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Source code for networkx.algorithms.shortest_paths.weighted

# -*- coding: utf-8 -*-
#    Copyright (C) 2004-2017 by
#    Aric Hagberg <hagberg@lanl.gov>
#    Dan Schult <dschult@colgate.edu>
#    Pieter Swart <swart@lanl.gov>
#    All rights reserved.
#    BSD license.
#
# Authors:  Aric Hagberg <hagberg@lanl.gov>
#           Loïc Séguin-C. <loicseguin@gmail.com>
#           Dan Schult <dschult@colgate.edu>
#           Niels van Adrichem <n.l.m.vanadrichem@tudelft.nl>
"""
Shortest path algorithms for weighed graphs.
"""

from collections import deque
from heapq import heappush, heappop
from itertools import count
import networkx as nx
from networkx.utils import generate_unique_node
import warnings as _warnings


__all__ = ['dijkstra_path',
           'dijkstra_path_length',
           'bidirectional_dijkstra',
           'single_source_dijkstra',
           'single_source_dijkstra_path',
           'single_source_dijkstra_path_length',
           'multi_source_dijkstra',
           'multi_source_dijkstra_path',
           'multi_source_dijkstra_path_length',
           'all_pairs_dijkstra',
           'all_pairs_dijkstra_path',
           'all_pairs_dijkstra_path_length',
           'dijkstra_predecessor_and_distance',
           'bellman_ford_path',
           'bellman_ford_path_length',
           'single_source_bellman_ford',
           'single_source_bellman_ford_path',
           'single_source_bellman_ford_path_length',
           'all_pairs_bellman_ford_path',
           'all_pairs_bellman_ford_path_length',
           'bellman_ford',
           'bellman_ford_predecessor_and_distance',
           'negative_edge_cycle',
           'goldberg_radzik',
           'johnson']


def _weight_function(G, weight):
    """Returns a function that returns the weight of an edge.

    The returned function is specifically suitable for input to
    functions :func:`_dijkstra` and :func:`_bellman_ford_relaxation`.

    Parameters
    ----------
    G : NetworkX graph.

    weight : string or function
        If it is callable, `weight` itself is returned. If it is a string,
        it is assumed to be the name of the edge attribute that represents
        the weight of an edge. In that case, a function is returned that
        gets the edge weight according to the specified edge attribute.

    Returns
    -------
    function
        This function returns a callable that accepts exactly three inputs:
        a node, an node adjacent to the first one, and the edge attribute
        dictionary for the eedge joining those nodes. That function returns
        a number representing the weight of an edge.

    If `G` is a multigraph, and `weight` is not callable, the
    minimum edge weight over all parallel edges is returned. If any edge
    does not have an attribute with key `weight`, it is assumed to
    have weight one.

    """
    if callable(weight):
        return weight
    # If the weight keyword argument is not callable, we assume it is a
    # string representing the edge attribute containing the weight of
    # the edge.
    if G.is_multigraph():
        return lambda u, v, d: min(attr.get(weight, 1) for attr in d.values())
    return lambda u, v, data: data.get(weight, 1)


[docs]def dijkstra_path(G, source, target, weight='weight'): """Returns the shortest weighted path from source to target in G. Uses Dijkstra's Method to compute the shortest weighted path between two nodes in a graph. Parameters ---------- G : NetworkX graph source : node Starting node target : node Ending node weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- path : list List of nodes in a shortest path. Raises ------ NetworkXNoPath If no path exists between source and target. Examples -------- >>> G=nx.path_graph(5) >>> print(nx.dijkstra_path(G,0,4)) [0, 1, 2, 3, 4] Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. The weight function can be used to hide edges by returning None. So ``weight = lambda u, v, d: 1 if d['color']=="red" else None`` will find the shortest red path. The weight function can be used to include node weights. >>> def func(u, v, d): ... node_u_wt = G.nodes[u].get('node_weight', 1) ... node_v_wt = G.nodes[v].get('node_weight', 1) ... edge_wt = d.get('weight', 1) ... return node_u_wt/2 + node_v_wt/2 + edge_wt In this example we take the average of start and end node weights of an edge and add it to the weight of the edge. See Also -------- bidirectional_dijkstra(), bellman_ford_path() """ (length, path) = single_source_dijkstra(G, source, target=target, weight=weight) return path
[docs]def dijkstra_path_length(G, source, target, weight='weight'): """Returns the shortest weighted path length in G from source to target. Uses Dijkstra's Method to compute the shortest weighted path length between two nodes in a graph. Parameters ---------- G : NetworkX graph source : node label starting node for path target : node label ending node for path weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- length : number Shortest path length. Raises ------ NetworkXNoPath If no path exists between source and target. Examples -------- >>> G=nx.path_graph(5) >>> print(nx.dijkstra_path_length(G,0,4)) 4 Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. The weight function can be used to hide edges by returning None. So ``weight = lambda u, v, d: 1 if d['color']=="red" else None`` will find the shortest red path. See Also -------- bidirectional_dijkstra(), bellman_ford_path_length() """ if source == target: return 0 weight = _weight_function(G, weight) length = _dijkstra(G, source, weight, target=target) try: return length[target] except KeyError: raise nx.NetworkXNoPath( "Node %s not reachable from %s" % (target, source))
