Ajout : GL (General Ledger).

[comptalang.git] / lib / Hcompta / Lib / TreeMap.hs

{-# LANGUAGE DeriveDataTypeable #-}
{-# LANGUAGE NamedFieldPuns #-}

-- | This module implements a 'TreeMap',
-- which is like a 'Map'
-- but whose key is now a 'NonEmpty' list of 'Map' keys (a 'Path')
-- enabling the possibility to gather mapped values
-- by 'Path' prefixes (inside a 'Node').
module Hcompta.Lib.TreeMap where

import           Control.Applicative ((<$>), (<*>), pure)
import           Data.Data (Data)
import           Data.Foldable (Foldable(..))
import qualified Data.List
import qualified Data.List.NonEmpty
import           Data.List.NonEmpty (NonEmpty(..))
import qualified Data.Map.Strict as Data.Map
import           Data.Map.Strict (Map)
import           Data.Monoid (Monoid(..))
import           Data.Traversable (Traversable(..))
import           Data.Typeable (Typeable)
import           Prelude hiding (filter, null, reverse)

-- * Type 'TreeMap'

newtype TreeMap k x
 =      TreeMap (Map k (Node k x))
 deriving (Data, Eq, Read, Show, Typeable)

instance (Ord k, Monoid v) => Monoid (TreeMap k v) where
        mempty = empty
        mappend = union const
        -- mconcat = Data.List.foldr mappend mempty
instance Ord k => Functor (TreeMap k) where
        fmap f (TreeMap m) = TreeMap $ fmap (fmap f) m
instance Ord k => Foldable (TreeMap k) where
        foldMap f (TreeMap m) = foldMap (foldMap f) m
instance Ord k => Traversable (TreeMap k) where
        traverse f (TreeMap m) = TreeMap <$> traverse (traverse f) m

-- * Type 'Path'

-- | A 'Path' is a non-empty list of 'Map' keys.
type Path k = NonEmpty k

path :: k -> [k] -> Path k
path = (:|)

list :: Path k -> [k]
list = Data.List.NonEmpty.toList

reverse :: Path k -> Path k
reverse = Data.List.NonEmpty.reverse

-- * Type 'Node'
data Ord k
 => Node k x
 =  Node
 { node_size        :: Int -- ^ The number of non-'Nothing' 'node_value's reachable from this 'Node'.
 , node_value       :: Maybe x -- ^ Some value, or 'Nothing' if this 'Node' is intermediary.
 , node_descendants :: TreeMap k x -- ^ Descendants 'Node's.
 } deriving (Data, Eq, Read, Show, Typeable)

instance (Ord k, Monoid v) => Monoid (Node k v) where
        mempty =
                Node
                 { node_value = Nothing
                 , node_size = 0
                 , node_descendants = TreeMap mempty
                 }
        mappend
         Node{node_value=x0, node_descendants=m0}
         Node{node_value=x1, node_descendants=m1} =
                let m = union const m0 m1 in
                let x = x0 `mappend` x1 in
                Node
                 { node_value = x
                 , node_size = size m + maybe 0 (const 1) x
                 , node_descendants = union const m0 m1
                 }
        -- mconcat = Data.List.foldr mappend mempty

instance Ord k => Functor (Node k) where
        fmap f Node{node_value=x, node_descendants=m, node_size} =
                Node
                 { node_value = fmap f x
                 , node_descendants = Hcompta.Lib.TreeMap.map f m
                 , node_size
                 }

instance Ord k => Foldable (Node k) where
        foldMap f Node{node_value=Nothing, node_descendants=TreeMap m} =
                foldMap (foldMap f) m
        foldMap f Node{node_value=Just x, node_descendants=TreeMap m} =
                f x `mappend` foldMap (foldMap f) m

instance Ord k => Traversable (Node k) where
        traverse f Node{node_value=Nothing, node_descendants=TreeMap m, node_size} =
                Node node_size <$> pure Nothing <*> (TreeMap <$> traverse (traverse f) m)
        traverse f Node{node_value=Just x, node_descendants=TreeMap m, node_size} =
                Node node_size <$> (Just <$> f x) <*> (TreeMap <$> traverse (traverse f) m)

-- * Construct

-- | Return the empty 'TreeMap'.
empty :: TreeMap k x
empty = TreeMap Data.Map.empty

-- | Return a 'TreeMap' only mapping the given 'Path' to the given value.
singleton :: Ord k => Path k -> x -> TreeMap k x
singleton ks x = insert const ks x empty

-- | Return a 'Node' only containing the given value.
leaf :: Ord k => x -> Node k x
leaf x =
        Node
         { node_value = Just x
         , node_descendants = empty
         , node_size = 1
         }

