HTCDag¶
- class lsst.ctrl.bps.htcondor.HTCDag(data=None, name='')¶
Bases:
DiGraph
HTCondor DAG.
- Parameters:
- datanetworkx.DiGraph.data
Initial graph.
- name
str
Name for DAG.
Attributes Summary
Graph adjacency object holding the neighbors of each node.
A DegreeView for the Graph as G.degree or G.degree().
An OutEdgeView of the DiGraph as G.edges or G.edges().
An InDegreeView for (node, in_degree) or in_degree for single node.
A view of the in edges of the graph as G.in_edges or G.in_edges().
String identifier of the graph.
A NodeView of the Graph as G.nodes or G.nodes().
An OutDegreeView for (node, out_degree)
An OutEdgeView of the DiGraph as G.edges or G.edges().
Graph adjacency object holding the predecessors of each node.
Graph adjacency object holding the successors of each node.
Methods Summary
add_attribs
([attribs])Add attributes to the DAG.
add_edge
(u_of_edge, v_of_edge, **attr)Add an edge between u and v.
add_edges_from
(ebunch_to_add, **attr)Add all the edges in ebunch_to_add.
add_final_job
(job)Add an HTCJob for the FINAL job in HTCDag.
add_job
(job[, parent_names, child_names])Add an HTCJob to the HTCDag.
add_job_relationships
(parents, children)Add DAG edge between parents and children jobs.
add_node
(node_for_adding, **attr)Add a single node
node_for_adding
and update node attributes.add_nodes_from
(nodes_for_adding, **attr)Add multiple nodes.
add_weighted_edges_from
(ebunch_to_add[, weight])Add weighted edges in
ebunch_to_add
with specified weight attrReturns an iterator over (node, adjacency dict) tuples for all nodes.
clear
()Remove all nodes and edges from the graph.
Remove all edges from the graph without altering nodes.
copy
([as_view])Returns a copy of the graph.
del_job
(job_name)Delete the job from the DAG.
dump
(fh)Dump DAG info to output stream.
edge_subgraph
(edges)Returns the subgraph induced by the specified edges.
get_edge_data
(u, v[, default])Returns the attribute dictionary associated with edge (u, v).
has_edge
(u, v)Returns True if the edge (u, v) is in the graph.
has_node
(n)Returns True if the graph contains the node n.
has_predecessor
(u, v)Returns True if node u has predecessor v.
has_successor
(u, v)Returns True if node u has successor v.
Returns True if graph is directed, False otherwise.
Returns True if graph is a multigraph, False otherwise.
nbunch_iter
([nbunch])Returns an iterator over nodes contained in nbunch that are also in the graph.
neighbors
(n)Returns an iterator over successor nodes of n.
number_of_edges
([u, v])Returns the number of edges between two nodes.
Returns the number of nodes in the graph.
order
()Returns the number of nodes in the graph.
predecessors
(n)Returns an iterator over predecessor nodes of n.
remove_edge
(u, v)Remove the edge between u and v.
remove_edges_from
(ebunch)Remove all edges specified in ebunch.
remove_node
(n)Remove node n.
remove_nodes_from
(nodes)Remove multiple nodes.
reverse
([copy])Returns the reverse of the graph.
size
([weight])Returns the number of edges or total of all edge weights.
subgraph
(nodes)Returns a SubGraph view of the subgraph induced on
nodes
.successors
(n)Returns an iterator over successor nodes of n.
to_directed
([as_view])Returns a directed representation of the graph.
Returns the class to use for empty directed copies.
to_undirected
([reciprocal, as_view])Returns an undirected representation of the digraph.
Returns the class to use for empty undirected copies.
update
([edges, nodes])Update the graph using nodes/edges/graphs as input.
write
(submit_path[, job_subdir])Write DAG to a file.
write_dot
(filename)Write a dot version of the DAG.
Attributes Documentation
- adj¶
Graph adjacency object holding the neighbors of each node.
This object is a read-only dict-like structure with node keys and neighbor-dict values. The neighbor-dict is keyed by neighbor to the edge-data-dict. So
G.adj[3][2]['color'] = 'blue'
sets the color of the edge(3, 2)
to"blue"
.Iterating over G.adj behaves like a dict. Useful idioms include
for nbr, datadict in G.adj[n].items():
.The neighbor information is also provided by subscripting the graph. So
for nbr, foovalue in G[node].data('foo', default=1):
works.For directed graphs,
G.adj
holds outgoing (successor) info.
- degree¶
A DegreeView for the Graph as G.degree or G.degree().
The node degree is the number of edges adjacent to the node. The weighted node degree is the sum of the edge weights for edges incident to that node.
This object provides an iterator for (node, degree) as well as lookup for the degree for a single node.
- Parameters:
- nbunchsingle node, container, or all nodes (default= all nodes)
The view will only report edges incident to these nodes.
- weightstring or None, optional (default=None)
The name of an edge attribute that holds the numerical value used as a weight. If None, then each edge has weight 1. The degree is the sum of the edge weights adjacent to the node.
- Returns:
- DiDegreeView or int
If multiple nodes are requested (the default), returns a
DiDegreeView
mapping nodes to their degree. If a single node is requested, returns the degree of the node as an integer.
See also
Examples
>>> G = nx.DiGraph() # or MultiDiGraph >>> nx.add_path(G, [0, 1, 2, 3]) >>> G.degree(0) # node 0 with degree 1 1 >>> list(G.degree([0, 1, 2])) [(0, 1), (1, 2), (2, 2)]
- edges¶
An OutEdgeView of the DiGraph as G.edges or G.edges().
edges(self, nbunch=None, data=False, default=None)
The OutEdgeView provides set-like operations on the edge-tuples as well as edge attribute lookup. When called, it also provides an EdgeDataView object which allows control of access to edge attributes (but does not provide set-like operations). Hence,
G.edges[u, v]['color']
provides the value of the color attribute for edge(u, v)
whilefor (u, v, c) in G.edges.data('color', default='red'):
iterates through all the edges yielding the color attribute with default'red'
if no color attribute exists.- Parameters:
- nbunchsingle node, container, or all nodes (default= all nodes)
The view will only report edges from these nodes.
