- data Graph node
- graphFromVerticesAndAdjacency :: Ord key => [(node, key)] -> [(key, key)] -> Graph (node, key)
- graphFromEdgedVertices :: Ord key => [Node key payload] -> Graph (Node key payload)
- data SCC vertex
- = AcyclicSCC vertex
- | CyclicSCC [vertex]

- type Node key payload = (payload, key, [key])
- flattenSCC :: SCC a -> [a]
- flattenSCCs :: [SCC a] -> [a]
- stronglyConnCompG :: Graph node -> [SCC node]
- topologicalSortG :: Graph node -> [node]
- verticesG :: Graph node -> [node]
- edgesG :: Graph node -> [Edge node]
- hasVertexG :: Graph node -> node -> Bool
- reachableG :: Graph node -> node -> [node]
- transposeG :: Graph node -> Graph node
- outdegreeG :: Graph node -> node -> Maybe Int
- indegreeG :: Graph node -> node -> Maybe Int
- vertexGroupsG :: Graph node -> [[node]]
- emptyG :: Graph node -> Bool
- componentsG :: Graph node -> [[node]]
- findCycle :: forall payload key. Ord key => [Node key payload] -> Maybe [payload]
- stronglyConnCompFromEdgedVertices :: Ord key => [Node key payload] -> [SCC payload]
- stronglyConnCompFromEdgedVerticesR :: Ord key => [Node key payload] -> [SCC (Node key payload)]
- tabulate :: Bounds -> [Vertex] -> Table Int
- preArr :: Bounds -> Forest Vertex -> Table Int
- components :: IntGraph -> Forest Vertex
- undirected :: IntGraph -> IntGraph
- back :: IntGraph -> Table Int -> IntGraph
- cross :: IntGraph -> Table Int -> Table Int -> IntGraph
- forward :: IntGraph -> IntGraph -> Table Int -> IntGraph
- path :: IntGraph -> Vertex -> Vertex -> Bool
- bcc :: IntGraph -> Forest [Vertex]
- do_label :: IntGraph -> Table Int -> Tree Vertex -> Tree (Vertex, Int, Int)
- bicomps :: Tree (Vertex, Int, Int) -> Forest [Vertex]
- collect :: Tree (Vertex, Int, Int) -> (Int, Tree [Vertex])

# Documentation

Outputable node => Outputable (Graph node) |

graphFromVerticesAndAdjacency :: Ord key => [(node, key)] -> [(key, key)] -> Graph (node, key)Source

AcyclicSCC vertex | |

CyclicSCC [vertex] |

Functor SCC | |

PlatformOutputable a => PlatformOutputable (SCC a) | |

Outputable a => Outputable (SCC a) |

flattenSCC :: SCC a -> [a]Source

flattenSCCs :: [SCC a] -> [a]Source

stronglyConnCompG :: Graph node -> [SCC node]Source

topologicalSortG :: Graph node -> [node]Source

hasVertexG :: Graph node -> node -> BoolSource

reachableG :: Graph node -> node -> [node]Source

transposeG :: Graph node -> Graph nodeSource

outdegreeG :: Graph node -> node -> Maybe IntSource

vertexGroupsG :: Graph node -> [[node]]Source

componentsG :: Graph node -> [[node]]Source

findCycle :: forall payload key. Ord key => [Node key payload] -> Maybe [payload]Source

Find a reasonably short cycle a->b->c->a, in a strongly connected component. The input nodes are presumed to be a SCC, so you can start anywhere.

stronglyConnCompFromEdgedVertices :: Ord key => [Node key payload] -> [SCC payload]Source

stronglyConnCompFromEdgedVerticesR :: Ord key => [Node key payload] -> [SCC (Node key payload)]Source

components :: IntGraph -> Forest VertexSource

undirected :: IntGraph -> IntGraphSource