-- | Return the given 'TreeMap' associating the given 'Path' with the given value,
-- merging values if the given 'TreeMap' already associates the given 'Path'
-- with a non-'Nothing' 'node_value'.
insert :: Ord k => (x -> x -> x) -> Path k -> x -> TreeMap k x -> TreeMap k x
insert merge (k:|[]) x (TreeMap m) =
        TreeMap $
        Data.Map.insertWith
         (\_ Node{node_value=x1, node_descendants=m1, node_size=s1} ->
                Node
                 { node_value = maybe (Just x) (Just . merge x) x1
                 , node_descendants = m1
                 , node_size = maybe (s1 + 1) (const s1) x1
                 })
         k (leaf x) m
insert merge (k:|k':ks) x (TreeMap m) =
        TreeMap $
        Data.Map.insertWith
         (\_ Node{node_value=x1, node_descendants=m1} ->
                let m' = insert merge (path k' ks) x m1 in
                Node{node_value=x1, node_descendants=m', node_size=size m' + maybe 0 (const 1) x1})
         k
         (Node
                 { node_value = Nothing
                 , node_descendants = insert merge (path k' ks) x empty
                 , node_size = 1
                 })
         m

-- | Return a 'TreeMap' associating for each tuple of the given list
-- the 'Path' to the value,
-- merging values of identical 'Path's (in respective order).
from_List :: Ord k => (x -> x -> x) -> [(Path k, x)] -> TreeMap k x
from_List merge = Data.List.foldl (\acc (p, x) -> insert merge p x acc) empty

-- | Return a 'TreeMap' associating for each key and value of the given 'Map'
-- the 'Path' to the value,
-- merging values of identical 'Path's (in respective order).
from_Map :: Ord k => (x -> x -> x) -> Map (Path k) x -> TreeMap k x
from_Map merge = Data.Map.foldlWithKey (\acc p x -> insert merge p x acc) empty

-- * Size

-- | Return the 'Map' in the given 'TreeMap'.
nodes :: TreeMap k x -> Map k (Node k x)
nodes (TreeMap m) = m

-- | Return 'True' iif. the given 'TreeMap' is 'empty'.
null :: TreeMap k x -> Bool
null (TreeMap m) = Data.Map.null m

-- | Return the number of non-'Nothing' 'node_value's in the given 'TreeMap'.
--
--   * Complexity: O(r) where r is the size of the root 'Map'.
size :: Ord k => TreeMap k x -> Int
size = Data.Map.foldr ((+) . node_size) 0 . nodes

-- * Find

-- | Return the value (if any) associated with the given 'Path'.
find :: Ord k => Path k -> TreeMap k x -> Maybe x
find (k:|[]) (TreeMap m) = maybe Nothing node_value $ Data.Map.lookup k m
find (k:|k':ks) (TreeMap m) =
        maybe Nothing (find (path k' ks) . node_descendants) $
        Data.Map.lookup k m

-- * Union

-- | Return a 'TreeMap' associating the same 'Path's as both given 'TreeMap's,
-- merging values (in respective order) when a 'Path' leads
-- to a non-'Nothing' 'node_value' in both given 'TreeMap's.
union :: Ord k => (x -> x -> x) -> TreeMap k x -> TreeMap k x -> TreeMap k x
union merge (TreeMap tm0) (TreeMap tm1) =
        TreeMap $
        Data.Map.unionWith
         (\Node{node_value=x0, node_descendants=m0}
           Node{node_value=x1, node_descendants=m1} ->
                let m = union merge m0 m1 in
                let x = maybe x1 (\x0' -> maybe (Just x0') (Just . merge x0') x1) x0 in
                Node
                 { node_value = x
                 , node_descendants = m
                 , node_size = size m + maybe 0 (const 1) x
                 })
         tm0 tm1

-- | Return the 'union' of the given 'TreeMap's.
--
-- NOTE: use 'Data.List.foldl'' to reduce demand on the control-stack.
unions :: Ord k => (x -> x -> x) -> [TreeMap k x] -> TreeMap k x
unions merge ts = Data.List.foldl' (union merge) empty ts

-- foldl' :: (a -> b -> a) -> a -> [b] -> a
-- foldl' f = go
--      where
--              go z []     = z
--              go z (x:xs) = z `seq` go (f z x) xs

-- * Map

-- | Return the given 'TreeMap' with each non-'Nothing' 'node_value'
-- mapped by the given function.
map :: Ord k => (x -> y) -> TreeMap k x -> TreeMap k y
map f =
        TreeMap .
        Data.Map.map
         (\n@Node{node_value=x, node_descendants=m} ->
                n{ node_value=maybe Nothing (Just . f) x
                 , node_descendants=Hcompta.Lib.TreeMap.map f m
                 }) .
        nodes