- datastring or bool, optional (default=False)
The edge attribute returned in 3-tuple (u, v, ddict[data]). If True, return edge attribute dict in 3-tuple (u, v, ddict). If False, return 2-tuple (u, v).
- defaultvalue, optional (default=None)
Value used for edges that don’t have the requested attribute. Only relevant if data is not True or False.
- Returns:
- edgesOutEdgeView
A view of edge attributes, usually it iterates over (u, v) or (u, v, d) tuples of edges, but can also be used for attribute lookup as
edges[u, v]['foo']
.
Notes
Nodes in nbunch that are not in the graph will be (quietly) ignored. For directed graphs this returns the out-edges.
Examples
>>> G = nx.DiGraph() # or MultiDiGraph, etc >>> nx.add_path(G, [0, 1, 2]) >>> G.add_edge(2, 3, weight=5) >>> [e for e in G.edges] [(0, 1), (1, 2), (2, 3)] >>> G.edges.data() # default data is {} (empty dict) OutEdgeDataView([(0, 1, {}), (1, 2, {}), (2, 3, {'weight': 5})]) >>> G.edges.data("weight", default=1) OutEdgeDataView([(0, 1, 1), (1, 2, 1), (2, 3, 5)]) >>> G.edges([0, 2]) # only edges originating from these nodes OutEdgeDataView([(0, 1), (2, 3)]) >>> G.edges(0) # only edges from node 0 OutEdgeDataView([(0, 1)])
- in_degree¶
An InDegreeView for (node, in_degree) or in_degree for single node.
The node in_degree is the number of edges pointing to the node. The weighted node degree is the sum of the edge weights for edges incident to that node.
This object provides an iteration over (node, in_degree) as well as lookup for the degree for a single node.
- Parameters:
- nbunchsingle node, container, or all nodes (default= all nodes)
The view will only report edges incident to these nodes.
- weightstring or None, optional (default=None)
The name of an edge attribute that holds the numerical value used as a weight. If None, then each edge has weight 1. The degree is the sum of the edge weights adjacent to the node.
- Returns:
- If a single node is requested
- degint
In-degree of the node
- OR if multiple nodes are requested
- nd_iteriterator
The iterator returns two-tuples of (node, in-degree).
See also
Examples
>>> G = nx.DiGraph() >>> nx.add_path(G, [0, 1, 2, 3]) >>> G.in_degree(0) # node 0 with degree 0 0 >>> list(G.in_degree([0, 1, 2])) [(0, 0), (1, 1), (2, 1)]
- in_edges¶
A view of the in edges of the graph as G.in_edges or G.in_edges().
in_edges(self, nbunch=None, data=False, default=None):
- Parameters:
- nbunchsingle node, container, or all nodes (default= all nodes)
The view will only report edges incident to these nodes.
- datastring or bool, optional (default=False)
The edge attribute returned in 3-tuple (u, v, ddict[data]). If True, return edge attribute dict in 3-tuple (u, v, ddict). If False, return 2-tuple (u, v).
- defaultvalue, optional (default=None)
Value used for edges that don’t have the requested attribute. Only relevant if data is not True or False.
- Returns:
- in_edgesInEdgeView or InEdgeDataView
A view of edge attributes, usually it iterates over (u, v) or (u, v, d) tuples of edges, but can also be used for attribute lookup as
edges[u, v]['foo']
.
See also
Examples
>>> G = nx.DiGraph() >>> G.add_edge(1, 2, color="blue") >>> G.in_edges() InEdgeView([(1, 2)]) >>> G.in_edges(nbunch=2) InEdgeDataView([(1, 2)])
- name¶
String identifier of the graph.
This graph attribute appears in the attribute dict G.graph keyed by the string
"name"
. as well as an attribute (technically a property)G.name
. This is entirely user controlled.
- nodes¶
A NodeView of the Graph as G.nodes or G.nodes().
Can be used as
G.nodes
for data lookup and for set-like operations. Can also be used asG.nodes(data='color', default=None)
to return a NodeDataView which reports specific node data but no set operations. It presents a dict-like interface as well withG.nodes.items()
iterating over(node, nodedata)
2-tuples andG.nodes[3]['foo']
providing the value of thefoo
attribute for node3
. In addition, a viewG.nodes.data('foo')
provides a dict-like interface to thefoo
attribute of each node.G.nodes.data('foo', default=1)
provides a default for nodes that do not have attributefoo
.- Parameters:
- datastring or bool, optional (default=False)
The node attribute returned in 2-tuple (n, ddict[data]). If True, return entire node attribute dict as (n, ddict). If False, return just the nodes n.
- defaultvalue, optional (default=None)
Value used for nodes that don’t have the requested attribute. Only relevant if data is not True or False.
- Returns:
- NodeView
Allows set-like operations over the nodes as well as node attribute dict lookup and calling to get a NodeDataView. A NodeDataView iterates over
(n, data)
and has no set operations. A NodeView iterates overn
and includes set operations.When called, if data is False, an iterator over nodes. Otherwise an iterator of 2-tuples (node, attribute value) where the attribute is specified in
data
. If data is True then the attribute becomes the entire data dictionary.
