Maintainer | Ivan.Miljenovic@gmail.com |
---|---|

Safe Haskell | None |

Defines algorithms that work on both undirected and directed graphs.

- componentsOf :: DynGraph g => g a b -> [g a b]
- pathTree :: DynGraph g => Decomp g a b -> [NGroup]
- cliquesIn :: DynGraph g => g a b -> [[LNode a]]
- cliquesIn' :: DynGraph g => g a b -> [NGroup]
- findRegular :: Graph g => g a b -> [[Node]]
- isRegular :: Graph g => g a b -> NGroup -> Bool
- cyclesIn :: DynGraph g => g a b -> [LNGroup a]
- cyclesIn' :: DynGraph g => g a b -> [NGroup]
- uniqueCycles :: DynGraph g => g a b -> [LNGroup a]
- uniqueCycles' :: DynGraph g => g a b -> [NGroup]
- chainsIn :: (DynGraph g, Eq b) => g a b -> [LNGroup a]
- chainsIn' :: (DynGraph g, Eq b) => g a b -> [NGroup]

# Graph decomposition

Finding connected components.

Whilst the FGL library does indeed have a function `components`

that returns the connected components of a graph, it returns each
component as a list of `Node`

s. This implementation instead
returns each component as a *graph*, which is much more useful.

Connected components are found by choosing a random node, then recursively extracting all neighbours of that node until no more nodes can be removed.

Note that for directed graphs, these are known as the *weakly*
connected components.

componentsOf :: DynGraph g => g a b -> [g a b]Source

Find all connected components of a graph.

pathTree :: DynGraph g => Decomp g a b -> [NGroup]Source

Find all possible paths from this given node, avoiding loops, cycles, etc.

# Clique Detection

Clique detection routines. Find cliques by taking out a node, and
seeing which other nodes are all common neighbours (by both `pre`

and `suc`

).

cliquesIn :: DynGraph g => g a b -> [[LNode a]]Source

Finds all cliques (i.e. maximal complete subgraphs) in the given graph.

cliquesIn' :: DynGraph g => g a b -> [NGroup]Source

Finds all cliques in the graph, without including labels.

findRegular :: Graph g => g a b -> [[Node]]Source

Find all regular subgraphs of the given graph.

isRegular :: Graph g => g a b -> NGroup -> BoolSource

Determines if the list of nodes represents a regular subgraph.

# Cycle Detection

Cycle detection. Find cycles by finding all paths from a given node, and seeing if it reaches itself again.

cyclesIn' :: DynGraph g => g a b -> [NGroup]Source

Find all cycles in the given graph, returning just the nodes.

uniqueCycles :: DynGraph g => g a b -> [LNGroup a]Source

Find all cycles in the given graph, excluding those that are also cliques.

uniqueCycles' :: DynGraph g => g a b -> [NGroup]Source

Find all cycles in the given graph, excluding those that are also cliques.

# Chain detection

A chain is a path in a graph where for each interior node, there is exactly one predecessor and one successor node, i.e. that part of the graph forms a "straight line". Furthermore, the initial node should have only one successor, and the final node should have only one predecessor. Chains are found by recursively finding the next successor in the chain, until either a leaf node is reached or no more nodes match the criteria.