-- | Return the given 'TreeMap' with each 'node_value'
-- mapped by the given function supplied with
-- the already mapped 'node_descendants' of the current 'Node'.
map_by_depth_first :: Ord k => (TreeMap k y -> Maybe x -> y) -> TreeMap k x -> TreeMap k y
map_by_depth_first f =
        TreeMap .
        Data.Map.map
         (\n@Node{node_value, node_descendants} ->
                let m = map_by_depth_first f node_descendants in
                let x = f m node_value in
                n{ node_value = Just x
                 , node_descendants = m
                 , node_size = size m + 1
                 }) .
        nodes

-- * Alter

alterl_path :: Ord k => (Maybe x -> Maybe x) -> Path k -> TreeMap k x -> TreeMap k x
alterl_path fct =
        go fct . list
        where
                go :: Ord k
                 => (Maybe x -> Maybe x) -> [k]
                 -> TreeMap k x -> TreeMap k x
                go _f [] m = m
                go f (k:p) (TreeMap m) =
                        TreeMap $
                        Data.Map.alter
                         (\c ->
                                let (cv, cm) =
                                        case c of
                                         Just Node{node_value=v, node_descendants=d} -> (v, d)
                                         Nothing -> (Nothing, empty) in
                                let fx = f cv in
                                let gm = go f p cm in
                                case (fx, size gm) of
                                 (Nothing, 0) -> Nothing
                                 (_, s) -> Just
                                        Node
                                         { node_value = fx
                                         , node_descendants = gm
                                         , node_size = s + 1
                                         }
                         ) k m

-- * Fold

-- | Return the given accumulator folded by the given function
-- applied on non-'Nothing' 'node_value's
-- from left to right through the given 'TreeMap'.
foldl_with_Path :: Ord k => (a -> Path k -> x -> a) -> a -> TreeMap k x -> a
foldl_with_Path =
        foldp []
        where
                foldp :: Ord k
                 => [k] -> (a -> Path k -> x -> a)
                 -> a -> TreeMap k x -> a
                foldp p fct a (TreeMap m) =
                        Data.Map.foldlWithKey
                         (\acc k Node{node_value, node_descendants} ->
                                let acc' = maybe acc (fct acc (reverse $ path k p)) node_value in
                                foldp (k:p) fct acc' node_descendants) a m

-- | Return the given accumulator folded by the given function
-- applied on non-'Nothing' 'Node's and 'node_value's
-- from left to right through the given 'TreeMap'.
foldl_with_Path_and_Node :: Ord k => (a -> Path k -> Node k x -> x -> a) -> a -> TreeMap k x -> a
foldl_with_Path_and_Node =
        foldp []
        where
                foldp :: Ord k
                 => [k] -> (a -> Path k -> Node k x -> x -> a)
                 -> a -> TreeMap k x -> a
                foldp p fct a (TreeMap m) =
                        Data.Map.foldlWithKey
                         (\acc k n@Node{node_value, node_descendants} ->
                                let acc' = maybe acc (fct acc (reverse $ path k p) n) node_value in
                                foldp (k:p) fct acc' node_descendants) a m

-- | Return the given accumulator folded by the given function
-- applied on non-'Nothing' 'node_value's
-- from right to left through the given 'TreeMap'.
foldr_with_Path :: Ord k => (Path k -> x -> a -> a) -> a -> TreeMap k x -> a
foldr_with_Path =
        foldp []
        where
                foldp :: Ord k
                 => [k] -> (Path k -> x -> a -> a)
                 -> a -> TreeMap k x -> a
                foldp p fct a (TreeMap m) =
                        Data.Map.foldrWithKey
                         (\k Node{node_value, node_descendants} acc ->
                                let acc' = foldp (k:p) fct acc node_descendants in
                                maybe acc' (\x -> fct (reverse $ path k p) x acc') node_value) a m

-- | Return the given accumulator folded by the given function
-- applied on non-'Nothing' 'Node's and 'node_value's
-- from right to left through the given 'TreeMap'.
foldr_with_Path_and_Node :: Ord k => (Path k -> Node k x -> x -> a -> a) -> a -> TreeMap k x -> a
foldr_with_Path_and_Node =
        foldp []
        where
                foldp :: Ord k
                 => [k] -> (Path k -> Node k x -> x -> a -> a)
                 -> a -> TreeMap k x -> a
                foldp p fct a (TreeMap m) =
                        Data.Map.foldrWithKey
                         (\k n@Node{node_value, node_descendants} acc ->
                                let acc' = foldp (k:p) fct acc node_descendants in
                                maybe acc' (\x -> fct (reverse $ path k p) n x acc') node_value) a m