Notes
If your node data is not needed, it is simpler and equivalent to use the expression
for n in G
, orlist(G)
.Examples
There are two simple ways of getting a list of all nodes in the graph:
>>> G = nx.path_graph(3) >>> list(G.nodes) [0, 1, 2] >>> list(G) [0, 1, 2]
To get the node data along with the nodes:
>>> G.add_node(1, time="5pm") >>> G.nodes[0]["foo"] = "bar" >>> list(G.nodes(data=True)) [(0, {'foo': 'bar'}), (1, {'time': '5pm'}), (2, {})] >>> list(G.nodes.data()) [(0, {'foo': 'bar'}), (1, {'time': '5pm'}), (2, {})]
>>> list(G.nodes(data="foo")) [(0, 'bar'), (1, None), (2, None)] >>> list(G.nodes.data("foo")) [(0, 'bar'), (1, None), (2, None)]
>>> list(G.nodes(data="time")) [(0, None), (1, '5pm'), (2, None)] >>> list(G.nodes.data("time")) [(0, None), (1, '5pm'), (2, None)]
>>> list(G.nodes(data="time", default="Not Available")) [(0, 'Not Available'), (1, '5pm'), (2, 'Not Available')] >>> list(G.nodes.data("time", default="Not Available")) [(0, 'Not Available'), (1, '5pm'), (2, 'Not Available')]
If some of your nodes have an attribute and the rest are assumed to have a default attribute value you can create a dictionary from node/attribute pairs using the
default
keyword argument to guarantee the value is never None:>>> G = nx.Graph() >>> G.add_node(0) >>> G.add_node(1, weight=2) >>> G.add_node(2, weight=3) >>> dict(G.nodes(data="weight", default=1)) {0: 1, 1: 2, 2: 3}
- out_degree¶
An OutDegreeView for (node, out_degree)
The node out_degree is the number of edges pointing out of the node. The weighted node degree is the sum of the edge weights for edges incident to that node.
This object provides an iterator over (node, out_degree) as well as lookup for the degree for a single node.
- Parameters:
- nbunchsingle node, container, or all nodes (default= all nodes)
The view will only report edges incident to these nodes.
- weightstring or None, optional (default=None)
The name of an edge attribute that holds the numerical value used as a weight. If None, then each edge has weight 1. The degree is the sum of the edge weights adjacent to the node.
- Returns:
- If a single node is requested
- degint
Out-degree of the node
- OR if multiple nodes are requested
- nd_iteriterator
The iterator returns two-tuples of (node, out-degree).
Examples
>>> G = nx.DiGraph() >>> nx.add_path(G, [0, 1, 2, 3]) >>> G.out_degree(0) # node 0 with degree 1 1 >>> list(G.out_degree([0, 1, 2])) [(0, 1), (1, 1), (2, 1)]
- out_edges¶
An OutEdgeView of the DiGraph as G.edges or G.edges().
edges(self, nbunch=None, data=False, default=None)
The OutEdgeView provides set-like operations on the edge-tuples as well as edge attribute lookup. When called, it also provides an EdgeDataView object which allows control of access to edge attributes (but does not provide set-like operations). Hence,
G.edges[u, v]['color']
provides the value of the color attribute for edge(u, v)
whilefor (u, v, c) in G.edges.data('color', default='red'):
iterates through all the edges yielding the color attribute with default'red'
if no color attribute exists.- Parameters:
- nbunchsingle node, container, or all nodes (default= all nodes)
The view will only report edges from these nodes.
- datastring or bool, optional (default=False)
The edge attribute returned in 3-tuple (u, v, ddict[data]). If True, return edge attribute dict in 3-tuple (u, v, ddict). If False, return 2-tuple (u, v).
- defaultvalue, optional (default=None)
Value used for edges that don’t have the requested attribute. Only relevant if data is not True or False.
- Returns:
- edgesOutEdgeView
A view of edge attributes, usually it iterates over (u, v) or (u, v, d) tuples of edges, but can also be used for attribute lookup as
edges[u, v]['foo']
.
Notes
Nodes in nbunch that are not in the graph will be (quietly) ignored. For directed graphs this returns the out-edges.
Examples
>>> G = nx.DiGraph() # or MultiDiGraph, etc >>> nx.add_path(G, [0, 1, 2]) >>> G.add_edge(2, 3, weight=5) >>> [e for e in G.edges] [(0, 1), (1, 2), (2, 3)] >>> G.edges.data() # default data is {} (empty dict) OutEdgeDataView([(0, 1, {}), (1, 2, {}), (2, 3, {'weight': 5})]) >>> G.edges.data("weight", default=1) OutEdgeDataView([(0, 1, 1), (1, 2, 1), (2, 3, 5)]) >>> G.edges([0, 2]) # only edges originating from these nodes OutEdgeDataView([(0, 1), (2, 3)]) >>> G.edges(0) # only edges from node 0 OutEdgeDataView([(0, 1)])
- pred¶
Graph adjacency object holding the predecessors of each node.
This object is a read-only dict-like structure with node keys and neighbor-dict values. The neighbor-dict is keyed by neighbor to the edge-data-dict. So
G.pred[2][3]['color'] = 'blue'
sets the color of the edge(3, 2)
to"blue"
.Iterating over G.pred behaves like a dict. Useful idioms include
for nbr, datadict in G.pred[n].items():
. A data-view not provided by dicts also exists:for nbr, foovalue in G.pred[node].data('foo'):
A default can be set via adefault
argument to thedata
method.
- succ¶
Graph adjacency object holding the successors of each node.
This object is a read-only dict-like structure with node keys and neighbor-dict values. The neighbor-dict is keyed by neighbor to the edge-data-dict. So
G.succ[3][2]['color'] = 'blue'
sets the color of the edge(3, 2)
to"blue"
.Iterating over G.succ behaves like a dict. Useful idioms include
for nbr, datadict in G.succ[n].items():
. A data-view not provided by dicts also exists:for nbr, foovalue in G.succ[node].data('foo'):
and a default can be set via adefault
argument to thedata
method.The neighbor information is also provided by subscripting the graph. So
for nbr, foovalue in G[node].data('foo', default=1):
works.For directed graphs,
G.adj
is identical toG.succ
.
Methods Documentation
- add_edge(u_of_edge, v_of_edge, **attr)¶
Add an edge between u and v.
The nodes u and v will be automatically added if they are not already in the graph.
Edge attributes can be specified with keywords or by directly accessing the edge’s attribute dictionary. See examples below.
- Parameters:
- u_of_edge, v_of_edgenodes
Nodes can be, for example, strings or numbers. Nodes must be hashable (and not None) Python objects.
- attrkeyword arguments, optional
Edge data (or labels or objects) can be assigned using keyword arguments.
See also
add_edges_from
add a collection of edges
Notes
Adding an edge that already exists updates the edge data.
