Class: RGL::BidirectionalAdjacencyGraph

Inherits:
DirectedAdjacencyGraph show all
Includes:
BidirectionalGraph
Defined in:
lib/rgl/bidirectional_adjacency.rb

Overview

This implementation of BidirectionalGraph creates an internal DirectedAdjacencyGraph to store the in-edges and overrides methods to ensure that the out and in graphs remain synchronized.

Instance Method Summary collapse

Constructor Details

#initialize(edgelist_class = Set, *other_graphs) ⇒ BidirectionalAdjacencyGraph

In super method the in edges are also added since #add_edge of this class also inserts edges in ‘@reverse`.



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# File 'lib/rgl/bidirectional_adjacency.rb', line 20

def initialize(edgelist_class = Set, *other_graphs)
  @reverse = DirectedAdjacencyGraph.new(edgelist_class)
  super(edgelist_class, *other_graphs)
end

Instance Method Details

#acyclic?Boolean Originally defined in module Graph

Returns true if the graph contains no cycles. This is only meaningful for directed graphs. Returns false for undirected graphs.

Returns:

  • (Boolean)

#add_edge(u, v) ⇒ Object



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# File 'lib/rgl/bidirectional_adjacency.rb', line 32

def add_edge(u, v)
  super(u, v)
  @reverse.add_edge(v, u)
end

#add_vertex(v) ⇒ Object



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# File 'lib/rgl/bidirectional_adjacency.rb', line 26

def add_vertex(v)
  super(v)
  @reverse.add_vertex(v)
end

#adjacent_vertices(v) ⇒ Array Originally defined in module Graph

Returns of vertices adjacent to vertex v.

Parameters:

  • v

    a vertex of the graph

Returns:

  • (Array)

    of vertices adjacent to vertex v.

#bellman_ford_shortest_paths(edge_weights_map, source, visitor = BellmanFordVisitor.new(self)) ⇒ Hash[Object,Array] Originally defined in module Graph

Finds the shortest paths from the source to each vertex of the graph.

Returns a Hash that maps each vertex of the graph to an Array of vertices that represents the shortest path from the source to the vertex. If the path doesn’t exist, the corresponding hash value is nil. For the source vertex returned hash contains a trivial one-vertex path - [source].

Unlike Dijkstra algorithm, Bellman-Ford shortest paths algorithm works with negative edge weights.

Raises ArgumentError if an edge weight is undefined.

Raises ArgumentError or the graph has negative-weight cycles. This behavior can be overridden my a custom handler for visitor’s edge_not_minimized event.

Returns:

  • (Hash[Object,Array])

#bfs_iterator(v = self.detect { |x| true }) ⇒ BFSIterator Originally defined in module Graph

Returns starting at vertex v.

Returns:

#bfs_search_tree_from(v) ⇒ DirectedAdjacencyGraph Originally defined in module Graph

This method uses the tree_edge_event of BFSIterator to record all tree edges of the search tree in the result.

Returns:

#bipartite?Boolean Originally defined in module Graph

Returns true if the graph is bipartite. Otherwise returns false.

Returns:

  • (Boolean)

#bipartite_setsArray Originally defined in module Graph

Separates graph’s vertices into two disjoint sets so that every edge of the graph connects vertices from different sets. If it’s possible, the graph is bipartite.

Returns an array of two disjoint vertices sets (represented as arrays) if the graph is bipartite. Otherwise, returns nil.

Returns:

  • (Array)

Raises:

#condensation_graphObject Originally defined in module Graph

Returns an ImplicitGraph where the strongly connected components of this graph are condensed into single nodes represented by Set instances containing the members of each strongly connected component. Edges between the different strongly connected components are preserved while edges within strongly connected components are omitted.

Raises NotDirectedError if run on an undirected graph.

Returns:

  • ImplicitGraph

Raises:

#degree(v) ⇒ int Originally defined in module BidirectionalGraph

Returns the number of in-edges plus out-edges (for directed graphs) or the number of incident edges (for undirected graphs) of vertex v.

Returns:

  • (int)

#depth_first_search(vis = DFSVisitor.new(self), &b) ⇒ Object Originally defined in module Graph

Do a recursive DFS search on the whole graph. If a block is passed, it is called on each finish_vertex event. See #strongly_connected_components for an example usage.

Note that this traversal does not garantee, that roots are at the top of each spanning subtree induced by the DFS search on a directed graph (see also the discussion in issue #20).

