module Distribution.Compat.Graph (
Graph,
IsNode(..),
null,
size,
member,
lookup,
empty,
insert,
deleteKey,
deleteLookup,
unionLeft,
unionRight,
stronglyConnComp,
SCC(..),
cycles,
broken,
neighbors,
revNeighbors,
closure,
revClosure,
topSort,
revTopSort,
toMap,
fromDistinctList,
toList,
keys,
keysSet,
toGraph,
Node(..),
nodeValue,
) where
import Distribution.Compat.Prelude hiding (empty, lookup, null, toList)
import Prelude ()
import Data.Array ((!))
import Data.Graph (SCC (..))
import Distribution.Utils.Structured (Structure (..), Structured (..))
import qualified Data.Array as Array
import qualified Data.Foldable as Foldable
import qualified Data.Graph as G
import qualified Data.Map.Strict as Map
import qualified Data.Set as Set
import qualified Data.Tree as Tree
import qualified Distribution.Compat.Prelude as Prelude
data Graph a
= Graph {
graphMap :: !(Map (Key a) a),
graphForward :: G.Graph,
graphAdjoint :: G.Graph,
graphVertexToNode :: G.Vertex -> a,
graphKeyToVertex :: Key a -> Maybe G.Vertex,
graphBroken :: [(a, [Key a])]
}
deriving (Typeable)
instance Show a => Show (Graph a) where
show = show . toList
instance (IsNode a, Read a, Show (Key a)) => Read (Graph a) where
readsPrec d s = map (\(a,r) -> (fromDistinctList a, r)) (readsPrec d s)
instance (IsNode a, Binary a, Show (Key a)) => Binary (Graph a) where
put x = put (toList x)
get = fmap fromDistinctList get
instance Structured a => Structured (Graph a) where
structure p = Nominal (typeRep p) 0 "Graph" [structure (Proxy :: Proxy a)]
instance (Eq (Key a), Eq a) => Eq (Graph a) where
g1 == g2 = graphMap g1 == graphMap g2
instance Foldable.Foldable Graph where
fold = Foldable.fold . graphMap
foldr f z = Foldable.foldr f z . graphMap
foldl f z = Foldable.foldl f z . graphMap
foldMap f = Foldable.foldMap f . graphMap
foldl' f z = Foldable.foldl' f z . graphMap
foldr' f z = Foldable.foldr' f z . graphMap
#ifdef MIN_VERSION_base
#if MIN_VERSION_base(4,8,0)
length = Foldable.length . graphMap
null = Foldable.null . graphMap
toList = Foldable.toList . graphMap
elem x = Foldable.elem x . graphMap
maximum = Foldable.maximum . graphMap
minimum = Foldable.minimum . graphMap
sum = Foldable.sum . graphMap
product = Foldable.product . graphMap
#endif
#endif
instance (NFData a, NFData (Key a)) => NFData (Graph a) where
rnf Graph {
graphMap = m,
graphForward = gf,
graphAdjoint = ga,
graphVertexToNode = vtn,
graphKeyToVertex = ktv,
graphBroken = b
} = gf `seq` ga `seq` vtn `seq` ktv `seq` b `seq` rnf m
class Ord (Key a) => IsNode a where
type Key a
nodeKey :: a -> Key a
nodeNeighbors :: a -> [Key a]
instance (IsNode a, IsNode b, Key a ~ Key b) => IsNode (Either a b) where
type Key (Either a b) = Key a
nodeKey (Left x) = nodeKey x
nodeKey (Right x) = nodeKey x
nodeNeighbors (Left x) = nodeNeighbors x
nodeNeighbors (Right x) = nodeNeighbors x
data Node k a = N a k [k]
deriving (Show, Eq)
nodeValue :: Node k a -> a
nodeValue (N a _ _) = a
instance Functor (Node k) where
fmap f (N a k ks) = N (f a) k ks
instance Ord k => IsNode (Node k a) where
type Key (Node k a) = k
nodeKey (N _ k _) = k
nodeNeighbors (N _ _ ks) = ks
null :: Graph a -> Bool
null = Map.null . toMap
size :: Graph a -> Int
size = Map.size . toMap
member :: IsNode a => Key a -> Graph a -> Bool
member k g = Map.member k (toMap g)
lookup :: IsNode a => Key a -> Graph a -> Maybe a
lookup k g = Map.lookup k (toMap g)
empty :: IsNode a => Graph a
empty = fromMap Map.empty
insert :: IsNode a => a -> Graph a -> Graph a