-- | Return the given accumulator folded by the given function
-- applied on non-'Nothing' 'node_value's
-- from left to right along the given 'Path'.
foldl_path :: Ord k => (Path k -> x -> a -> a) -> Path k -> TreeMap k x -> a -> a
foldl_path fct =
        go fct [] . list
        where
                go :: Ord k
                 => (Path k -> x -> a -> a) -> [k] -> [k]
                 -> TreeMap k x -> a -> a
                go _f _ [] _t a = a
                go f p (k:n) (TreeMap t) a =
                        case Data.Map.lookup k t of
                         Nothing -> a
                         Just Node{node_value=v, node_descendants=d} ->
                                case v of
                                 Nothing -> go f (k:p) n d a
                                 Just x  -> go f (k:p) n d (f (reverse $ path k p) x a)

-- | Return the given accumulator folded by the given function
-- applied on non-'Nothing' 'node_value's
-- from right to left along the given 'Path'.
foldr_path :: Ord k => (Path k -> x -> a -> a) -> Path k -> TreeMap k x -> a -> a
foldr_path fct =
        go fct [] . list
        where
                go :: Ord k
                 => (Path k -> x -> a -> a) -> [k] -> [k]
                 -> TreeMap k x -> a -> a
                go _f _ [] _t a = a
                go f p (k:n) (TreeMap t) a =
                        case Data.Map.lookup k t of
                         Nothing -> a
                         Just Node{node_value=v, node_descendants=d} ->
                                case v of
                                 Nothing -> go f (k:p) n d a
                                 Just x  -> f (reverse $ path k p) x $ go f (k:p) n d a

-- * Flatten

-- | Return a 'Map' associating each 'Path'
-- leading to a non-'Nothing' 'node_value' in the given 'TreeMap',
-- with its value mapped by the given function.
flatten :: Ord k => (x -> y) -> TreeMap k x -> Map (Path k) y
flatten =
        flat_map []
        where
                flat_map :: Ord k
                 => [k] -> (x -> y)
                 -> TreeMap k x
                 -> Map (Path k) y
                flat_map p f (TreeMap m) =
                        Data.Map.unions $
                        (
                        Data.Map.mapKeysMonotonic (reverse . flip path p) $
                        Data.Map.mapMaybe (\Node{node_value=x} -> f <$> x) m
                        ) :
                        Data.Map.foldrWithKey
                         (\k -> (:) . flat_map (k:p) f . node_descendants)
                         [] m

-- * Filter

-- | Return the given 'TreeMap'
--   keeping only its non-'Nothing' 'node_value's
--   passing the given predicate.
filter :: Ord k => (x -> Bool) -> TreeMap k x -> TreeMap k x
filter f =
        map_Maybe_with_Path
         (\_p x -> if f x then Just x else Nothing)

-- | Like 'filter' but with also the current 'Path' given to the predicate.
filter_with_Path :: Ord k => (Path k -> x -> Bool) -> TreeMap k x -> TreeMap k x
filter_with_Path f =
        map_Maybe_with_Path
         (\p x -> if f p x then Just x else Nothing)

-- | Return the given 'TreeMap'
--   mapping its non-'Nothing' 'node_value's
--   and keeping only the non-'Nothing' results.
map_Maybe :: Ord k => (x -> Maybe y) -> TreeMap k x -> TreeMap k y
map_Maybe f = map_Maybe_with_Path (const f)

-- | Like 'map_Maybe' but with also the current 'Path' given to the predicate.
map_Maybe_with_Path :: Ord k => (Path k -> x -> Maybe y) -> TreeMap k x -> TreeMap k y
map_Maybe_with_Path =
        go []
        where
                go :: Ord k
                 => [k] -> (Path k -> x -> Maybe y)
                 -> TreeMap k x
                 -> TreeMap k y
                go p test (TreeMap m) =
                        TreeMap $
                        Data.Map.mapMaybeWithKey
                         (\k Node{node_value=v, node_descendants=ns} ->
                                let node_descendants = go (k:p) test ns in
                                let node_size = size node_descendants in
                                case v of
                                 Just x ->
                                        let node_value = test (reverse $ path k p) x in
                                        case node_value of
                                         Nothing | null node_descendants -> Nothing
                                         Nothing -> Just Node{node_value, node_descendants, node_size=1 + node_size}
                                         Just _  -> Just Node{node_value, node_descendants, node_size}
                                 _ ->
                                        if null node_descendants
                                        then Nothing
                                        else Just Node{node_value=Nothing, node_descendants, node_size}
                         ) m