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""" |
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Dinitz' algorithm for maximum flow problems. |
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""" |
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from collections import deque |
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import networkx as nx |
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from networkx.algorithms.flow.utils import build_residual_network |
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from networkx.utils import pairwise |
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__all__ = ["dinitz"] |
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@nx._dispatchable(edge_attrs={"capacity": float("inf")}, returns_graph=True) |
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def dinitz(G, s, t, capacity="capacity", residual=None, value_only=False, cutoff=None): |
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"""Find a maximum single-commodity flow using Dinitz' algorithm. |
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This function returns the residual network resulting after computing |
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the maximum flow. See below for details about the conventions |
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NetworkX uses for defining residual networks. |
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This algorithm has a running time of $O(n^2 m)$ for $n$ nodes and $m$ |
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edges [1]_. |
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Parameters |
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---------- |
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G : NetworkX graph |
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Edges of the graph are expected to have an attribute called |
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'capacity'. If this attribute is not present, the edge is |
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considered to have infinite capacity. |
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s : node |
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Source node for the flow. |
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t : node |
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Sink node for the flow. |
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capacity : string |
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Edges of the graph G are expected to have an attribute capacity |
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that indicates how much flow the edge can support. If this |
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attribute is not present, the edge is considered to have |
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infinite capacity. Default value: 'capacity'. |
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residual : NetworkX graph |
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Residual network on which the algorithm is to be executed. If None, a |
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new residual network is created. Default value: None. |
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value_only : bool |
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If True compute only the value of the maximum flow. This parameter |
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will be ignored by this algorithm because it is not applicable. |
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cutoff : integer, float |
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If specified, the algorithm will terminate when the flow value reaches |
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or exceeds the cutoff. In this case, it may be unable to immediately |
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determine a minimum cut. Default value: None. |
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Returns |
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------- |
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R : NetworkX DiGraph |
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Residual network after computing the maximum flow. |
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Raises |
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------ |
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NetworkXError |
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The algorithm does not support MultiGraph and MultiDiGraph. If |
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the input graph is an instance of one of these two classes, a |
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NetworkXError is raised. |
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NetworkXUnbounded |
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If the graph has a path of infinite capacity, the value of a |
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feasible flow on the graph is unbounded above and the function |
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raises a NetworkXUnbounded. |
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See also |
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-------- |
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:meth:`maximum_flow` |
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:meth:`minimum_cut` |
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:meth:`preflow_push` |
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:meth:`shortest_augmenting_path` |
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Notes |
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----- |
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The residual network :samp:`R` from an input graph :samp:`G` has the |
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same nodes as :samp:`G`. :samp:`R` is a DiGraph that contains a pair |
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of edges :samp:`(u, v)` and :samp:`(v, u)` iff :samp:`(u, v)` is not a |
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self-loop, and at least one of :samp:`(u, v)` and :samp:`(v, u)` exists |
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in :samp:`G`. |
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For each edge :samp:`(u, v)` in :samp:`R`, :samp:`R[u][v]['capacity']` |
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is equal to the capacity of :samp:`(u, v)` in :samp:`G` if it exists |
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in :samp:`G` or zero otherwise. If the capacity is infinite, |
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:samp:`R[u][v]['capacity']` will have a high arbitrary finite value |
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that does not affect the solution of the problem. This value is stored in |
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:samp:`R.graph['inf']`. For each edge :samp:`(u, v)` in :samp:`R`, |
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:samp:`R[u][v]['flow']` represents the flow function of :samp:`(u, v)` and |
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satisfies :samp:`R[u][v]['flow'] == -R[v][u]['flow']`. |
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The flow value, defined as the total flow into :samp:`t`, the sink, is |
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stored in :samp:`R.graph['flow_value']`. If :samp:`cutoff` is not |
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specified, reachability to :samp:`t` using only edges :samp:`(u, v)` such |
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that :samp:`R[u][v]['flow'] < R[u][v]['capacity']` induces a minimum |
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:samp:`s`-:samp:`t` cut. |
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Examples |
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-------- |
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>>> from networkx.algorithms.flow import dinitz |
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The functions that implement flow algorithms and output a residual |
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network, such as this one, are not imported to the base NetworkX |
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namespace, so you have to explicitly import them from the flow package. |