Many NetworkX algorithms designed for weighted graphs use an edge attribute (by default
weight
) to hold a numerical value.Examples
The following all add the edge e=(1, 2) to graph G:
>>> G = nx.Graph() # or DiGraph, MultiGraph, MultiDiGraph, etc >>> e = (1, 2) >>> G.add_edge(1, 2) # explicit two-node form >>> G.add_edge(*e) # single edge as tuple of two nodes >>> G.add_edges_from([(1, 2)]) # add edges from iterable container
Associate data to edges using keywords:
>>> G.add_edge(1, 2, weight=3) >>> G.add_edge(1, 3, weight=7, capacity=15, length=342.7)
For non-string attribute keys, use subscript notation.
>>> G.add_edge(1, 2) >>> G[1][2].update({0: 5}) >>> G.edges[1, 2].update({0: 5})
- add_edges_from(ebunch_to_add, **attr)¶
Add all the edges in ebunch_to_add.
- Parameters:
- ebunch_to_addcontainer of edges
Each edge given in the container will be added to the graph. The edges must be given as 2-tuples (u, v) or 3-tuples (u, v, d) where d is a dictionary containing edge data.
- attrkeyword arguments, optional
Edge data (or labels or objects) can be assigned using keyword arguments.
See also
add_edge
add a single edge
add_weighted_edges_from
convenient way to add weighted edges
Notes
Adding the same edge twice has no effect but any edge data will be updated when each duplicate edge is added.
Edge attributes specified in an ebunch take precedence over attributes specified via keyword arguments.
When adding edges from an iterator over the graph you are changing, a
RuntimeError
can be raised with message:RuntimeError: dictionary changed size during iteration
. This happens when the graph’s underlying dictionary is modified during iteration. To avoid this error, evaluate the iterator into a separate object, e.g. by usinglist(iterator_of_edges)
, and pass this object toG.add_edges_from
.Examples
>>> G = nx.Graph() # or DiGraph, MultiGraph, MultiDiGraph, etc >>> G.add_edges_from([(0, 1), (1, 2)]) # using a list of edge tuples >>> e = zip(range(0, 3), range(1, 4)) >>> G.add_edges_from(e) # Add the path graph 0-1-2-3
Associate data to edges
>>> G.add_edges_from([(1, 2), (2, 3)], weight=3) >>> G.add_edges_from([(3, 4), (1, 4)], label="WN2898")
Evaluate an iterator over a graph if using it to modify the same graph
>>> G = nx.DiGraph([(1, 2), (2, 3), (3, 4)]) >>> # Grow graph by one new node, adding edges to all existing nodes. >>> # wrong way - will raise RuntimeError >>> # G.add_edges_from(((5, n) for n in G.nodes)) >>> # right way - note that there will be no self-edge for node 5 >>> G.add_edges_from(list((5, n) for n in G.nodes))
- add_final_job(job)¶
Add an HTCJob for the FINAL job in HTCDag.
- Parameters:
- job
HTCJob
HTCJob to add to the HTCDag as a FINAL job.
- job
- add_job(job, parent_names=None, child_names=None)¶
Add an HTCJob to the HTCDag.
- add_job_relationships(parents, children)¶
Add DAG edge between parents and children jobs.
- add_node(node_for_adding, **attr)¶
Add a single node
node_for_adding
and update node attributes.- Parameters:
- node_for_addingnode
A node can be any hashable Python object except None.
- attrkeyword arguments, optional
Set or change node attributes using key=value.
See also
Notes
A hashable object is one that can be used as a key in a Python dictionary. This includes strings, numbers, tuples of strings and numbers, etc.
On many platforms hashable items also include mutables such as NetworkX Graphs, though one should be careful that the hash doesn’t change on mutables.
Examples
>>> G = nx.Graph() # or DiGraph, MultiGraph, MultiDiGraph, etc >>> G.add_node(1) >>> G.add_node("Hello") >>> K3 = nx.Graph([(0, 1), (1, 2), (2, 0)]) >>> G.add_node(K3) >>> G.number_of_nodes() 3
Use keywords set/change node attributes:
>>> G.add_node(1, size=10) >>> G.add_node(3, weight=0.4, UTM=("13S", 382871, 3972649))
- add_nodes_from(nodes_for_adding, **attr)¶
Add multiple nodes.
- Parameters:
- nodes_for_addingiterable container
A container of nodes (list, dict, set, etc.). OR A container of (node, attribute dict) tuples. Node attributes are updated using the attribute dict.
- attrkeyword arguments, optional (default= no attributes)
Update attributes for all nodes in nodes. Node attributes specified in nodes as a tuple take precedence over attributes specified via keyword arguments.
See also
Notes
When adding nodes from an iterator over the graph you are changing, a
RuntimeError
can be raised with message:RuntimeError: dictionary changed size during iteration
. This happens when the graph’s underlying dictionary is modified during iteration. To avoid this error, evaluate the iterator into a separate object, e.g. by usinglist(iterator_of_nodes)
, and pass this object toG.add_nodes_from
.Examples
>>> G = nx.Graph() # or DiGraph, MultiGraph, MultiDiGraph, etc >>> G.add_nodes_from("Hello") >>> K3 = nx.Graph([(0, 1), (1, 2), (2, 0)]) >>> G.add_nodes_from(K3) >>> sorted(G.nodes(), key=str) [0, 1, 2, 'H', 'e', 'l', 'o']
Use keywords to update specific node attributes for every node.
>>> G.add_nodes_from([1, 2], size=10) >>> G.add_nodes_from([3, 4], weight=0.4)
Use (node, attrdict) tuples to update attributes for specific nodes.
>>> G.add_nodes_from([(1, dict(size=11)), (2, {"color": "blue"})]) >>> G.nodes[1]["size"] 11 >>> H = nx.Graph() >>> H.add_nodes_from(G.nodes(data=True)) >>> H.nodes[1]["size"] 11
Evaluate an iterator over a graph if using it to modify the same graph
>>> G = nx.DiGraph([(0, 1), (1, 2), (3, 4)]) >>> # wrong way - will raise RuntimeError >>> # G.add_nodes_from(n + 1 for n in G.nodes) >>> # correct way >>> G.add_nodes_from(list(n + 1 for n in G.nodes))
- add_weighted_edges_from(ebunch_to_add, weight='weight', **attr)¶
Add weighted edges in
ebunch_to_add
with specified weight attr- Parameters:
- ebunch_to_addcontainer of edges
Each edge given in the list or container will be added to the graph. The edges must be given as 3-tuples (u, v, w) where w is a number.