[docs]def single_source_dijkstra_path(G, source, cutoff=None, weight='weight'): """Find shortest weighted paths in G from a source node. Compute shortest path between source and all other reachable nodes for a weighted graph. Parameters ---------- G : NetworkX graph source : node Starting node for path. cutoff : integer or float, optional Depth to stop the search. Only return paths with length <= cutoff. weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- paths : dictionary Dictionary of shortest path lengths keyed by target. Examples -------- >>> G=nx.path_graph(5) >>> path=nx.single_source_dijkstra_path(G,0) >>> path[4] [0, 1, 2, 3, 4] Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. The weight function can be used to hide edges by returning None. So ``weight = lambda u, v, d: 1 if d['color']=="red" else None`` will find the shortest red path. See Also -------- single_source_dijkstra(), single_source_bellman_ford() """ return multi_source_dijkstra_path(G, {source}, cutoff=cutoff, weight=weight)
[docs]def single_source_dijkstra_path_length(G, source, cutoff=None, weight='weight'): """Find shortest weighted path lengths in G from a source node. Compute the shortest path length between source and all other reachable nodes for a weighted graph. Parameters ---------- G : NetworkX graph source : node label Starting node for path cutoff : integer or float, optional Depth to stop the search. Only return paths with length <= cutoff. weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- length : dict Dict keyed by node to shortest path length from source. Examples -------- >>> G = nx.path_graph(5) >>> length = nx.single_source_dijkstra_path_length(G, 0) >>> length[4] 4 >>> for node in [0, 1, 2, 3, 4]: ... print('{}: {}'.format(node, length[node])) 0: 0 1: 1 2: 2 3: 3 4: 4 Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. The weight function can be used to hide edges by returning None. So ``weight = lambda u, v, d: 1 if d['color']=="red" else None`` will find the shortest red path. See Also -------- single_source_dijkstra(), single_source_bellman_ford_path_length() """ return multi_source_dijkstra_path_length(G, {source}, cutoff=cutoff, weight=weight)
[docs]def single_source_dijkstra(G, source, target=None, cutoff=None, weight='weight'): """Find shortest weighted paths and lengths from a source node. Compute the shortest path length between source and all other reachable nodes for a weighted graph. Uses Dijkstra's algorithm to compute shortest paths and lengths between a source and all other reachable nodes in a weighted graph. Parameters ---------- G : NetworkX graph source : node label Starting node for path target : node label, optional Ending node for path cutoff : integer or float, optional Depth to stop the search. Only return paths with length <= cutoff. weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- distance, path : pair of dictionaries, or numeric and list. If target is None, paths and lengths to all nodes are computed. The return value is a tuple of two dictionaries keyed by target nodes. The first dictionary stores distance to each target node. The second stores the path to each target node. If target is not None, returns a tuple (distance, path), where distance is the distance from source to target and path is a list representing the path from source to target. Examples -------- >>> G = nx.path_graph(5) >>> length, path = nx.single_source_dijkstra(G, 0) >>> print(length[4]) 4 >>> for node in [0, 1, 2, 3, 4]: ... print('{}: {}'.format(node, length[node])) 0: 0 1: 1 2: 2 3: 3 4: 4 >>> path[4] [0, 1, 2, 3, 4] >>> length, path = nx.single_source_dijkstra(G, 0, 1) >>> length 1 >>> path [0, 1] Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. The weight function can be used to hide edges by returning None. So ``weight = lambda u, v, d: 1 if d['color']=="red" else None`` will find the shortest red path. Based on the Python cookbook recipe (119466) at http://aspn.activestate.com/ASPN/Cookbook/Python/Recipe/119466 This algorithm is not guaranteed to work if edge weights are negative or are floating point numbers (overflows and roundoff errors can cause problems). See Also -------- single_source_dijkstra_path() single_source_dijkstra_path_length() single_source_bellman_ford() """ return multi_source_dijkstra(G, {source}, cutoff=cutoff, target=target, weight=weight)
[docs]def multi_source_dijkstra_path(G, sources, cutoff=None, weight='weight'): """Find shortest weighted paths in G from a given set of source nodes. Compute shortest path between any of the source nodes and all other reachable nodes for a weighted graph. Parameters ---------- G : NetworkX graph sources : non-empty set of nodes Starting nodes for paths. If this is just a set containing a single node, then all paths computed by this function will start from that node. If there are two or more nodes in the set, the computed paths may begin from any one of the start nodes. cutoff : integer or float, optional Depth to stop the search. Only return paths with length <= cutoff. weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- paths : dictionary Dictionary of shortest paths keyed by target. Examples -------- >>> G = nx.path_graph(5) >>> path = nx.multi_source_dijkstra_path(G, {0, 4}) >>> path[1] [0, 1] >>> path[3] [4, 3] Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. The weight function can be used to hide edges by returning None. So ``weight = lambda u, v, d: 1 if d['color']=="red" else None`` will find the shortest red path. Raises ------ ValueError If `sources` is empty. See Also -------- multi_source_dijkstra(), multi_source_bellman_ford() """ length, path = multi_source_dijkstra(G, sources, cutoff=cutoff, weight=weight) return path
