Portability | portable |
---|---|

Stability | experimental |

Maintainer | libraries@haskell.org |

A version of the graph algorithms described in:

*Lazy Depth-First Search and Linear Graph Algorithms in Haskell*,
by David King and John Launchbury.

- stronglyConnComp :: Ord key => [(node, key, [key])] -> [SCC node]
- stronglyConnCompR :: Ord key => [(node, key, [key])] -> [SCC (node, key, [key])]
- data SCC vertex
- = AcyclicSCC vertex
- | CyclicSCC [vertex]

- flattenSCC :: SCC vertex -> [vertex]
- flattenSCCs :: [SCC a] -> [a]
- type Graph = Table [Vertex]
- type Table a = Array Vertex a
- type Bounds = (Vertex, Vertex)
- type Edge = (Vertex, Vertex)
- type Vertex = Int
- graphFromEdges :: Ord key => [(node, key, [key])] -> (Graph, Vertex -> (node, key, [key]), key -> Maybe Vertex)
- graphFromEdges' :: Ord key => [(node, key, [key])] -> (Graph, Vertex -> (node, key, [key]))
- buildG :: Bounds -> [Edge] -> Graph
- transposeG :: Graph -> Graph
- vertices :: Graph -> [Vertex]
- edges :: Graph -> [Edge]
- outdegree :: Graph -> Table Int
- indegree :: Graph -> Table Int
- dfs :: Graph -> [Vertex] -> Forest Vertex
- dff :: Graph -> Forest Vertex
- topSort :: Graph -> [Vertex]
- components :: Graph -> Forest Vertex
- scc :: Graph -> Forest Vertex
- bcc :: Graph -> Forest [Vertex]
- reachable :: Graph -> Vertex -> [Vertex]
- path :: Graph -> Vertex -> Vertex -> Bool
- module Data.Tree

# External interface

:: Ord key | |

=> [(node, key, [key])] | The graph: a list of nodes uniquely identified by keys, with a list of keys of nodes this node has edges to. The out-list may contain keys that don't correspond to nodes of the graph; such edges are ignored. |

-> [SCC node] |

The strongly connected components of a directed graph, topologically sorted.

:: Ord key | |

=> [(node, key, [key])] | The graph: a list of nodes uniquely identified by keys, with a list of keys of nodes this node has edges to. The out-list may contain keys that don't correspond to nodes of the graph; such edges are ignored. |

-> [SCC (node, key, [key])] | Topologically sorted |

The strongly connected components of a directed graph, topologically
sorted. The function is the same as `stronglyConnComp`

, except that
all the information about each node retained.
This interface is used when you expect to apply `SCC`

to
(some of) the result of `SCC`

, so you don't want to lose the
dependency information.

Strongly connected component.

AcyclicSCC vertex | A single vertex that is not in any cycle. |

CyclicSCC [vertex] | A maximal set of mutually reachable vertices. |

flattenSCC :: SCC vertex -> [vertex]Source

The vertices of a strongly connected component.

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

The vertices of a list of strongly connected components.

# Graphs

type Graph = Table [Vertex]Source

Adjacency list representation of a graph, mapping each vertex to its list of successors.

## Building graphs

graphFromEdges :: Ord key => [(node, key, [key])] -> (Graph, Vertex -> (node, key, [key]), key -> Maybe Vertex)Source

Build a graph from a list of nodes uniquely identified by keys, with a list of keys of nodes this node should have edges to. The out-list may contain keys that don't correspond to nodes of the graph; they are ignored.

graphFromEdges' :: Ord key => [(node, key, [key])] -> (Graph, Vertex -> (node, key, [key]))Source

Identical to `graphFromEdges`

, except that the return value
does not include the function which maps keys to vertices. This
version of `graphFromEdges`

is for backwards compatibility.

transposeG :: Graph -> GraphSource

The graph obtained by reversing all edges.

## Graph properties

# Algorithms

dfs :: Graph -> [Vertex] -> Forest VertexSource

A spanning forest of the part of the graph reachable from the listed vertices, obtained from a depth-first search of the graph starting at each of the listed vertices in order.

dff :: Graph -> Forest VertexSource

A spanning forest of the graph, obtained from a depth-first search of the graph starting from each vertex in an unspecified order.

topSort :: Graph -> [Vertex]Source

A topological sort of the graph.
The order is partially specified by the condition that a vertex *i*
precedes *j* whenever *j* is reachable from *i* but not vice versa.

components :: Graph -> Forest VertexSource

The connected components of a graph. Two vertices are connected if there is a path between them, traversing edges in either direction.

bcc :: Graph -> Forest [Vertex]Source

The biconnected components of a graph. An undirected graph is biconnected if the deletion of any vertex leaves it connected.

module Data.Tree