- weightstring, optional (default= ‘weight’)
The attribute name for the edge weights to be added.
- attrkeyword arguments, optional (default= no attributes)
Edge attributes to add/update for all edges.
See also
add_edge
add a single edge
add_edges_from
add multiple edges
Notes
Adding the same edge twice for Graph/DiGraph simply updates the edge data. For MultiGraph/MultiDiGraph, duplicate edges are stored.
When adding edges from an iterator over the graph you are changing, a
RuntimeError
can be raised with message:RuntimeError: dictionary changed size during iteration
. This happens when the graph’s underlying dictionary is modified during iteration. To avoid this error, evaluate the iterator into a separate object, e.g. by usinglist(iterator_of_edges)
, and pass this object toG.add_weighted_edges_from
.Examples
>>> G = nx.Graph() # or DiGraph, MultiGraph, MultiDiGraph, etc >>> G.add_weighted_edges_from([(0, 1, 3.0), (1, 2, 7.5)])
Evaluate an iterator over edges before passing it
>>> G = nx.Graph([(1, 2), (2, 3), (3, 4)]) >>> weight = 0.1 >>> # Grow graph by one new node, adding edges to all existing nodes. >>> # wrong way - will raise RuntimeError >>> # G.add_weighted_edges_from(((5, n, weight) for n in G.nodes)) >>> # correct way - note that there will be no self-edge for node 5 >>> G.add_weighted_edges_from(list((5, n, weight) for n in G.nodes))
- adjacency()¶
Returns an iterator over (node, adjacency dict) tuples for all nodes.
For directed graphs, only outgoing neighbors/adjacencies are included.
- Returns:
- adj_iteriterator
An iterator over (node, adjacency dictionary) for all nodes in the graph.
Examples
>>> G = nx.path_graph(4) # or DiGraph, MultiGraph, MultiDiGraph, etc >>> [(n, nbrdict) for n, nbrdict in G.adjacency()] [(0, {1: {}}), (1, {0: {}, 2: {}}), (2, {1: {}, 3: {}}), (3, {2: {}})]
- clear()¶
Remove all nodes and edges from the graph.
This also removes the name, and all graph, node, and edge attributes.
Examples
>>> G = nx.path_graph(4) # or DiGraph, MultiGraph, MultiDiGraph, etc >>> G.clear() >>> list(G.nodes) [] >>> list(G.edges) []
- clear_edges()¶
Remove all edges from the graph without altering nodes.
Examples
>>> G = nx.path_graph(4) # or DiGraph, MultiGraph, MultiDiGraph, etc >>> G.clear_edges() >>> list(G.nodes) [0, 1, 2, 3] >>> list(G.edges) []
- copy(as_view=False)¶
Returns a copy of the graph.
The copy method by default returns an independent shallow copy of the graph and attributes. That is, if an attribute is a container, that container is shared by the original an the copy. Use Python’s
copy.deepcopy
for new containers.If
as_view
is True then a view is returned instead of a copy.- Parameters:
- as_viewbool, optional (default=False)
If True, the returned graph-view provides a read-only view of the original graph without actually copying any data.
- Returns:
- GGraph
A copy of the graph.
See also
to_directed
return a directed copy of the graph.
Notes
All copies reproduce the graph structure, but data attributes may be handled in different ways. There are four types of copies of a graph that people might want.
Deepcopy – A “deepcopy” copies the graph structure as well as all data attributes and any objects they might contain. The entire graph object is new so that changes in the copy do not affect the original object. (see Python’s copy.deepcopy)
Data Reference (Shallow) – For a shallow copy the graph structure is copied but the edge, node and graph attribute dicts are references to those in the original graph. This saves time and memory but could cause confusion if you change an attribute in one graph and it changes the attribute in the other. NetworkX does not provide this level of shallow copy.
Independent Shallow – This copy creates new independent attribute dicts and then does a shallow copy of the attributes. That is, any attributes that are containers are shared between the new graph and the original. This is exactly what
dict.copy()
provides. You can obtain this style copy using:>>> G = nx.path_graph(5) >>> H = G.copy() >>> H = G.copy(as_view=False) >>> H = nx.Graph(G) >>> H = G.__class__(G)
Fresh Data – For fresh data, the graph structure is copied while new empty data attribute dicts are created. The resulting graph is independent of the original and it has no edge, node or graph attributes. Fresh copies are not enabled. Instead use:
>>> H = G.__class__() >>> H.add_nodes_from(G) >>> H.add_edges_from(G.edges)
View – Inspired by dict-views, graph-views act like read-only versions of the original graph, providing a copy of the original structure without requiring any memory for copying the information.
See the Python copy module for more information on shallow and deep copies, https://docs.python.org/3/library/copy.html.
Examples
>>> G = nx.path_graph(4) # or DiGraph, MultiGraph, MultiDiGraph, etc >>> H = G.copy()
- del_job(job_name)¶
Delete the job from the DAG.
- Parameters:
- job_name
str
Name of job in DAG to delete.
- job_name
- edge_subgraph(edges)¶
Returns the subgraph induced by the specified edges.
The induced subgraph contains each edge in
edges
and each node incident to any one of those edges.- Parameters:
- edgesiterable
An iterable of edges in this graph.
- Returns:
- GGraph
An edge-induced subgraph of this graph with the same edge attributes.
Notes
The graph, edge, and node attributes in the returned subgraph view are references to the corresponding attributes in the original graph. The view is read-only.
To create a full graph version of the subgraph with its own copy of the edge or node attributes, use:
G.edge_subgraph(edges).copy()
Examples
>>> G = nx.path_graph(5) >>> H = G.edge_subgraph([(0, 1), (3, 4)]) >>> list(H.nodes) [0, 1, 3, 4] >>> list(H.edges) [(0, 1), (3, 4)]
- get_edge_data(u, v, default=None)¶
Returns the attribute dictionary associated with edge (u, v).