[docs]def multi_source_dijkstra_path_length(G, sources, cutoff=None, weight='weight'): """Find shortest weighted path lengths in G from a given set of source nodes. Compute the shortest path length between any of the source nodes and all other reachable nodes for a weighted graph. Parameters ---------- G : NetworkX graph sources : non-empty set of nodes Starting nodes for paths. If this is just a set containing a single node, then all paths computed by this function will start from that node. If there are two or more nodes in the set, the computed paths may begin from any one of the start nodes. cutoff : integer or float, optional Depth to stop the search. Only return paths with length <= cutoff. weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- length : dict Dict keyed by node to shortest path length to nearest source. Examples -------- >>> G = nx.path_graph(5) >>> length = nx.multi_source_dijkstra_path_length(G, {0, 4}) >>> for node in [0, 1, 2, 3, 4]: ... print('{}: {}'.format(node, length[node])) 0: 0 1: 1 2: 2 3: 1 4: 0 Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. The weight function can be used to hide edges by returning None. So ``weight = lambda u, v, d: 1 if d['color']=="red" else None`` will find the shortest red path. Raises ------ ValueError If `sources` is empty. See Also -------- multi_source_dijkstra() """ if not sources: raise ValueError('sources must not be empty') weight = _weight_function(G, weight) return _dijkstra_multisource(G, sources, weight, cutoff=cutoff)
def multi_source_dijkstra(G, sources, target=None, cutoff=None, weight='weight'): """Find shortest weighted paths and lengths from a given set of source nodes. Uses Dijkstra's algorithm to compute the shortest paths and lengths between one of the source nodes and the given `target`, or all other reachable nodes if not specified, for a weighted graph. Parameters ---------- G : NetworkX graph sources : non-empty set of nodes Starting nodes for paths. If this is just a set containing a single node, then all paths computed by this function will start from that node. If there are two or more nodes in the set, the computed paths may begin from any one of the start nodes. target : node label, optional Ending node for path cutoff : integer or float, optional Depth to stop the search. Only return paths with length <= cutoff. weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- distance, path : pair of dictionaries, or numeric and list If target is None, returns a tuple of two dictionaries keyed by node. The first dictionary stores distance from one of the source nodes. The second stores the path from one of the sources to that node. If target is not None, returns a tuple of (distance, path) where distance is the distance from source to target and path is a list representing the path from source to target. Examples -------- >>> G = nx.path_graph(5) >>> length, path = nx.multi_source_dijkstra(G, {0, 4}) >>> for node in [0, 1, 2, 3, 4]: ... print('{}: {}'.format(node, length[node])) 0: 0 1: 1 2: 2 3: 1 4: 0 >>> path[1] [0, 1] >>> path[3] [4, 3] >>> length, path = nx.multi_source_dijkstra(G, {0, 4}, 1) >>> length 1 >>> path [0, 1] Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. The weight function can be used to hide edges by returning None. So ``weight = lambda u, v, d: 1 if d['color']=="red" else None`` will find the shortest red path. Based on the Python cookbook recipe (119466) at http://aspn.activestate.com/ASPN/Cookbook/Python/Recipe/119466 This algorithm is not guaranteed to work if edge weights are negative or are floating point numbers (overflows and roundoff errors can cause problems). Raises ------ ValueError If `sources` is empty. See Also -------- multi_source_dijkstra_path() multi_source_dijkstra_path_length() """ if not sources: raise ValueError('sources must not be empty') if target in sources: return (0, [target]) weight = _weight_function(G, weight) paths = {source: [source] for source in sources} # dictionary of paths dist = _dijkstra_multisource(G, sources, weight, paths=paths, cutoff=cutoff, target=target) if target is None: return (dist, paths) try: return (dist[target], paths[target]) except KeyError: raise nx.NetworkXNoPath("No path to {}.".format(target)) def _dijkstra(G, source, weight, pred=None, paths=None, cutoff=None, target=None): """Uses Dijkstra's algorithm to find shortest weighted paths from a single source. This is a convenience function for :func:`_dijkstra_multisource` with all the arguments the same, except the keyword argument `sources` set to ``[source]``. """ return _dijkstra_multisource(G, [source], weight, pred=pred, paths=paths, cutoff=cutoff, target=target) def _dijkstra_multisource(G, sources, weight, pred=None, paths=None, cutoff=None, target=None): """Uses Dijkstra's algorithm to find shortest weighted paths Parameters ---------- G : NetworkX graph sources : non-empty iterable of nodes Starting nodes for paths. If this is just an iterable containing a single node, then all paths computed by this function will start from that node. If there are two or more nodes in this iterable, the computed paths may begin from any one of the start nodes. weight: function Function with (u, v, data) input that returns that edges weight pred: dict of lists, optional(default=None) dict to store a list of predecessors keyed by that node If None, predecessors are not stored. paths: dict, optional (default=None) dict to store the path list from source to each node, keyed by node. If None, paths are not stored. target : node label, optional Ending node for path. Search is halted when target is found. cutoff : integer or float, optional Depth to stop the search. Only return paths with length <= cutoff. Returns ------- distance : dictionary A mapping from node to shortest distance to that node from one of the source nodes. Notes ----- The optional predecessor and path dictionaries can be accessed by the caller through the original pred and paths objects passed as arguments. No need to explicitly return pred or paths. """ G_succ = G._succ if G.is_directed() else G._adj push = heappush pop = heappop dist = {} # dictionary of final distances seen = {} # fringe is heapq with 3-tuples (distance,c,node) # use the count c to avoid comparing nodes (may not be able to) c = count() fringe = [] for source in sources: seen[source] = 0 push(fringe, (0, next(c), source)) while fringe: (d, _, v) = pop(fringe) if v in dist: continue # already searched this node. dist[v] = d if v == target: break for u, e in G_succ[v].items(): cost = weight(v, u, e) if cost is None: continue vu_dist = dist[v] + cost if cutoff is not None: if vu_dist > cutoff: continue if u in dist: if vu_dist < dist[u]: raise ValueError('Contradictory paths found:', 'negative weights?') elif u not in seen or vu_dist < seen[u]: seen[u] = vu_dist push(fringe, (vu_dist, next(c), u)) if paths is not None: paths[u] = paths[v] + [u] if pred is not None: pred[u] = [v] elif vu_dist == seen[u]: if pred is not None: pred[u].append(v) # The optional predecessor and path dictionaries can be accessed # by the caller via the pred and paths objects passed as arguments. return dist
