Maintainer | Ivan.Miljenovic@gmail.com |
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Defines algorithms that work on directed graphs.

- endNode :: Graph g => (g a b -> Node -> NGroup) -> g a b -> LNode a -> Bool
- endNode' :: Graph g => (g a b -> Node -> NGroup) -> g a b -> Node -> Bool
- endBy :: Graph g => (g a b -> Node -> NGroup) -> g a b -> LNGroup a
- endBy' :: Graph g => (g a b -> Node -> NGroup) -> g a b -> NGroup
- rootsOf :: Graph g => g a b -> LNGroup a
- rootsOf' :: Graph g => g a b -> NGroup
- isRoot :: Graph g => g a b -> LNode a -> Bool
- isRoot' :: Graph g => g a b -> Node -> Bool
- leavesOf :: Graph g => g a b -> LNGroup a
- leavesOf' :: Graph g => g a b -> NGroup
- isLeaf :: Graph g => g a b -> LNode a -> Bool
- isLeaf' :: Graph g => g a b -> Node -> Bool
- singletonsOf :: Graph g => g a b -> LNGroup a
- singletonsOf' :: Graph g => g a b -> NGroup
- isSingleton :: Graph g => g a b -> LNode a -> Bool
- isSingleton' :: Graph g => g a b -> Node -> Bool
- coreOf :: (DynGraph g, Eq a, Eq b) => g a b -> g a b
- levelGraph :: (Ord a, DynGraph g) => g a b -> g (GenCluster a) b
- levelGraphFrom :: (Ord a, DynGraph g) => NGroup -> g a b -> g (GenCluster a) b
- minLevel :: Int
- accessibleFrom :: Graph g => g a b -> [Node] -> [Node]
- accessibleFrom' :: Graph g => g a b -> Set Node -> Set Node
- accessibleOnlyFrom :: Graph g => g a b -> [Node] -> [Node]
- accessibleOnlyFrom' :: Graph g => g a b -> Set Node -> Set Node
- leafMinPaths :: Graph g => g a b -> [LNGroup a]
- leafMinPaths' :: Graph g => g a b -> [NGroup]

# Ending nodes

Find starting/ending nodes.

We define an ending node as one where, given a function:

f :: (Graph g) => g a b -> Node -> [Node]

the only allowed result is that node itself (to allow for loops).

endNode :: Graph g => (g a b -> Node -> NGroup) -> g a b -> LNode a -> BoolSource

Determine if this `LNode`

is an ending node.

endNode' :: Graph g => (g a b -> Node -> NGroup) -> g a b -> Node -> BoolSource

Determine if this `Node`

is an ending node.

endBy :: Graph g => (g a b -> Node -> NGroup) -> g a b -> LNGroup aSource

Find all `LNode`

s that meet the ending criteria.

endBy' :: Graph g => (g a b -> Node -> NGroup) -> g a b -> NGroupSource

Find all `Node`

s that match the ending criteria.

## Root nodes

## Leaf nodes

## Singleton nodes

singletonsOf :: Graph g => g a b -> LNGroup aSource

Find all singletons of the graph.

singletonsOf' :: Graph g => g a b -> NGroupSource

Find all singletons of the graph.

# Subgraphs

coreOf :: (DynGraph g, Eq a, Eq b) => g a b -> g a bSource

The *core* of the graph is the part of the graph containing all the
cycles, etc. Depending on the context, it could be interpreted as
the part of the graph where all the work is done.

# Clustering

levelGraph :: (Ord a, DynGraph g) => g a b -> g (GenCluster a) bSource

Cluster the nodes in the graph based upon how far away they are
from a root node. Root nodes are in the cluster labelled `minLevel`

,
nodes in level "n" (with `n > minLevel`

) are at least *n* edges away
from a root node.

levelGraphFrom :: (Ord a, DynGraph g) => NGroup -> g a b -> g (GenCluster a) bSource

As with `levelGraph`

but provide a custom grouping of `Node`

s to
consider as the "roots".

The level of the nodes in the `NGroup`

provided to
`levelGraphFrom`

(or the root nodes for `levelGraph`

). A level
less than this indicates that the node is not accessible.

# Node accessibility

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

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

# Other

leafMinPaths :: Graph g => g a b -> [LNGroup a]Source

The shortest paths to each of the leaves in the graph (excluding singletons). This can be used to obtain an indication of the overall height/depth of the graph.

leafMinPaths' :: Graph g => g a b -> [NGroup]Source

The shortest paths to each of the leaves in the graph (excluding singletons). This can be used to obtain an indication of the overall height/depth of the graph.