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What is a good way to represent the type LoL a, being a list of lists of ... of a? The nesting level is arbitrary, but uniform over all elements of the outer list.

The case I have in mind is to apply a grouping on the members of a list, and then to apply a next grouping on each subgroup, and so on. It is not known up front how many groupings one will have to apply. Hence:

rGroupBy :: [(a -> a -> Bool)] -> [a] -> [...[a]...]

Extra brownie points for the type signature of rGroupBy ;-)


Suppose deweyGroup i groups the elements based on the i-th number

rGroupBy [deweyGroup 1, deweyGroup 2] 
         ["1.1", "1.2.1", "1.2.2", "2.1", "2.2", "3"]


[ [ [ "1.1" ], [ "1.2.1", "1.2.2" ] ],
  [ [ "2.1" ], [ "2.2" ] ],
  [ [ "3" ] ]


One day later, we have 4 excellent and complementary solutions. I'm very pleased with the answers; thank you all.

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interesting question. When you say "it is not known up front" do you mean at compile time? If so then you may be out of luck, as haskell is statically typed. –  jberryman Aug 7 '12 at 17:17
in C/C++ a list is usually an array, an array is usually a 2 dimension matrix, make a list of arrays means that you are increasing the dimensions by 1, from 2 to 3, a list of array is a 3D matrix ( from an abstract point of view ); i don't know Haskell but probably your problem is just about matrix/vector dimensions. –  user827992 Aug 7 '12 at 17:23
@user827992, in Haskell, a list is a list, not an array. (It's a singly-linked list, to be precise) –  dflemstr Aug 7 '12 at 17:42
@dflemstr i was just making an example about how i would approach this in C/C++ and i suggest that probably the solution lies in a multi-dimensional approach. –  user827992 Aug 7 '12 at 17:46
@jberryman: indeed I mean at compile time. Secretly I hope that some haskell wizard conjures some nice type from his GADT hat, both solving my problem and providing an example to learn from. I think this is possible with GADTs (as this seems to allow vectors with fixed length enforced by the type system), but I find them currently out of my grasp. –  sleepyMonad Aug 7 '12 at 17:52
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5 Answers

up vote 2 down vote accepted

I believe the following example should be close to what you had in mind. First we declare type-level natural numbers. Then we define vectors, which carry their length as a phantom type (see Fixed-length vectors in Haskell, Part 1: Using GADTs). And then we define a structure for nested lists of lists of ... which carries the depth as a phantom type. Finally we can define correctly typed rGroupBy.

{-# LANGUAGE EmptyDataDecls #-}

import Data.List (groupBy)

data Zero
data Succ n

data Vec n a where
    Nil  ::                 Vec Zero a
    Cons :: a -> Vec n a -> Vec (Succ n) a

data LList n a where
    Singleton :: a           -> LList Zero a
    SuccList  :: [LList n a] -> LList (Succ n) a

-- Not very efficient, but enough for this example.
instance Show a => Show (LList n a) where
    showsPrec _ (Singleton x)   = shows x
    showsPrec _ (SuccList lls)  = shows lls

rGroupBy :: Vec n (a -> a -> Bool) -> [a] -> LList (Succ n) a
rGroupBy Nil
    = SuccList . map Singleton
rGroupBy (Cons f fs)
    = SuccList . map (rGroupBy fs) . groupBy f

-- TEST ------------------------------------------------------------

main = do
    let input = ["1.1", "1.2.1", "1.2.2", "2.1", "2.2", "3"]

    -- don't split anything
    print $ rGroupBy Nil input
    -- split on 2 levels
    print $ rGroupBy (Cons (deweyGroup 1) 
                           (Cons (deweyGroup 2) Nil))
    deweyGroup :: Int -> String -> String -> Bool
    deweyGroup i a b = a!!idx == b!!idx where idx = 2*(i-1)
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Another way to enforce the constraint that all branches have equal depth is to use a nested datatype:

data LoL a = One [a] | Many (LoL [a])

mapLoL :: ([a] -> [b]) -> LoL a -> LoL b
mapLoL f (One xs) = One (f xs)
mapLoL f (Many l) = Many $ mapLoL (map f) l

rGroupBy :: [a -> a -> Bool] -> [a] -> LoL a
rGroupBy [] xs = One xs
rGroupBy (f:fs) xs = Many $ mapLoL (groupBy f) $ rGroupBy fs xs

Expanding the definition of LoL, we see that informally,

LoL a = [a] | [[a]] | [[[a]]] | ...