[docs]def dijkstra_predecessor_and_distance(G, source, cutoff=None, weight='weight'): """Compute weighted shortest path length and predecessors. Uses Dijkstra's Method to obtain the shortest weighted paths and return dictionaries of predecessors for each node and distance for each node from the `source`. Parameters ---------- G : NetworkX graph source : node label Starting node for path cutoff : integer or float, optional Depth to stop the search. Only return paths with length <= cutoff. weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- pred, distance : dictionaries Returns two dictionaries representing a list of predecessors of a node and the distance to each node. Warning: If target is specified, the dicts are incomplete as they only contain information for the nodes along a path to target. Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. The list of predecessors contains more than one element only when there are more than one shortest paths to the key node. Examples -------- >>> import networkx as nx >>> G = nx.path_graph(5, create_using = nx.DiGraph()) >>> pred, dist = nx.dijkstra_predecessor_and_distance(G, 0) >>> sorted(pred.items()) [(0, []), (1, [0]), (2, [1]), (3, [2]), (4, [3])] >>> sorted(dist.items()) [(0, 0), (1, 1), (2, 2), (3, 3), (4, 4)] >>> pred, dist = nx.dijkstra_predecessor_and_distance(G, 0, 1) >>> sorted(pred.items()) [(0, []), (1, [0])] >>> sorted(dist.items()) [(0, 0), (1, 1)] """ weight = _weight_function(G, weight) pred = {source: []} # dictionary of predecessors return (pred, _dijkstra(G, source, weight, pred=pred, cutoff=cutoff))
def all_pairs_dijkstra(G, cutoff=None, weight='weight'): """Find shortest weighted paths and lengths between all nodes. Parameters ---------- G : NetworkX graph cutoff : integer or float, optional Depth to stop the search. Only return paths with length <= cutoff. weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edge[u][v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Yields ------ (node, (distance, path)) : (node obj, (dict, dict)) Each source node has two associated dicts. The first holds distance keyed by target and the second holds paths keyed by target. (See single_source_dijkstra for the source/target node terminology.) If desired you can apply `dict()` to this function to create a dict keyed by source node to the two dicts. Examples -------- >>> G = nx.path_graph(5) >>> len_path = dict(nx.all_pairs_dijkstra(G)) >>> print(len_path[3][0][1]) 2 >>> for node in [0, 1, 2, 3, 4]: ... print('3 - {}: {}'.format(node, len_path[3][0][node])) 3 - 0: 3 3 - 1: 2 3 - 2: 1 3 - 3: 0 3 - 4: 1 >>> len_path[3][1][1] [3, 2, 1] >>> for n, (dist, path) in nx.all_pairs_dijkstra(G): ... print(path[1]) [0, 1] [1] [2, 1] [3, 2, 1] [4, 3, 2, 1] Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. The yielded dicts only have keys for reachable nodes. """ for n in G: dist, path = single_source_dijkstra(G, n, cutoff=cutoff, weight=weight) yield (n, (dist, path))
[docs]def all_pairs_dijkstra_path_length(G, cutoff=None, weight='weight'): """Compute shortest path lengths between all nodes in a weighted graph. Parameters ---------- G : NetworkX graph cutoff : integer or float, optional Depth to stop the search. Only return paths with length <= cutoff. weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- distance : iterator (source, dictionary) iterator with dictionary keyed by target and shortest path length as the key value. Examples -------- >>> G = nx.path_graph(5) >>> length = dict(nx.all_pairs_dijkstra_path_length(G)) >>> for node in [0, 1, 2, 3, 4]: ... print('1 - {}: {}'.format(node, length[1][node])) 1 - 0: 1 1 - 1: 0 1 - 2: 1 1 - 3: 2 1 - 4: 3 >>> length[3][2] 1 >>> length[2][2] 0 Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. The dictionary returned only has keys for reachable node pairs. """ length = single_source_dijkstra_path_length for n in G: yield (n, length(G, n, cutoff=cutoff, weight=weight))
[docs]def all_pairs_dijkstra_path(G, cutoff=None, weight='weight'): """Compute shortest paths between all nodes in a weighted graph. Parameters ---------- G : NetworkX graph cutoff : integer or float, optional Depth to stop the search. Only return paths with length <= cutoff. weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- distance : dictionary Dictionary, keyed by source and target, of shortest paths. Examples -------- >>> G = nx.path_graph(5) >>> path = dict(nx.all_pairs_dijkstra_path(G)) >>> print(path[0][4]) [0, 1, 2, 3, 4] Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. See Also -------- floyd_warshall(), all_pairs_bellman_ford_path() """ path = single_source_dijkstra_path # TODO This can be trivially parallelized. for n in G: yield (n, path(G, n, cutoff=cutoff, weight=weight))
def bellman_ford(G, source, weight='weight'): """DEPRECATED: Replaced by bellman_ford_predecessor_and_distance(). """ msg = "Function bellman_ford() is deprecated and will be removed" \ "in 2.1, use bellman_ford_predecessor_and_distance() instead." _warnings.warn(msg, DeprecationWarning) return bellman_ford_predecessor_and_distance(G, source, weight=weight)