See Also:

#depth_first_visit(u, vis = DFSVisitor.new(self), &b) ⇒ Object Originally defined in module Graph

Start a depth first search at vertex u. The block b is called on each finish_vertex event.

See Also:

#dfs_iterator(v = self.detect { |x| true }) ⇒ DFSIterator Originally defined in module Graph

Returns staring at vertex v.

Returns:

#dijkstra_shortest_path(edge_weights_map, source, target, visitor = DijkstraVisitor.new(self)) ⇒ Object Originally defined in module Graph

Finds the shortest path from the source to the target in the graph.

If the path exists, returns it as an Array of vertices. Otherwise, returns nil.

Raises ArgumentError if edge weight is negative or undefined.

#dijkstra_shortest_paths(edge_weights_map, source, visitor = DijkstraVisitor.new(self)) ⇒ Object Originally defined in module Graph

Finds the shortest paths from the source to each vertex of the graph.

Returns a Hash that maps each vertex of the graph to an Array of vertices that represents the shortest path from the source to the vertex. If the path doesn’t exist, the corresponding hash value is nil. For the source vertex returned hash contains a trivial one-vertex path - [source].

Raises ArgumentError if edge weight is negative or undefined.

#directed?Boolean Originally defined in module Graph

Is the graph directed? The default returns false.

Returns:

  • (Boolean)

#dotty(params = {}) ⇒ Object Originally defined in module Graph

Call dotty for the graph which is written to the file ‘graph.dot’ in the current directory.

#each(&block) ⇒ Object Originally defined in module Graph

Vertices get enumerated. A graph is thus an enumerable of vertices.

#each_adjacent(v, &block) ⇒ Object Originally defined in module Graph

The each_adjacent iterator defines the out edges of vertex v. This method must be defined by concrete graph classes. Its defines the BGL IncidenceGraph concept.

Parameters:

  • v

    a vertex of the graph

Raises:

  • (NotImplementedError)

#each_connected_component {|comp| ... } ⇒ Object Originally defined in module Graph

Compute the connected components of an undirected graph, using a DFS (Depth-first search)-based approach. A _connected component_ of an undirected graph is a set of vertices that are all reachable from each other.

The function is implemented as an iterator which calls the client with an array of vertices for each component.

It raises an exception if the graph is directed.

Yields:

  • (comp)

Raises:

#each_edge(&block) ⇒ Object Originally defined in module Graph

The each_edge iterator should provide efficient access to all edges of the graph. Its defines the BGL EdgeListGraph concept.

This method must not be defined by concrete graph classes, because it can be implemented using #each_vertex and #each_adjacent. However for undirected graphs the function is inefficient because we must not yield (v,u) if we already visited edge (u,v).

#each_in_neighbor(v, &b) ⇒ Object



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# File 'lib/rgl/bidirectional_adjacency.rb', line 57

def each_in_neighbor(v, &b)
  @reverse.each_adjacent(v, &b)
end

#each_vertex(&block) ⇒ Object Originally defined in module Graph

The each_vertex iterator defines the set of vertices of the graph. This method must be defined by concrete graph classes. It defines the BGL VertexListGraph concept.

Raises:

  • (NotImplementedError)

#edge_classClass Originally defined in module Graph

Returns the class for edges: Edge::DirectedEdge or Edge::UnDirectedEdge.

Returns:

#edgesArray Originally defined in module Graph

It uses #each_edge to compute the edges

Returns:

  • (Array)

    of edges (DirectedEdge or UnDirectedEdge) of the graph

#edges_filtered_by(&filter) ⇒ ImplicitGraph Originally defined in module Graph

Returns a new ImplicitGraph which has as edges all edges of the receiver which satisfy the predicate filter (a block with two parameters).

Examples:


g = complete(7).edges_filtered_by { |u,v| u+v == 7 }
g.to_s     => "(1=6)(2=5)(3=4)"
g.vertices => [1, 2, 3, 4, 5, 6, 7]

Returns:

#empty?Boolean Originally defined in module Graph

Returns true if the graph has no vertices, i.e. num_vertices == 0.

Returns:

  • (Boolean)

#eql?(other) ⇒ Boolean Also known as: == Originally defined in module Graph

Two graphs are equal iff they have equal directed? property as well as vertices and edges sets.

Parameters:

Returns:

  • (Boolean)

#has_edge?(u, v) ⇒ Boolean Originally defined in module Graph

Returns true if (u, v) is an edge of the graph.