This is identical to
G[u][v]
except the default is returned instead of an exception if the edge doesn’t exist.- Parameters:
- u, vnodes
- default: any Python object (default=None)
Value to return if the edge (u, v) is not found.
- Returns:
- edge_dictdictionary
The edge attribute dictionary.
Examples
>>> G = nx.path_graph(4) # or DiGraph, MultiGraph, MultiDiGraph, etc >>> G[0][1] {}
Warning: Assigning to
G[u][v]
is not permitted. But it is safe to assign attributesG[u][v]['foo']
>>> G[0][1]["weight"] = 7 >>> G[0][1]["weight"] 7 >>> G[1][0]["weight"] 7
>>> G = nx.path_graph(4) # or DiGraph, MultiGraph, MultiDiGraph, etc >>> G.get_edge_data(0, 1) # default edge data is {} {} >>> e = (0, 1) >>> G.get_edge_data(*e) # tuple form {} >>> G.get_edge_data("a", "b", default=0) # edge not in graph, return 0 0
- has_edge(u, v)¶
Returns True if the edge (u, v) is in the graph.
This is the same as
v in G[u]
without KeyError exceptions.- Parameters:
- u, vnodes
Nodes can be, for example, strings or numbers. Nodes must be hashable (and not None) Python objects.
- Returns:
- edge_indbool
True if edge is in the graph, False otherwise.
Examples
>>> G = nx.path_graph(4) # or DiGraph, MultiGraph, MultiDiGraph, etc >>> G.has_edge(0, 1) # using two nodes True >>> e = (0, 1) >>> G.has_edge(*e) # e is a 2-tuple (u, v) True >>> e = (0, 1, {"weight": 7}) >>> G.has_edge(*e[:2]) # e is a 3-tuple (u, v, data_dictionary) True
The following syntax are equivalent:
>>> G.has_edge(0, 1) True >>> 1 in G[0] # though this gives KeyError if 0 not in G True
- has_node(n)¶
Returns True if the graph contains the node n.
Identical to
n in G
- Parameters:
- nnode
Examples
>>> G = nx.path_graph(3) # or DiGraph, MultiGraph, MultiDiGraph, etc >>> G.has_node(0) True
It is more readable and simpler to use
>>> 0 in G True
- has_predecessor(u, v)¶
Returns True if node u has predecessor v.
This is true if graph has the edge u<-v.
- has_successor(u, v)¶
Returns True if node u has successor v.
This is true if graph has the edge u->v.
- is_directed()¶
Returns True if graph is directed, False otherwise.
- is_multigraph()¶
Returns True if graph is a multigraph, False otherwise.
- nbunch_iter(nbunch=None)¶
Returns an iterator over nodes contained in nbunch that are also in the graph.
The nodes in nbunch are checked for membership in the graph and if not are silently ignored.
- Parameters:
- nbunchsingle node, container, or all nodes (default= all nodes)
The view will only report edges incident to these nodes.
- Returns:
- niteriterator
An iterator over nodes in nbunch that are also in the graph. If nbunch is None, iterate over all nodes in the graph.
- Raises:
- NetworkXError
If nbunch is not a node or sequence of nodes. If a node in nbunch is not hashable.
See also
Graph.__iter__
Notes
When nbunch is an iterator, the returned iterator yields values directly from nbunch, becoming exhausted when nbunch is exhausted.
To test whether nbunch is a single node, one can use “if nbunch in self:”, even after processing with this routine.
If nbunch is not a node or a (possibly empty) sequence/iterator or None, a
NetworkXError
is raised. Also, if any object in nbunch is not hashable, aNetworkXError
is raised.
- neighbors(n)¶
Returns an iterator over successor nodes of n.
A successor of n is a node m such that there exists a directed edge from n to m.
- Parameters:
- nnode
A node in the graph
- Raises:
- NetworkXError
If n is not in the graph.
See also
Notes
neighbors() and successors() are the same.
- number_of_edges(u=None, v=None)¶
Returns the number of edges between two nodes.
- Parameters:
- u, vnodes, optional (default=all edges)
If u and v are specified, return the number of edges between u and v. Otherwise return the total number of all edges.
- Returns:
- nedgesint
The number of edges in the graph. If nodes
u
andv
are specified return the number of edges between those nodes. If the graph is directed, this only returns the number of edges fromu
tov
.
See also
Examples
For undirected graphs, this method counts the total number of edges in the graph:
>>> G = nx.path_graph(4) >>> G.number_of_edges() 3
If you specify two nodes, this counts the total number of edges joining the two nodes:
>>> G.number_of_edges(0, 1) 1
For directed graphs, this method can count the total number of directed edges from
u
tov
:>>> G = nx.DiGraph() >>> G.add_edge(0, 1) >>> G.add_edge(1, 0) >>> G.number_of_edges(0, 1) 1
- number_of_nodes()¶
Returns the number of nodes in the graph.
- Returns:
- nnodesint
The number of nodes in the graph.
See also
order
identical method
__len__
identical method
Examples
>>> G = nx.path_graph(3) # or DiGraph, MultiGraph, MultiDiGraph, etc >>> G.number_of_nodes() 3
- order()¶
Returns the number of nodes in the graph.
- Returns:
- nnodesint
The number of nodes in the graph.
See also
number_of_nodes
identical method
__len__
identical method
Examples
>>> G = nx.path_graph(3) # or DiGraph, MultiGraph, MultiDiGraph, etc >>> G.order() 3
- predecessors(n)¶
Returns an iterator over predecessor nodes of n.
A predecessor of n is a node m such that there exists a directed edge from m to n.
- Parameters:
- nnode
A node in the graph
- Raises:
- NetworkXError
If n is not in the graph.
See also
- remove_edge(u, v)¶
Remove the edge between u and v.
- Parameters:
- u, vnodes
Remove the edge between nodes u and v.
- Raises:
- NetworkXError
If there is not an edge between u and v.