Then we can say, for example:

ghci> rGroupBy [(==) `on` fst, (==) `on` (fst . snd)] [ (i,(j,k)) | i<-[1..3], j<-[1..3], k<-[1..3]]

to get back

Many (Many (One [[[(1,(1,1)),(1,(1,2)),(1,(1,3))]],[[(1,(2,1)),(1,(2,2)),(1,(2,3)), ...
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Also very nice. It took me a while before I realized that groupBy f has type [a] -> [[a]], and that each successive application of map adds an extra nesting level (e.g. map . map . groupBy f :: [[[a]]] -> [[[[a]]]]). –  sleepyMonad Aug 8 '12 at 17:23
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What you actually have is a tree. Try representing it with a recursive data structure:

data LoL a = SoL [a] | MoL [LoL a] deriving (Eq, Show)

rGroupBy :: [(a -> a -> Bool)] -> [a] -> LoL a
rGroupBy (f:fs) = MoL . map (rGroupBy fs) . groupBy f
rGroupBy []     = SoL

deweyGroup :: Int -> String -> String -> Bool
deweyGroup i a b = a!!idx == b!!idx where idx = 2*(i-1)

rGroupBy [deweyGroup 1, deweyGroup 2] ["1.1", "1.2.1", "1.2.2", "2.1", "2.2", "3.0"] gives:

MoL [MoL [SoL ["1.1"],
          SoL ["1.2.1","1.2.2"]],
     MoL [SoL ["2.1"],
          SoL ["2.2"]],
     MoL [SoL ["3.0"]]
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Couldn't have said it better myself. –  Eric Aug 7 '12 at 18:15
Also, take a look at Rose Trees. hackage.haskell.org/package/containers- –  Paul Johnson Aug 7 '12 at 18:18
Very nice solution. The only problem I see is that a tree structure doesn't force uniform depth. –  Petr Pudlák Aug 7 '12 at 18:26
@Petr Would it be possible to modify this to force uniform depth? –  Jeff Burka Aug 7 '12 at 19:19
very nice indeed. And I had missed the point that it's actually a tree. Thanks. –  sleepyMonad Aug 8 '12 at 15:06
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If you want to enforce uniform depth, there is a (fairly) standard trick to do that involving polymorphic recursion. What we'll do is have a spine of "deeper" constructors telling how deeply nested the list is, then a final "here" constructor with the deeply-nested list:

data GroupList a = Deeper (GroupList [a]) | Here a deriving (Eq, Ord, Show, Read)

Actually, the type as defined has one aesthetic choice that you may wish to vary in your code: the Here constructor takes a single a and not a list of as. The consequences of this choice are sort of scattered through the rest of this answer.

Here's an example of a value of this type exhibiting lists-of-lists; it has two Deeper constructors corresponding to the depth-two nesting that it has:

> :t Deeper (Deeper (Here [[1,2,3], []]))
Num a => GroupList a

Here's see a few sample functions.

instance Functor GroupList where
    fmap f (Here   a ) = Here   (f a)
    fmap f (Deeper as) = Deeper (fmap (fmap f) as)
    -- the inner fmap is at []-type