Returns:

  • (Boolean)

#has_in_edge?(u, v) ⇒ Boolean

Returns:

  • (Boolean)

See Also:



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# File 'lib/rgl/bidirectional_adjacency.rb', line 50

def has_in_edge?(u, v)
  @reverse.has_edge?(u, v)
end

#has_vertex?(v) ⇒ Boolean Originally defined in module Graph

Returns true if v is a vertex of the graph. Same as #include? inherited from Enumerable. Complexity is O(num_vertices) by default. Concrete graph may be better here (see AdjacencyGraph).

Parameters:

  • v

    a vertex of the graph

Returns:

  • (Boolean)

#implicit_graph {|result| ... } ⇒ ImplicitGraph Originally defined in module Graph

Return a new ImplicitGraph which is isomorphic (i.e. has same edges and vertices) to the receiver. It is a shortcut, also used by #edges_filtered_by and #vertices_filtered_by.

Yields:

  • (result)

Returns:

#in_degree(v) ⇒ int

Returns the number of in-edges (for directed graphs) or the number of incident edges (for undirected graphs) of vertex v.

Returns:

  • (int)


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# File 'lib/rgl/bidirectional_adjacency.rb', line 70

def in_degree(v)
  @reverse.out_degree(v)
end

#in_neighbors(v) ⇒ Object



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# File 'lib/rgl/bidirectional_adjacency.rb', line 63

def in_neighbors(v)
  @reverse.adjacent_vertices(v)
end

#maximum_flow(edge_capacities_map, source, sink) ⇒ Hash Originally defined in module Graph

Finds the maximum flow from the source to the sink in the graph.

Returns flows map as a hash that maps each edge of the graph to a flow through that edge that is required to reach the maximum total flow.

For the method to work, the graph should be first altered so that for each directed edge (u, v) it contains reverse edge (u, v). Capacities of the primary edges should be non-negative, while reverse edges should have zero capacity.

Raises ArgumentError if the graph is not directed.

Raises ArgumentError if a reverse edge is missing, edge capacity is missing, an edge has negative capacity, or a reverse edge has positive capacity.

Returns:

  • (Hash)

#num_edgesint Originally defined in module Graph

Returns the number of edges.

Returns:

  • (int)

    the number of edges

#out_degree(v) ⇒ int Originally defined in module Graph

Returns the number of out-edges (for directed graphs) or the number of incident edges (for undirected graphs) of vertex v.

Parameters:

  • v

    a vertex of the graph

Returns:

  • (int)

#path?(source, target) ⇒ Boolean Originally defined in module Graph

Checks whether a path exists between source and target vertices in the graph.

Returns:

  • (Boolean)

#prim_minimum_spanning_tree(edge_weights_map, start_vertex = nil, visitor = DijkstraVisitor.new(self)) ⇒ Object Originally defined in module Graph

Finds the minimum spanning tree of the graph.

Returns an AdjacencyGraph that represents the minimum spanning tree of the graph’s connectivity component that contains the starting vertex. The algorithm starts from an arbitrary vertex if the start_vertex is not given. Since the implementation relies on the Dijkstra’s algorithm, Prim’s algorithm uses the same visitor class and emits the same events.

Raises ArgumentError if edge weight is undefined.

Output the DOT-graph to stream s.

#remove_edge(u, v) ⇒ Object

See Also:

  • MutableGraph::remove_edge.


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# File 'lib/rgl/bidirectional_adjacency.rb', line 44

def remove_edge(u, v)
  super(u, v)
  @reverse.remove_edge(v, u)
end

#remove_vertex(v) ⇒ Object



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# File 'lib/rgl/bidirectional_adjacency.rb', line 38

def remove_vertex(v)
  super(v)
  @reverse.remove_vertex(v)
end

#reverseDirectedAdjacencyGraph Originally defined in module Graph

Return a new DirectedAdjacencyGraph which has the same set of vertices. If (u,v) is an edge of the graph, then (v,u) is an edge of the result.

If the graph is undirected, the result is self.

#set_edge_options(u, v, **options) ⇒ Object Originally defined in module Graph

Set the configuration values for the given edge

#set_vertex_options(vertex, **options) ⇒ Object Originally defined in module Graph

Set the configuration values for the given vertex

#sizeint Also known as: num_vertices Originally defined in module Graph

Returns the number of vertices.

Returns:

  • (int)

    the number of vertices

#strongly_connected_componentsTarjanSccVisitor Originally defined in module Graph

This is Tarjan’s algorithm for strongly connected components, from his paper “Depth first search and linear graph algorithms”. It calculates the components in a single application of DFS. We implement the algorithm with the help of the DFSVisitor TarjanSccVisitor.