See also
remove_edges_from
remove a collection of edges
Examples
>>> G = nx.Graph() # or DiGraph, etc >>> nx.add_path(G, [0, 1, 2, 3]) >>> G.remove_edge(0, 1) >>> e = (1, 2) >>> G.remove_edge(*e) # unpacks e from an edge tuple >>> e = (2, 3, {"weight": 7}) # an edge with attribute data >>> G.remove_edge(*e[:2]) # select first part of edge tuple
- remove_edges_from(ebunch)¶
Remove all edges specified in ebunch.
- Parameters:
- ebunch: list or container of edge tuples
Each edge given in the list or container will be removed from the graph. The edges can be:
2-tuples (u, v) edge between u and v.
3-tuples (u, v, k) where k is ignored.
See also
remove_edge
remove a single edge
Notes
Will fail silently if an edge in ebunch is not in the graph.
Examples
>>> G = nx.path_graph(4) # or DiGraph, MultiGraph, MultiDiGraph, etc >>> ebunch = [(1, 2), (2, 3)] >>> G.remove_edges_from(ebunch)
- remove_node(n)¶
Remove node n.
Removes the node n and all adjacent edges. Attempting to remove a nonexistent node will raise an exception.
- Parameters:
- nnode
A node in the graph
- Raises:
- NetworkXError
If n is not in the graph.
See also
Examples
>>> G = nx.path_graph(3) # or DiGraph, MultiGraph, MultiDiGraph, etc >>> list(G.edges) [(0, 1), (1, 2)] >>> G.remove_node(1) >>> list(G.edges) []
- remove_nodes_from(nodes)¶
Remove multiple nodes.
- Parameters:
- nodesiterable container
A container of nodes (list, dict, set, etc.). If a node in the container is not in the graph it is silently ignored.
See also
Notes
When removing nodes from an iterator over the graph you are changing, a
RuntimeError
will be raised with message:RuntimeError: dictionary changed size during iteration
. This happens when the graph’s underlying dictionary is modified during iteration. To avoid this error, evaluate the iterator into a separate object, e.g. by usinglist(iterator_of_nodes)
, and pass this object toG.remove_nodes_from
.Examples
>>> G = nx.path_graph(3) # or DiGraph, MultiGraph, MultiDiGraph, etc >>> e = list(G.nodes) >>> e [0, 1, 2] >>> G.remove_nodes_from(e) >>> list(G.nodes) []
Evaluate an iterator over a graph if using it to modify the same graph
>>> G = nx.DiGraph([(0, 1), (1, 2), (3, 4)]) >>> # this command will fail, as the graph's dict is modified during iteration >>> # G.remove_nodes_from(n for n in G.nodes if n < 2) >>> # this command will work, since the dictionary underlying graph is not modified >>> G.remove_nodes_from(list(n for n in G.nodes if n < 2))
- reverse(copy=True)¶
Returns the reverse of the graph.
The reverse is a graph with the same nodes and edges but with the directions of the edges reversed.
- Parameters:
- copybool optional (default=True)
If True, return a new DiGraph holding the reversed edges. If False, the reverse graph is created using a view of the original graph.
- size(weight=None)¶
Returns the number of edges or total of all edge weights.
- Parameters:
- weightstring or None, optional (default=None)
The edge attribute that holds the numerical value used as a weight. If None, then each edge has weight 1.
- Returns:
- sizenumeric
The number of edges or (if weight keyword is provided) the total weight sum.
If weight is None, returns an int. Otherwise a float (or more general numeric if the weights are more general).
See also
Examples
>>> G = nx.path_graph(4) # or DiGraph, MultiGraph, MultiDiGraph, etc >>> G.size() 3
>>> G = nx.Graph() # or DiGraph, MultiGraph, MultiDiGraph, etc >>> G.add_edge("a", "b", weight=2) >>> G.add_edge("b", "c", weight=4) >>> G.size() 2 >>> G.size(weight="weight") 6.0
- subgraph(nodes)¶
Returns a SubGraph view of the subgraph induced on
nodes
.The induced subgraph of the graph contains the nodes in
nodes
and the edges between those nodes.- Parameters:
- nodeslist, iterable
A container of nodes which will be iterated through once.
- Returns:
- GSubGraph View
A subgraph view of the graph. The graph structure cannot be changed but node/edge attributes can and are shared with the original graph.
Notes
The graph, edge and node attributes are shared with the original graph. Changes to the graph structure is ruled out by the view, but changes to attributes are reflected in the original graph.
To create a subgraph with its own copy of the edge/node attributes use: G.subgraph(nodes).copy()
For an inplace reduction of a graph to a subgraph you can remove nodes: G.remove_nodes_from([n for n in G if n not in set(nodes)])
Subgraph views are sometimes NOT what you want. In most cases where you want to do more than simply look at the induced edges, it makes more sense to just create the subgraph as its own graph with code like:
# Create a subgraph SG based on a (possibly multigraph) G SG = G.__class__() SG.add_nodes_from((n, G.nodes[n]) for n in largest_wcc) if SG.is_multigraph(): SG.add_edges_from( (n, nbr, key, d) for n, nbrs in G.adj.items() if n in largest_wcc for nbr, keydict in nbrs.items() if nbr in largest_wcc for key, d in keydict.items() ) else: SG.add_edges_from( (n, nbr, d) for n, nbrs in G.adj.items() if n in largest_wcc for nbr, d in nbrs.items() if nbr in largest_wcc ) SG.graph.update(G.graph)
Examples
>>> G = nx.path_graph(4) # or DiGraph, MultiGraph, MultiDiGraph, etc >>> H = G.subgraph([0, 1, 2]) >>> list(H.edges) [(0, 1), (1, 2)]
- successors(n)¶
Returns an iterator over successor nodes of n.
A successor of n is a node m such that there exists a directed edge from n to m.
- Parameters:
- nnode
A node in the graph
- Raises:
- NetworkXError
If n is not in the graph.
See also
Notes
neighbors() and successors() are the same.
- to_directed(as_view=False)¶
Returns a directed representation of the graph.
- Returns:
- GDiGraph
A directed graph with the same name, same nodes, and with each edge (u, v, data) replaced by two directed edges (u, v, data) and (v, u, data).