insert !n g = fromMap (Map.insert (nodeKey n) n (toMap g))
deleteKey :: IsNode a => Key a -> Graph a -> Graph a
deleteKey k g = fromMap (Map.delete k (toMap g))
deleteLookup :: IsNode a => Key a -> Graph a -> (Maybe a, Graph a)
deleteLookup k g =
let (r, m') = Map.updateLookupWithKey (\_ _ -> Nothing) k (toMap g)
in (r, fromMap m')
unionRight :: IsNode a => Graph a -> Graph a -> Graph a
unionRight g g' = fromMap (Map.union (toMap g') (toMap g))
unionLeft :: IsNode a => Graph a -> Graph a -> Graph a
unionLeft = flip unionRight
stronglyConnComp :: Graph a -> [SCC a]
stronglyConnComp g = map decode forest
where
forest = G.scc (graphForward g)
decode (Tree.Node v [])
| mentions_itself v = CyclicSCC [graphVertexToNode g v]
| otherwise = AcyclicSCC (graphVertexToNode g v)
decode other = CyclicSCC (dec other [])
where dec (Tree.Node v ts) vs
= graphVertexToNode g v : foldr dec vs ts
mentions_itself v = v `elem` (graphForward g ! v)
cycles :: Graph a -> [[a]]
cycles g = [ vs | CyclicSCC vs <- stronglyConnComp g ]
broken :: Graph a -> [(a, [Key a])]
broken g = graphBroken g
neighbors :: Graph a -> Key a -> Maybe [a]
neighbors g k = do
v <- graphKeyToVertex g k
return (map (graphVertexToNode g) (graphForward g ! v))
revNeighbors :: Graph a -> Key a -> Maybe [a]
revNeighbors g k = do
v <- graphKeyToVertex g k
return (map (graphVertexToNode g) (graphAdjoint g ! v))
closure :: Graph a -> [Key a] -> Maybe [a]
closure g ks = do
vs <- traverse (graphKeyToVertex g) ks
return (decodeVertexForest g (G.dfs (graphForward g) vs))
revClosure :: Graph a -> [Key a] -> Maybe [a]
revClosure g ks = do
vs <- traverse (graphKeyToVertex g) ks
return (decodeVertexForest g (G.dfs (graphAdjoint g) vs))
flattenForest :: Tree.Forest a -> [a]
flattenForest = concatMap Tree.flatten
decodeVertexForest :: Graph a -> Tree.Forest G.Vertex -> [a]
decodeVertexForest g = map (graphVertexToNode g) . flattenForest
topSort :: Graph a -> [a]
topSort g = map (graphVertexToNode g) $ G.topSort (graphForward g)
revTopSort :: Graph a -> [a]
revTopSort g = map (graphVertexToNode g) $ G.topSort (graphAdjoint g)
fromMap :: IsNode a => Map (Key a) a -> Graph a
fromMap m
= Graph { graphMap = m
, graphForward = g
, graphAdjoint = G.transposeG g
, graphVertexToNode = vertex_to_node
, graphKeyToVertex = key_to_vertex
, graphBroken = broke
}
where
try_key_to_vertex k = maybe (Left k) Right (key_to_vertex k)
(brokenEdges, edges)
= unzip
$ [ partitionEithers (map try_key_to_vertex (nodeNeighbors n))
| n <- ns ]
broke = filter (not . Prelude.null . snd) (zip ns brokenEdges)
g = Array.listArray bounds edges
ns = Map.elems m
vertices = zip (map nodeKey ns) [0..]
vertex_map = Map.fromAscList vertices
key_to_vertex k = Map.lookup k vertex_map
vertex_to_node vertex = nodeTable ! vertex
nodeTable = Array.listArray bounds ns
bounds = (0, Map.size m 1)
fromDistinctList :: (IsNode a, Show (Key a)) => [a] -> Graph a
fromDistinctList = fromMap
. Map.fromListWith (\_ -> duplicateError)
. map (\n -> n `seq` (nodeKey n, n))
where
duplicateError n = error $ "Graph.fromDistinctList: duplicate key: "
++ show (nodeKey n)
toList :: Graph a -> [a]
toList g = Map.elems (toMap g)
keys :: Graph a -> [Key a]
keys g = Map.keys (toMap g)
keysSet :: Graph a -> Set.Set (Key a)
keysSet g = Map.keysSet (toMap g)
toMap :: Graph a -> Map (Key a) a
toMap = graphMap
toGraph :: Graph a -> (G.Graph, G.Vertex -> a, Key a -> Maybe G.Vertex)
toGraph g = (graphForward g, graphVertexToNode g, graphKeyToVertex g)