[docs]def bellman_ford_predecessor_and_distance(G, source, target=None, cutoff=None, weight='weight'): """Compute shortest path lengths and predecessors on shortest paths in weighted graphs. The algorithm has a running time of $O(mn)$ where $n$ is the number of nodes and $m$ is the number of edges. It is slower than Dijkstra but can handle negative edge weights. Parameters ---------- G : NetworkX graph The algorithm works for all types of graphs, including directed graphs and multigraphs. source: node label Starting node for path weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- pred, dist : dictionaries Returns two dictionaries keyed by node to predecessor in the path and to the distance from the source respectively. Warning: If target is specified, the dicts are incomplete as they only contain information for the nodes along a path to target. Raises ------ NetworkXUnbounded If the (di)graph contains a negative cost (di)cycle, the algorithm raises an exception to indicate the presence of the negative cost (di)cycle. Note: any negative weight edge in an undirected graph is a negative cost cycle. Examples -------- >>> import networkx as nx >>> G = nx.path_graph(5, create_using = nx.DiGraph()) >>> pred, dist = nx.bellman_ford_predecessor_and_distance(G, 0) >>> sorted(pred.items()) [(0, [None]), (1, [0]), (2, [1]), (3, [2]), (4, [3])] >>> sorted(dist.items()) [(0, 0), (1, 1), (2, 2), (3, 3), (4, 4)] >>> pred, dist = nx.bellman_ford_predecessor_and_distance(G, 0, 1) >>> sorted(pred.items()) [(0, [None]), (1, [0])] >>> sorted(dist.items()) [(0, 0), (1, 1)] >>> from nose.tools import assert_raises >>> G = nx.cycle_graph(5, create_using = nx.DiGraph()) >>> G[1][2]['weight'] = -7 >>> assert_raises(nx.NetworkXUnbounded, \ nx.bellman_ford_predecessor_and_distance, G, 0) Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. The dictionaries returned only have keys for nodes reachable from the source. In the case where the (di)graph is not connected, if a component not containing the source contains a negative cost (di)cycle, it will not be detected. """ if source not in G: raise nx.NodeNotFound("Node %s is not found in the graph" % source) weight = _weight_function(G, weight) if any(weight(u, v, d) < 0 for u, v, d in nx.selfloop_edges(G, data=True)): raise nx.NetworkXUnbounded("Negative cost cycle detected.") dist = {source: 0} pred = {source: [None]} if len(G) == 1: return pred, dist weight = _weight_function(G, weight) dist = _bellman_ford(G, [source], weight, pred=pred, dist=dist, cutoff=cutoff, target=target) return (pred, dist)
def _bellman_ford(G, source, weight, pred=None, paths=None, dist=None, cutoff=None, target=None): """Relaxation loop for Bellman–Ford algorithm Parameters ---------- G : NetworkX graph source: list List of source nodes weight : function The weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. pred: dict of lists, optional (default=None) dict to store a list of predecessors keyed by that node If None, predecessors are not stored paths: dict, optional (default=None) dict to store the path list from source to each node, keyed by node If None, paths are not stored dist: dict, optional (default=None) dict to store distance from source to the keyed node If None, returned dist dict contents default to 0 for every node in the source list cutoff: integer or float, optional Depth to stop the search. Only paths of length <= cutoff are returned target: node label, optional Ending node for path. Path lengths to other destinations may (and probably will) be incorrect. Returns ------- Returns a dict keyed by node to the distance from the source. Dicts for paths and pred are in the mutated input dicts by those names. Raises ------ NetworkXUnbounded If the (di)graph contains a negative cost (di)cycle, the algorithm raises an exception to indicate the presence of the negative cost (di)cycle. Note: any negative weight edge in an undirected graph is a negative cost cycle """ if pred is None: pred = {v: [None] for v in source} if dist is None: dist = {v: 0 for v in source} G_succ = G.succ if G.is_directed() else G.adj inf = float('inf') n = len(G) count = {} q = deque(source) in_q = set(source) while q: u = q.popleft() in_q.remove(u) # Skip relaxations if any of the predecessors of u is in the queue. if all(pred_u not in in_q for pred_u in pred[u]): dist_u = dist[u] for v, e in G_succ[u].items(): dist_v = dist_u + weight(v, u, e) if cutoff is not None: if dist_v > cutoff: continue if target is not None: if dist_v > dist.get(target, inf): continue if dist_v < dist.get(v, inf): if v not in in_q: q.append(v) in_q.add(v) count_v = count.get(v, 0) + 1 if count_v == n: raise nx.NetworkXUnbounded( "Negative cost cycle detected.") count[v] = count_v dist[v] = dist_v pred[v] = [u] elif dist.get(v) is not None and dist_v == dist.get(v): pred[v].append(u) if paths is not None: dsts = [target] if target is not None else pred for dst in dsts: path = [dst] cur = dst while pred[cur][0] is not None: cur = pred[cur][0] path.append(cur) path.reverse() paths[dst] = path return dist
[docs]def bellman_ford_path(G, source, target, weight='weight'): """Returns the shortest path from source to target in a weighted graph G. Parameters ---------- G : NetworkX graph source : node Starting node target : node Ending node weight: string, optional (default='weight') Edge data key corresponding to the edge weight Returns ------- path : list List of nodes in a shortest path. Raises ------ NetworkXNoPath If no path exists between source and target. Examples -------- >>> G=nx.path_graph(5) >>> print(nx.bellman_ford_path(G, 0, 4)) [0, 1, 2, 3, 4] Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. See Also -------- dijkstra_path(), bellman_ford_path_length() """ length, path = single_source_bellman_ford(G, source, target=target, weight=weight) return path