Definition

A _strongly connected component_ of a directed graph G=(V,E) is a maximal set of vertices U which is in V, such that for every pair of vertices u and v in U, we have both a path from u to v and a path from v to u. That is to say, u and v are reachable from each other.

@Article{Tarjan:1972:DFS,

author =       "R. E. Tarjan",
key =          "Tarjan",
title =        "Depth First Search and Linear Graph Algorithms",
journal =      "SIAM Journal on Computing",
volume =       "1",
number =       "2",
pages =        "146--160",
month =        jun,
year =         "1972",
CODEN =        "SMJCAT",
ISSN =         "0097-5397 (print), 1095-7111 (electronic)",
bibdate =      "Thu Jan 23 09:56:44 1997",
bibsource =    "Parallel/Multi.bib, Misc/Reverse.eng.bib",

}

The output of the algorithm is recorded in a TarjanSccVisitor vis. vis.comp_map will contain numbers giving the component ID assigned to each vertex. The number of components is vis.num_comp.

Returns:

Raises:

#to_adjacencyDirectedAdjacencyGraph Originally defined in module Graph

Convert a general graph to an AdjacencyGraph. If the graph is directed, returns a DirectedAdjacencyGraph; otherwise, returns an AdjacencyGraph.

#to_dot_graph(params = {}) ⇒ Object Originally defined in module Graph

Return a DOT::Digraph for directed graphs or a DOT::Graph for an undirected RGL::Graph. params can contain any graph property specified in rdot.rb.

#to_sString Originally defined in module Graph

Utility method to show a string representation of the edges of the graph.

Returns:

  • (String)

#to_undirectedAdjacencyGraph Originally defined in module Graph

Return a new AdjacencyGraph which has the same set of vertices. If (u,v) is an edge of the graph, then (u,v) and (v,u) (which are the same edges) are edges of the result.

If the graph is undirected, the result is self.

Returns:

#topsort_iteratorTopsortIterator Originally defined in module Graph

Returns for the graph.

Returns:

#transitive_closureObject Originally defined in module Graph

Returns an DirectedAdjacencyGraph which is the transitive closure of this graph. Meaning, for each path u -> … -> v in this graph, the path is copied and the edge u -> v is added. This method supports working with cyclic graphs by ensuring that edges are created between every pair of vertices in the cycle, including self-referencing edges.

This method should run in O(|V||E|) time, where |V| and |E| are the number of vertices and edges respectively.

Raises NotDirectedError if run on an undirected graph.

Returns:

  • DirectedAdjacencyGraph

Raises:

#transitive_reductionObject Originally defined in module Graph

Returns an DirectedAdjacencyGraph which is the transitive reduction of this graph. Meaning, that each edge u -> v is omitted if path u -> … -> v exists. This method supports working with cyclic graphs; however, cycles are arbitrarily simplified which may lead to variant, although equally valid, results on equivalent graphs.

This method should run in O(|V||E|) time, where |V| and |E| are the number of vertices and edges respectively.

Raises NotDirectedError if run on an undirected graph.

Returns:

  • DirectedAdjacencyGraph

Raises:

#vertex_id(v) ⇒ Object Originally defined in module Graph

#vertex_label(v) ⇒ Object Originally defined in module Graph

Returns a label for vertex v. Default is v.to_s

#verticesArray Originally defined in module Graph

Synonym for #to_a inherited by Enumerable.

Returns:

  • (Array)

    of vertices

#vertices_filtered_by(&filter) ⇒ ImplicitGraph Originally defined in module Graph

Returns a new ImplicitGraph which has as vertices all vertices of the receiver which satisfy the predicate filter.

The methods provides similar functionality as BGLs Filtered Graph

Examples:


def complete (n)
  set = n.integer? ? (1..n) : n
  RGL::ImplicitGraph.new do |g|
    g.vertex_iterator { |b| set.each(&b) }
    g.adjacent_iterator do |x, b|
      set.each { |y| b.call(y) unless x == y }
    end
  end
end

complete(4).to_s # => "(1=2)(1=3)(1=4)(2=3)(2=4)(3=4)"
complete(4).vertices_filtered_by { |v| v != 4 }.to_s # => "(1=2)(1=3)(2=3)"

Returns:

#write_to_graphic_file(fmt = 'png', dotfile = "graph", options = {}) ⇒ Object Originally defined in module Graph

Use dot to create a graphical representation of the graph. Returns the filename of the graphics file.