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I'm testing a simple program to generate subsets with an inclusion test. For example, given

*Main Data.List> factorsets 7

calling chooseP 3 (factorsets 7), I would like to get (read from right to left, a la cons)


But my program is returning an extra [([7],1),([5],1),([3],1)] (and missing a


The inclusion test is: members' first part of the tuple must have a null intersection.

Once tested as working, the plan is to sum the internal products of each subset's snds, rather than accumulate them.

Since I've asked a similar question before, I imagine that an extra branch is generated since when the recursion splits at [2,3], the second branch runs over the same possibilities once it passes the skipped section. Any pointers on how to resolve that would be appreciated; and if you'd like to share ideas about how to enumerate and sum such product combinations more efficiently, that would be great, too.

Haskell code:

chooseP k xs = chooseP' xs [] 0 where
  chooseP' [] product count = if count == k then [product] else []
  chooseP' yys product count
    | count == k = [product]
    | null yys   = []
    | otherwise  = f ++ g
   where (y:ys) = yys
         (factorsY,numY) = y
         f = let zzs = dropWhile (\(fs,ns) -> not . and . map (null . intersect fs . fst) $ product) yys
             in if null zzs
                   then chooseP' [] product count
                   else let (z:zs) = zzs in chooseP' zs (z:product) (count + 1)
         g = if and . map (null . intersect factorsY . fst) $ product
                then chooseP' ys product count
                else chooseP' ys [] 0
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If you described what this function is supposed to be doing a little bit, it would help me a lot. As it is, since I'm not a compiler, I have a lot of trouble keeping the whole function in my head -- and I wish I were able to chunk it a bit more by matching intent to implementation. –  Daniel Wagner Sep 27 '13 at 3:37
@DanielWagner Thank you for your comment. The function is supposed to generate all subsets of length k, without creating duplicates, with the caveat that members' fst's must have a null intersect. All fst's and the list is pre-sorted so one would only need to test the last element against the next rather than all members. –  גלעד ברקן Sep 27 '13 at 3:41
@groovy Subsets of length k of what set? What is an fst? What's an snd? –  rliu Sep 27 '13 at 3:43
@roliu Subsets of the example set (on second/third line): [([2],2),([2,3],1),([3],1),([5],1),([7],1)]. fst and snd meaning first and second elements of the tuples. –  גלעד ברקן Sep 27 '13 at 3:45
@groovy Sorry I'm confused how you even generated the original set with factorsets 7, but if you are only debugging chooseP I guess it doesn't matter. Ah I bet fst and snd actually mean something in haskell which is why that was a dumb question. –  rliu Sep 27 '13 at 3:46

1 Answer 1

Your code is complicated enough that I might recommend starting over. Here's how I would proceed.

  1. Write a specification. Let it be as stupidly inefficient as necessary -- for example, the spec I choose below will build all combinations of k elements from the list, then filter out the bad ones. Even the filter will be stupidly slow.

    sorted   xs = sort xs == xs
    unique   xs = nub xs == xs
    disjoint xs = and $ liftM2 go xs xs where
        go x1 x2 = x1 == x2 || null (intersect x1 x2)
    -- check that x is valid according to all the validation functions in fs
    -- (there are other fun ways to spell this, but this is particularly
    -- readable and clearly correct -- just what we want from a spec)
    allFuns fs x = all ($x) fs
    choosePSpec k = filter good . replicateM k where
        good pairs = allFuns [unique, disjoint, sorted] (map fst pairs)

    Just to make sure it's right, we can test it at the prompt:

    *Main> mapM_ print $ choosePSpec 3 [([2],2),([2,3],1),([3],1),([5],1),([7],1)]

    Looks good.

  2. Now that we have a spec, we can try to improve the speed one refactoring at a time, always checking that it matches the spec. The first thing I'd want to do is notice that we can ensure uniqueness and sortedness just by sorting the input and picking things "in an increasing way". To do this, we can define a function which chooses subsequences of a given length. It piggy-backs on the tails function, which you can think of as nondeterministically choosing a place to split its input list.

    subseq 0 xs = [[]]
    subseq n xs = do
        x':xt <- tails xs
        xs'   <- subseq (n-1) xt
        return (x':xs')

    Here's an example of this function in action:

    *Main> subseq 3 [1..4]

    Now we can write a slightly faster chooseP by replacing replicateM with subseq. Recall that we're assuming the inputs are already sorted and unique, though.

    choosePSlow k = filter good . subseq k where
        good pairs = disjoint $ map fst pairs

    We can sanity-check that it's working by running it on the particular input we have from above:

    *Main> let i = [([2],2),([2,3],1),([3],1),([5],1),([7],1)]
    *Main> choosePSlow 3 i == choosePSpec 3 i

    Or, better yet, we can stress-test it with QuickCheck. We'll need a tiny bit more code. The condition k < 5 is just because the spec is so hopelessly slow that bigger values of k take forever.

    propSlowMatchesSpec :: NonNegative Int -> OrderedList ([Int], Int) -> Property
    propSlowMatchesSpec (NonNegative k) (Ordered xs)
        =   k < 5 && unique (map fst xs)
        ==> choosePSlow k xs == choosePSpec k xs
    *Main> quickCheck propSlowMatchesSpec
    +++ OK, passed 100 tests.
  3. There are several more opportunities to make things faster. For instance, the disjoint test could be sped up using choose 2 instead of liftM2; or we might be able to ensure disjointness during element selection and prune the search even earlier; etc. How you want to improve it from here I leave to you -- but the basic technique (start with stupid and slow, then make it smarter, testing as you go) should be helpful to you.

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