[docs]def bellman_ford_path_length(G, source, target, weight='weight'): """Returns the shortest path length from source to target in a weighted graph. Parameters ---------- G : NetworkX graph source : node label starting node for path target : node label ending node for path weight: string, optional (default='weight') Edge data key corresponding to the edge weight Returns ------- length : number Shortest path length. Raises ------ NetworkXNoPath If no path exists between source and target. Examples -------- >>> G=nx.path_graph(5) >>> print(nx.bellman_ford_path_length(G,0,4)) 4 Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. See Also -------- dijkstra_path_length(), bellman_ford_path() """ if source == target: return 0 weight = _weight_function(G, weight) length = _bellman_ford(G, [source], weight, target=target) try: return length[target] except KeyError: raise nx.NetworkXNoPath( "node %s not reachable from %s" % (source, target))
[docs]def single_source_bellman_ford_path(G, source, cutoff=None, weight='weight'): """Compute shortest path between source and all other reachable nodes for a weighted graph. Parameters ---------- G : NetworkX graph source : node Starting node for path. weight: string, optional (default='weight') Edge data key corresponding to the edge weight cutoff : integer or float, optional Depth to stop the search. Only paths of length <= cutoff are returned. Returns ------- paths : dictionary Dictionary of shortest path lengths keyed by target. Examples -------- >>> G=nx.path_graph(5) >>> path=nx.single_source_bellman_ford_path(G,0) >>> path[4] [0, 1, 2, 3, 4] Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. See Also -------- single_source_dijkstra(), single_source_bellman_ford() """ (length, path) = single_source_bellman_ford( G, source, cutoff=cutoff, weight=weight) return path
[docs]def single_source_bellman_ford_path_length(G, source, cutoff=None, weight='weight'): """Compute the shortest path length between source and all other reachable nodes for a weighted graph. Parameters ---------- G : NetworkX graph source : node label Starting node for path weight: string, optional (default='weight') Edge data key corresponding to the edge weight. cutoff : integer or float, optional Depth to stop the search. Only paths of length <= cutoff are returned. Returns ------- length : iterator (target, shortest path length) iterator Examples -------- >>> G = nx.path_graph(5) >>> length = dict(nx.single_source_bellman_ford_path_length(G, 0)) >>> length[4] 4 >>> for node in [0, 1, 2, 3, 4]: ... print('{}: {}'.format(node, length[node])) 0: 0 1: 1 2: 2 3: 3 4: 4 Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. See Also -------- single_source_dijkstra(), single_source_bellman_ford() """ weight = _weight_function(G, weight) return _bellman_ford(G, [source], weight, cutoff=cutoff)
[docs]def single_source_bellman_ford(G, source, target=None, cutoff=None, weight='weight'): """Compute shortest paths and lengths in a weighted graph G. Uses Bellman-Ford algorithm for shortest paths. Parameters ---------- G : NetworkX graph source : node label Starting node for path target : node label, optional Ending node for path cutoff : integer or float, optional Depth to stop the search. Only paths of length <= cutoff are returned. Returns ------- distance, path : pair of dictionaries, or numeric and list If target is None, returns a tuple of two dictionaries keyed by node. The first dictionary stores distance from one of the source nodes. The second stores the path from one of the sources to that node. If target is not None, returns a tuple of (distance, path) where distance is the distance from source to target and path is a list representing the path from source to target. Examples -------- >>> G = nx.path_graph(5) >>> length, path = nx.single_source_bellman_ford(G, 0) >>> print(length[4]) 4 >>> for node in [0, 1, 2, 3, 4]: ... print('{}: {}'.format(node, length[node])) 0: 0 1: 1 2: 2 3: 3 4: 4 >>> path[4] [0, 1, 2, 3, 4] >>> length, path = nx.single_source_bellman_ford(G, 0, 1) >>> length 1 >>> path [0, 1] Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. See Also -------- single_source_dijkstra() single_source_bellman_ford_path() single_source_bellman_ford_path_length() """ if source == target: return (0, [source]) weight = _weight_function(G, weight) paths = {source: [source]} # dictionary of paths dist = _bellman_ford(G, [source], weight, paths=paths, cutoff=cutoff, target=target) if target is None: return (dist, paths) try: return (dist[target], paths[target]) except KeyError: msg = "Node %s not reachable from %s" % (source, target) raise nx.NetworkXNoPath(msg)
[docs]def all_pairs_bellman_ford_path_length(G, cutoff=None, weight='weight'): """ Compute shortest path lengths between all nodes in a weighted graph. Parameters ---------- G : NetworkX graph weight: string, optional (default='weight') Edge data key corresponding to the edge weight cutoff : integer or float, optional Depth to stop the search. Only paths of length <= cutoff are returned. Returns ------- distance : iterator (source, dictionary) iterator with dictionary keyed by target and shortest path length as the key value. Examples -------- >>> G = nx.path_graph(5) >>> length = dict(nx.all_pairs_bellman_ford_path_length(G)) >>> for node in [0, 1, 2, 3, 4]: ... print('1 - {}: {}'.format(node, length[1][node])) 1 - 0: 1 1 - 1: 0 1 - 2: 1 1 - 3: 2 1 - 4: 3 >>> length[3][2] 1 >>> length[2][2] 0 Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. The dictionary returned only has keys for reachable node pairs. """ length = single_source_bellman_ford_path_length for n in G: yield (n, dict(length(G, n, cutoff=cutoff, weight=weight)))
[docs]def all_pairs_bellman_ford_path(G, cutoff=None, weight='weight'): """ Compute shortest paths between all nodes in a weighted graph. Parameters ---------- G : NetworkX graph weight: string, optional (default='weight') Edge data key corresponding to the edge weight cutoff : integer or float, optional Depth to stop the search. Only paths of length <= cutoff are returned. Returns ------- distance : dictionary Dictionary, keyed by source and target, of shortest paths. Examples -------- >>> G = nx.path_graph(5) >>> path = dict(nx.all_pairs_bellman_ford_path(G)) >>> print(path[0][4]) [0, 1, 2, 3, 4] Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. See Also -------- floyd_warshall(), all_pairs_dijkstra_path() """ path = single_source_bellman_ford_path # TODO This can be trivially parallelized. for n in G: yield (n, path(G, n, cutoff=cutoff, weight=weight))