Notes
This returns a “deepcopy” of the edge, node, and graph attributes which attempts to completely copy all of the data and references.
This is in contrast to the similar D=DiGraph(G) which returns a shallow copy of the data.
See the Python copy module for more information on shallow and deep copies, https://docs.python.org/3/library/copy.html.
Warning: If you have subclassed Graph to use dict-like objects in the data structure, those changes do not transfer to the DiGraph created by this method.
Examples
>>> G = nx.Graph() # or MultiGraph, etc >>> G.add_edge(0, 1) >>> H = G.to_directed() >>> list(H.edges) [(0, 1), (1, 0)]
If already directed, return a (deep) copy
>>> G = nx.DiGraph() # or MultiDiGraph, etc >>> G.add_edge(0, 1) >>> H = G.to_directed() >>> list(H.edges) [(0, 1)]
- to_directed_class()¶
Returns the class to use for empty directed copies.
If you subclass the base classes, use this to designate what directed class to use for
to_directed()
copies.
- to_undirected(reciprocal=False, as_view=False)¶
Returns an undirected representation of the digraph.
- Parameters:
- reciprocalbool (optional)
If True only keep edges that appear in both directions in the original digraph.
- as_viewbool (optional, default=False)
If True return an undirected view of the original directed graph.
- Returns:
- GGraph
An undirected graph with the same name and nodes and with edge (u, v, data) if either (u, v, data) or (v, u, data) is in the digraph. If both edges exist in digraph and their edge data is different, only one edge is created with an arbitrary choice of which edge data to use. You must check and correct for this manually if desired.
See also
Graph
,copy
,add_edge
,add_edges_from
Notes
If edges in both directions (u, v) and (v, u) exist in the graph, attributes for the new undirected edge will be a combination of the attributes of the directed edges. The edge data is updated in the (arbitrary) order that the edges are encountered. For more customized control of the edge attributes use add_edge().
This returns a “deepcopy” of the edge, node, and graph attributes which attempts to completely copy all of the data and references.
This is in contrast to the similar G=DiGraph(D) which returns a shallow copy of the data.
See the Python copy module for more information on shallow and deep copies, https://docs.python.org/3/library/copy.html.
Warning: If you have subclassed DiGraph to use dict-like objects in the data structure, those changes do not transfer to the Graph created by this method.
Examples
>>> G = nx.path_graph(2) # or MultiGraph, etc >>> H = G.to_directed() >>> list(H.edges) [(0, 1), (1, 0)] >>> G2 = H.to_undirected() >>> list(G2.edges) [(0, 1)]
- to_undirected_class()¶
Returns the class to use for empty undirected copies.
If you subclass the base classes, use this to designate what directed class to use for
to_directed()
copies.
- update(edges=None, nodes=None)¶
Update the graph using nodes/edges/graphs as input.
Like dict.update, this method takes a graph as input, adding the graph’s nodes and edges to this graph. It can also take two inputs: edges and nodes. Finally it can take either edges or nodes. To specify only nodes the keyword
nodes
must be used.The collections of edges and nodes are treated similarly to the add_edges_from/add_nodes_from methods. When iterated, they should yield 2-tuples (u, v) or 3-tuples (u, v, datadict).
- Parameters:
- edgesGraph object, collection of edges, or None
The first parameter can be a graph or some edges. If it has attributes
nodes
andedges
, then it is taken to be a Graph-like object and those attributes are used as collections of nodes and edges to be added to the graph. If the first parameter does not have those attributes, it is treated as a collection of edges and added to the graph. If the first argument is None, no edges are added.- nodescollection of nodes, or None
The second parameter is treated as a collection of nodes to be added to the graph unless it is None. If
edges is None
andnodes is None
an exception is raised. If the first parameter is a Graph, thennodes
is ignored.
See also
add_edges_from
add multiple edges to a graph
add_nodes_from
add multiple nodes to a graph
Notes
It you want to update the graph using an adjacency structure it is straightforward to obtain the edges/nodes from adjacency. The following examples provide common cases, your adjacency may be slightly different and require tweaks of these examples:
>>> # dict-of-set/list/tuple >>> adj = {1: {2, 3}, 2: {1, 3}, 3: {1, 2}} >>> e = [(u, v) for u, nbrs in adj.items() for v in nbrs] >>> G.update(edges=e, nodes=adj)
>>> DG = nx.DiGraph() >>> # dict-of-dict-of-attribute >>> adj = {1: {2: 1.3, 3: 0.7}, 2: {1: 1.4}, 3: {1: 0.7}} >>> e = [(u, v, {"weight": d}) for u, nbrs in adj.items() for v, d in nbrs.items()] >>> DG.update(edges=e, nodes=adj)
>>> # dict-of-dict-of-dict >>> adj = {1: {2: {"weight": 1.3}, 3: {"color": 0.7, "weight": 1.2}}} >>> e = [(u, v, {"weight": d}) for u, nbrs in adj.items() for v, d in nbrs.items()] >>> DG.update(edges=e, nodes=adj)
>>> # predecessor adjacency (dict-of-set) >>> pred = {1: {2, 3}, 2: {3}, 3: {3}} >>> e = [(v, u) for u, nbrs in pred.items() for v in nbrs]
>>> # MultiGraph dict-of-dict-of-dict-of-attribute >>> MDG = nx.MultiDiGraph() >>> adj = { ... 1: {2: {0: {"weight": 1.3}, 1: {"weight": 1.2}}}, ... 3: {2: {0: {"weight": 0.7}}}, ... } >>> e = [ ... (u, v, ekey, d) ... for u, nbrs in adj.items() ... for v, keydict in nbrs.items() ... for ekey, d in keydict.items() ... ] >>> MDG.update(edges=e)
Examples
>>> G = nx.path_graph(5) >>> G.update(nx.complete_graph(range(4, 10))) >>> from itertools import combinations >>> edges = ( ... (u, v, {"power": u * v}) ... for u, v in combinations(range(10, 20), 2) ... if u * v < 225 ... ) >>> nodes = [1000] # for singleton, use a container >>> G.update(edges, nodes)
- write(submit_path, job_subdir='')¶
Write DAG to a file.