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>>> G = nx.DiGraph() |
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>>> G.add_edge("x", "a", capacity=3.0) |
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>>> G.add_edge("x", "b", capacity=1.0) |
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>>> G.add_edge("a", "c", capacity=3.0) |
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>>> G.add_edge("b", "c", capacity=5.0) |
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>>> G.add_edge("b", "d", capacity=4.0) |
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>>> G.add_edge("d", "e", capacity=2.0) |
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>>> G.add_edge("c", "y", capacity=2.0) |
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>>> G.add_edge("e", "y", capacity=3.0) |
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>>> R = dinitz(G, "x", "y") |
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>>> flow_value = nx.maximum_flow_value(G, "x", "y") |
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>>> flow_value |
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3.0 |
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>>> flow_value == R.graph["flow_value"] |
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True |
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References |
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---------- |
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.. [1] Dinitz' Algorithm: The Original Version and Even's Version. |
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2006. Yefim Dinitz. In Theoretical Computer Science. Lecture |
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Notes in Computer Science. Volume 3895. pp 218-240. |
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https://doi.org/10.1007/11685654_10 |
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""" |
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R = dinitz_impl(G, s, t, capacity, residual, cutoff) |
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R.graph["algorithm"] = "dinitz" |
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nx._clear_cache(R) |
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return R |
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def dinitz_impl(G, s, t, capacity, residual, cutoff): |
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if s not in G: |
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raise nx.NetworkXError(f"node {str(s)} not in graph") |
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if t not in G: |
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raise nx.NetworkXError(f"node {str(t)} not in graph") |
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if s == t: |
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raise nx.NetworkXError("source and sink are the same node") |
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if residual is None: |
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R = build_residual_network(G, capacity) |
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else: |
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R = residual |
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for u in R: |
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for e in R[u].values(): |
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e["flow"] = 0 |
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INF = R.graph["inf"] |
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if cutoff is None: |
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cutoff = INF |
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R_succ = R.succ |
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R_pred = R.pred |
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def breath_first_search(): |
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parents = {} |
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vertex_dist = {s: 0} |
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queue = deque([(s, 0)]) |
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while queue: |
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if t in parents: |
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break |
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u, dist = queue.popleft() |
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for v, attr in R_succ[u].items(): |
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if attr["capacity"] - attr["flow"] > 0: |
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if v in parents: |
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if vertex_dist[v] == dist + 1: |
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parents[v].append(u) |
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else: |
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parents[v] = deque([u]) |
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vertex_dist[v] = dist + 1 |
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queue.append((v, dist + 1)) |
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return parents |
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def depth_first_search(parents): |
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"""Build a path using DFS starting from the sink""" |
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total_flow = 0 |
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u = t |
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path = [u] |
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while True: |
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if len(parents[u]) > 0: |
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v = parents[u][0] |
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path.append(v) |
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else: |
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path.pop() |
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if len(path) == 0: |
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break |
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v = path[-1] |
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parents[v].popleft() |
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if v == s: |
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flow = INF |
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for u, v in pairwise(path): |
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flow = min(flow, R_pred[u][v]["capacity"] - R_pred[u][v]["flow"]) |
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for u, v in pairwise(reversed(path)): |
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R_pred[v][u]["flow"] += flow |
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R_pred[u][v]["flow"] -= flow |
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if R_pred[v][u]["capacity"] - R_pred[v][u]["flow"] == 0: |
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parents[v].popleft() |
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while path[-1] != v: |
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path.pop() |
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total_flow += flow |
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v = path[-1] |
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u = v |
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return total_flow |
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flow_value = 0 |
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while flow_value < cutoff: |
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parents = breath_first_search() |
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if t not in parents: |
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break |
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this_flow = depth_first_search(parents) |
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if this_flow * 2 > INF: |
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raise nx.NetworkXUnbounded("Infinite capacity path, flow unbounded above.") |
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flow_value += this_flow |
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R.graph["flow_value"] = flow_value |
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return R |
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