def goldberg_radzik(G, source, weight='weight'): """Compute shortest path lengths and predecessors on shortest paths in weighted graphs. The algorithm has a running time of $O(mn)$ where $n$ is the number of nodes and $m$ is the number of edges. It is slower than Dijkstra but can handle negative edge weights. Parameters ---------- G : NetworkX graph The algorithm works for all types of graphs, including directed graphs and multigraphs. source: node label Starting node for path weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- pred, dist : dictionaries Returns two dictionaries keyed by node to predecessor in the path and to the distance from the source respectively. Raises ------ NetworkXUnbounded If the (di)graph contains a negative cost (di)cycle, the algorithm raises an exception to indicate the presence of the negative cost (di)cycle. Note: any negative weight edge in an undirected graph is a negative cost cycle. Examples -------- >>> import networkx as nx >>> G = nx.path_graph(5, create_using = nx.DiGraph()) >>> pred, dist = nx.goldberg_radzik(G, 0) >>> sorted(pred.items()) [(0, None), (1, 0), (2, 1), (3, 2), (4, 3)] >>> sorted(dist.items()) [(0, 0), (1, 1), (2, 2), (3, 3), (4, 4)] >>> from nose.tools import assert_raises >>> G = nx.cycle_graph(5, create_using = nx.DiGraph()) >>> G[1][2]['weight'] = -7 >>> assert_raises(nx.NetworkXUnbounded, nx.goldberg_radzik, G, 0) Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. The dictionaries returned only have keys for nodes reachable from the source. In the case where the (di)graph is not connected, if a component not containing the source contains a negative cost (di)cycle, it will not be detected. """ if source not in G: raise nx.NodeNotFound("Node %s is not found in the graph" % source) weight = _weight_function(G, weight) if any(weight(u, v, d) < 0 for u, v, d in nx.selfloop_edges(G, data=True)): raise nx.NetworkXUnbounded("Negative cost cycle detected.") if len(G) == 1: return {source: None}, {source: 0} if G.is_directed(): G_succ = G.succ else: G_succ = G.adj inf = float('inf') d = dict((u, inf) for u in G) d[source] = 0 pred = {source: None} def topo_sort(relabeled): """Topologically sort nodes relabeled in the previous round and detect negative cycles. """ # List of nodes to scan in this round. Denoted by A in Goldberg and # Radzik's paper. to_scan = [] # In the DFS in the loop below, neg_count records for each node the # number of edges of negative reduced costs on the path from a DFS root # to the node in the DFS forest. The reduced cost of an edge (u, v) is # defined as d[u] + weight[u][v] - d[v]. # # neg_count also doubles as the DFS visit marker array. neg_count = {} for u in relabeled: # Skip visited nodes. if u in neg_count: continue d_u = d[u] # Skip nodes without out-edges of negative reduced costs. if all(d_u + weight(u, v, e) >= d[v] for v, e in G_succ[u].items()): continue # Nonrecursive DFS that inserts nodes reachable from u via edges of # nonpositive reduced costs into to_scan in (reverse) topological # order. stack = [(u, iter(G_succ[u].items()))] in_stack = set([u]) neg_count[u] = 0 while stack: u, it = stack[-1] try: v, e = next(it) except StopIteration: to_scan.append(u) stack.pop() in_stack.remove(u) continue t = d[u] + weight(u, v, e) d_v = d[v] if t <= d_v: is_neg = t < d_v d[v] = t pred[v] = u if v not in neg_count: neg_count[v] = neg_count[u] + int(is_neg) stack.append((v, iter(G_succ[v].items()))) in_stack.add(v) elif (v in in_stack and neg_count[u] + int(is_neg) > neg_count[v]): # (u, v) is a back edge, and the cycle formed by the # path v to u and (u, v) contains at least one edge of # negative reduced cost. The cycle must be of negative # cost. raise nx.NetworkXUnbounded( 'Negative cost cycle detected.') to_scan.reverse() return to_scan def relax(to_scan): """Relax out-edges of relabeled nodes. """ relabeled = set() # Scan nodes in to_scan in topological order and relax incident # out-edges. Add the relabled nodes to labeled. for u in to_scan: d_u = d[u] for v, e in G_succ[u].items(): w_e = weight(u, v, e) if d_u + w_e < d[v]: d[v] = d_u + w_e pred[v] = u relabeled.add(v) return relabeled # Set of nodes relabled in the last round of scan operations. Denoted by B # in Goldberg and Radzik's paper. relabeled = set([source]) while relabeled: to_scan = topo_sort(relabeled) relabeled = relax(to_scan) d = dict((u, d[u]) for u in pred) return pred, d
[docs]def negative_edge_cycle(G, weight='weight'): """Return True if there exists a negative edge cycle anywhere in G. Parameters ---------- G : NetworkX graph weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- negative_cycle : bool True if a negative edge cycle exists, otherwise False. Examples -------- >>> import networkx as nx >>> G = nx.cycle_graph(5, create_using = nx.DiGraph()) >>> print(nx.negative_edge_cycle(G)) False >>> G[1][2]['weight'] = -7 >>> print(nx.negative_edge_cycle(G)) True Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. This algorithm uses bellman_ford_predecessor_and_distance() but finds negative cycles on any component by first adding a new node connected to every node, and starting bellman_ford_predecessor_and_distance on that node. It then removes that extra node. """ newnode = generate_unique_node() G.add_edges_from([(newnode, n) for n in G]) try: bellman_ford_predecessor_and_distance(G, newnode, weight) except nx.NetworkXUnbounded: return True finally: G.remove_node(newnode) return False