-- this type signature is not optional
flatten :: GroupList [a] -> GroupList a
flatten (Here   a ) = Deeper (Here a)
flatten (Deeper as) = Deeper (flatten as)

singleGrouping :: (a -> a -> Bool) -> GroupList [a] -> GroupList [a]
singleGrouping f = flatten . fmap (groupBy f)

rGroupBy :: [a -> a -> Bool] -> [a] -> GroupList [a]
rGroupBy fs xs = foldr singleGrouping (Here xs) fs
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Thanks. Regarding the aesthetic aspect: I believe the solution of Phil Freeman took the other choice. I find his code easier to understand, though your explanation of the "spine of constructors" initially helped a lot there as well. In fact, the comments in your code hint at important non-obvious details, such as that flatten flattens the inner type, but adds a Deeper constructor (I was wondering why it wasn't called "deepen"); and that you use nested fmaps to traverse both GroupLists and normal lists. Subtle! –  sleepyMonad Aug 8 '12 at 18:41
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As a type-hackery exercise it is possible to implement this with standard lists.

All we need is an arbitrary depth groupStringsBy function:

{-# LANGUAGE MultiParamTypeClasses, FlexibleInstances, FlexibleContexts,
  UndecidableInstances, IncoherentInstances,
  TypeFamilies, ScopedTypeVariables #-}

import Data.List
import Data.Function

class StringGroupable a b where
    groupStringBy :: Pred -> a -> b

instance (StringGroupable a b, r ~ [b]) => StringGroupable [a] r where
    groupStringBy f = map (groupStringBy f)

instance (r ~ [[String]]) => StringGroupable [String] r where
    groupStringBy p = groupBy p

Which works like this:

*Main> let lst = ["11","11","22","1","2"]
*Main> groupStringBy ((==) `on` length) lst
*Main> groupStringBy (==) . groupStringBy ((==) `on` length) $ lst

So we can use this function directly (although it has to be put in reverse order):

inp = ["1.1", "1.2.1", "1.2.2", "2.1", "2.2", "3"]

deweyGroup :: Int -> String -> String -> Bool
deweyGroup i a b = a!!idx == b!!idx where idx = 2*(i-1)

-- gives: [[["1.1"],["1.2.1","1.2.2"]],[["2.1"],["2.2"]],[["3"]]]
test1 = groupStringBy (deweyGroup 2) . groupStringBy (deweyGroup 1) $ inp

But if you want to use your original sample, we can hack it too. First we need a variable argument function which pipelines all the arguments but the last one in reverse order via . and then applies the resulting function to the last argument:

class App a b c r where
    app :: (a -> b) -> c -> r

instance (b ~ c, App a d n r1, r ~ (n -> r1)) => App a b (c -> d) r where
    app c f = \n -> app (f . c) n

instance (a ~ c, r ~ b) => App a b c r where
    app c a = c a

Works like this:

*Main> app not not not True
*Main> app (+3) (*2) 2

Then expand it with a custom rule for our predicate type type Pred = String -> String -> Bool:

type Pred = String -> String -> Bool

instance (StringGroupable b c, App a c n r1, r ~ (n -> r1)) => App a b Pred r where
    app c p = app ((groupStringBy p :: b -> c) . c)

And finally wrap it in rGroupBy (supplying id function to be the first in the pipeline):

rGroupBy :: (App [String] [String] Pred r) => Pred -> r
rGroupBy p = app (id :: [String] -> [String]) p

Now it should work for any number of grouping predicates of type Pred producing the list of the depth equal to the number of supplied predicates:

-- gives: [["1.1","1.2.1","1.2.2"],["2.1","2.2"],["3"]]
test2 = rGroupBy (deweyGroup 1) inp

-- gives: [[["1.1"],["1.2.1","1.2.2"]],[["2.1"],["2.2"]],[["3"]]]
test3 = rGroupBy (deweyGroup 1) (deweyGroup 2) inp

-- gives: [[[["1.1"]],[["1.2.1","1.2.2"]]],[[["2.1"]],[["2.2"]]],[[["3"]]]]
test4 = rGroupBy (deweyGroup 1) (deweyGroup 2) (deweyGroup 1) inp

So it is possible (and probably can be simplified) but as always with this sort of hackery is not recommended to be used for anything but the exercise.

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