list is empty, the result includes the other list in the list of elements that are not overlapping.

      go xs []           = ([], (xs, []))
      go [] ys           = ([], ([], ys))

I then inspect the first elements in each list. If they match, I can be sure that the lists overlap on that element, so I add that to the included elements, and I let the excluded elements be. I continue the search for the rest of the list by recursing on the tails of the lists.

      go (x:xs) (y:ys)
        | x == y = let (  included, excluded)     = go xs ys
                   in  (x:included, excluded)

Then comes the interesting part! What I essentially want to know is if the first element of one of the lists does not exist in the second list – in that case I should add it to the excluded lists and then continue the search.

        | x < y  = let (included, (  xex,   yex)) = go xs (y:ys)
                   in  (included, (x:xex,   yex))
        | y < x  = let (included, (  xex,   yex)) = go (x:xs) ys
                   in  (included, (  xex, y:yex))

And this is actually it. It seems to work for at least the example you gave.

> let (matched, unmatched) = overlap x y
> matched
> unmatched
share|improve this answer
Looks like you solved the OPs dilemma by always removing the first element (instead of searching for an element to put into matched, you always pick the first and then determine where it should go). I think your algorithm actually works if it isn't sorted because you always look through the rest of the list if the first elements don't match. I would say that it's faster if you sort first because you could change notElem to be a bit more efficient to take advantage of the sorting. – rliu Jun 8 '13 at 6:26
@roliu the difficulty without sorting is that you get a fourth case in the recursive case; something needs to happen if either x or y exists further down in the list. I don't know of a sensible way to take care of that – the easiest way out I could find was to just move those elements further back the list, and thus propagate them backward until you can handle them. The code gets a little uglier, though. – kqr Jun 8 '13 at 7:21
Since you have the lists sorted, I think you could replace notElem with something like x < y. – svick Jun 8 '13 at 14:19
@kqr Ah you're right. Ultimately if such a solution exists, I think sorting would actually be faster because of the optimization svick mentioned (I called it "chang[ing] notElem to be a bit more efficient to take advantage of the sorting"). But it's an interesting problem of how to do it... I guess I'd have a function called match which returned the list with the match removed? So you'd need to recursively search the list and pass the "processed" part and the "unprocessed part". Not too ugly but at least as ugly as sorting which is more efficient anyways... – rliu Jun 9 '13 at 8:06
@svick absolutely! Edited. Thanks. – kqr Jun 9 '13 at 17:48

It seems that you're describing multiset (bag) and its operations.

If you use the appropriate data structures, operations are very easy to implement:

// Assume that X, Y are initialized bags
let matches = X.IntersectWith(Y)
let x = X.Difference(Y)
let y = Y.Difference(X)

There's no built-in Bag collection in .NET framework. You could use Power Collection library including Bag class where the above function signature is taken.


You can represent a bag by a weakly ascending list. Here is an improved version of @kqr's answer in F# syntax:

let overlap xs ys =
    let rec loop (matches, ins, outs) xs ys =
        match xs, ys with
        // found a match
        | x::xs', y::ys' when x = y -> loop (x::matches, ins, outs) xs' ys'
        // `x` is smaller than every element in `ys`, put `x` into `ins`
        | x::xs', y::ys' when x < y -> loop (matches, x::ins, outs) xs' ys
        // `y` is smaller than every element in `xs`, put `y` into `outs`
        | x::xs', y::ys' -> loop (matches, ins, y::outs) xs ys'
        // copy remaining elements in `xs` to `ins`
        | x::xs', [] -> loop (matches, x::ins, outs) xs' ys
        // copy remaining elements in `ys` to `outs`
        | [], y::ys' -> loop (matches, ins, y::outs) xs ys'
        | [], [] -> (List.rev matches, List.rev ins, List.rev outs)
    loop ([], [], []) (List.sort xs) (List.sort ys)

After two calls to List.sort, which are probably O(nlogn), finding matches is linear to the sum of the lengths of two lists.

If you need a quick-and-dirty bag module, I would suggest a module signature like this:

type Bag<'T> = Bag of 'T list

module Bag =
    val count : 'T -> Bag<'T> -> int
    val insert : 'T -> Bag<'T> -> Bag<'T>
    val intersect : Bag<'T> -> Bag<'T> -> Bag<'T>
    val union : Bag<'T> -> Bag<'T> -> Bag<'T>
    val difference : Bag<'T> -> Bag<'T> -> Bag<'T>
share|improve this answer
That's helpful. I initially looked at sets, which implement the operations I care about, except that they don't handle duplicates. I suspected I was missing the right data structure - glad to know it has a name! And of course, now the next question for me is to look at how a bag is implemented... – Mathias Jun 8 '13 at 0:56
@Mathias I updated the answer with a suggestion. – pad Jun 8 '13 at 8:23

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