[docs]def bidirectional_dijkstra(G, source, target, weight='weight'): """Dijkstra's algorithm for shortest paths using bidirectional search. Parameters ---------- G : NetworkX graph source : node Starting node. target : node Ending node. weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- length, path : number and list length is the distance from source to target. path is a list of nodes on a path from source to target. Raises ------ NetworkXNoPath If no path exists between source and target. Examples -------- >>> G = nx.path_graph(5) >>> length, path = nx.bidirectional_dijkstra(G, 0, 4) >>> print(length) 4 >>> print(path) [0, 1, 2, 3, 4] Notes ----- Edge weight attributes must be numerical. Distances are calculated as sums of weighted edges traversed. In practice bidirectional Dijkstra is much more than twice as fast as ordinary Dijkstra. Ordinary Dijkstra expands nodes in a sphere-like manner from the source. The radius of this sphere will eventually be the length of the shortest path. Bidirectional Dijkstra will expand nodes from both the source and the target, making two spheres of half this radius. Volume of the first sphere is `\pi*r*r` while the others are `2*\pi*r/2*r/2`, making up half the volume. This algorithm is not guaranteed to work if edge weights are negative or are floating point numbers (overflows and roundoff errors can cause problems). See Also -------- shortest_path shortest_path_length """ if source not in G or target not in G: msg = 'Either source {} or target {} is not in G' raise nx.NodeNotFound(msg.format(source, target)) if source == target: return (0, [source]) push = heappush pop = heappop # Init: [Forward, Backward] dists = [{}, {}] # dictionary of final distances paths = [{source: [source]}, {target: [target]}] # dictionary of paths fringe = [[], []] # heap of (distance, node) for choosing node to expand seen = [{source: 0}, {target: 0}] # dict of distances to seen nodes c = count() # initialize fringe heap push(fringe[0], (0, next(c), source)) push(fringe[1], (0, next(c), target)) # neighs for extracting correct neighbor information if G.is_directed(): neighs = [G.successors, G.predecessors] else: neighs = [G.neighbors, G.neighbors] # variables to hold shortest discovered path # finaldist = 1e30000 finalpath = [] dir = 1 while fringe[0] and fringe[1]: # choose direction # dir == 0 is forward direction and dir == 1 is back dir = 1 - dir # extract closest to expand (dist, _, v) = pop(fringe[dir]) if v in dists[dir]: # Shortest path to v has already been found continue # update distance dists[dir][v] = dist # equal to seen[dir][v] if v in dists[1 - dir]: # if we have scanned v in both directions we are done # we have now discovered the shortest path return (finaldist, finalpath) for w in neighs[dir](v): if(dir == 0): # forward if G.is_multigraph(): minweight = min((dd.get(weight, 1) for k, dd in G[v][w].items())) else: minweight = G[v][w].get(weight, 1) vwLength = dists[dir][v] + minweight # G[v][w].get(weight,1) else: # back, must remember to change v,w->w,v if G.is_multigraph(): minweight = min((dd.get(weight, 1) for k, dd in G[w][v].items())) else: minweight = G[w][v].get(weight, 1) vwLength = dists[dir][v] + minweight # G[w][v].get(weight,1) if w in dists[dir]: if vwLength < dists[dir][w]: raise ValueError( "Contradictory paths found: negative weights?") elif w not in seen[dir] or vwLength < seen[dir][w]: # relaxing seen[dir][w] = vwLength push(fringe[dir], (vwLength, next(c), w)) paths[dir][w] = paths[dir][v] + [w] if w in seen[0] and w in seen[1]: # see if this path is better than than the already # discovered shortest path totaldist = seen[0][w] + seen[1][w] if finalpath == [] or finaldist > totaldist: finaldist = totaldist revpath = paths[1][w][:] revpath.reverse() finalpath = paths[0][w] + revpath[1:] raise nx.NetworkXNoPath("No path between %s and %s." % (source, target))
[docs]def johnson(G, weight='weight'): r"""Uses Johnson's Algorithm to compute shortest paths. Johnson's Algorithm finds a shortest path between each pair of nodes in a weighted graph even if negative weights are present. Parameters ---------- G : NetworkX graph weight : string or function If this is a string, then edge weights will be accessed via the edge attribute with this key (that is, the weight of the edge joining `u` to `v` will be ``G.edges[u, v][weight]``). If no such edge attribute exists, the weight of the edge is assumed to be one. If this is a function, the weight of an edge is the value returned by the function. The function must accept exactly three positional arguments: the two endpoints of an edge and the dictionary of edge attributes for that edge. The function must return a number. Returns ------- distance : dictionary Dictionary, keyed by source and target, of shortest paths. Raises ------ NetworkXError If given graph is not weighted. Examples -------- >>> import networkx as nx >>> graph = nx.DiGraph() >>> graph.add_weighted_edges_from([('0', '3', 3), ('0', '1', -5), ... ('0', '2', 2), ('1', '2', 4), ('2', '3', 1)]) >>> paths = nx.johnson(graph, weight='weight') >>> paths['0']['2'] ['0', '1', '2'] Notes ----- Johnson's algorithm is suitable even for graphs with negative weights. It works by using the Bellman–Ford algorithm to compute a transformation of the input graph that removes all negative weights, allowing Dijkstra's algorithm to be used on the transformed graph. The time complexity of this algorithm is $O(n^2 \log n + n m)$, where $n$ is the number of nodes and $m$ the number of edges in the graph. For dense graphs, this may be faster than the Floyd–Warshall algorithm. See Also -------- floyd_warshall_predecessor_and_distance floyd_warshall_numpy all_pairs_shortest_path all_pairs_shortest_path_length all_pairs_dijkstra_path bellman_ford_predecessor_and_distance all_pairs_bellman_ford_path all_pairs_bellman_ford_path_length """ if not nx.is_weighted(G, weight=weight): raise nx.NetworkXError('Graph is not weighted.') dist = {v: 0 for v in G} pred = {v: [None] for v in G} weight = _weight_function(G, weight) # Calculate distance of shortest paths dist_bellman = _bellman_ford(G, list(G), weight, pred=pred, dist=dist) # Update the weight function to take into account the Bellman--Ford # relaxation distances. def new_weight(u, v, d): return weight(u, v, d) + dist_bellman[u] - dist_bellman[v] def dist_path(v): paths = {v: [v]} _dijkstra(G, v, new_weight, paths=paths) return paths return {v: dist_path(v) for v in G}