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view env/lib/python3.9/site-packages/networkx/algorithms/bipartite/projection.py @ 0:4f3585e2f14b draft default tip
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| author | shellac |
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| date | Mon, 22 Mar 2021 18:12:50 +0000 |
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"""One-mode (unipartite) projections of bipartite graphs.""" import networkx as nx from networkx.utils import not_implemented_for __all__ = [ "project", "projected_graph", "weighted_projected_graph", "collaboration_weighted_projected_graph", "overlap_weighted_projected_graph", "generic_weighted_projected_graph", ] def projected_graph(B, nodes, multigraph=False): r"""Returns the projection of B onto one of its node sets. Returns the graph G that is the projection of the bipartite graph B onto the specified nodes. They retain their attributes and are connected in G if they have a common neighbor in B. Parameters ---------- B : NetworkX graph The input graph should be bipartite. nodes : list or iterable Nodes to project onto (the "bottom" nodes). multigraph: bool (default=False) If True return a multigraph where the multiple edges represent multiple shared neighbors. They edge key in the multigraph is assigned to the label of the neighbor. Returns ------- Graph : NetworkX graph or multigraph A graph that is the projection onto the given nodes. Examples -------- >>> from networkx.algorithms import bipartite >>> B = nx.path_graph(4) >>> G = bipartite.projected_graph(B, [1, 3]) >>> list(G) [1, 3] >>> list(G.edges()) [(1, 3)] If nodes `a`, and `b` are connected through both nodes 1 and 2 then building a multigraph results in two edges in the projection onto [`a`, `b`]: >>> B = nx.Graph() >>> B.add_edges_from([("a", 1), ("b", 1), ("a", 2), ("b", 2)]) >>> G = bipartite.projected_graph(B, ["a", "b"], multigraph=True) >>> print([sorted((u, v)) for u, v in G.edges()]) [['a', 'b'], ['a', 'b']] Notes ----- No attempt is made to verify that the input graph B is bipartite. Returns a simple graph that is the projection of the bipartite graph B onto the set of nodes given in list nodes. If multigraph=True then a multigraph is returned with an edge for every shared neighbor. Directed graphs are allowed as input. The output will also then be a directed graph with edges if there is a directed path between the nodes. The graph and node properties are (shallow) copied to the projected graph. See :mod:`bipartite documentation <networkx.algorithms.bipartite>` for further details on how bipartite graphs are handled in NetworkX. See Also -------- is_bipartite, is_bipartite_node_set, sets, weighted_projected_graph, collaboration_weighted_projected_graph, overlap_weighted_projected_graph, generic_weighted_projected_graph """ if B.is_multigraph(): raise nx.NetworkXError("not defined for multigraphs") if B.is_directed(): directed = True if multigraph: G = nx.MultiDiGraph() else: G = nx.DiGraph() else: directed = False if multigraph: G = nx.MultiGraph() else: G = nx.Graph() G.graph.update(B.graph) G.add_nodes_from((n, B.nodes[n]) for n in nodes) for u in nodes: nbrs2 = {v for nbr in B[u] for v in B[nbr] if v != u} if multigraph: for n in nbrs2: if directed: links = set(B[u]) & set(B.pred[n]) else: links = set(B[u]) & set(B[n]) for l in links: if not G.has_edge(u, n, l): G.add_edge(u, n, key=l) else: G.add_edges_from((u, n) for n in nbrs2) return G @not_implemented_for("multigraph") def weighted_projected_graph(B, nodes, ratio=False): r"""Returns a weighted projection of B onto one of its node sets. The weighted projected graph is the projection of the bipartite network B onto the specified nodes with weights representing the number of shared neighbors or the ratio between actual shared neighbors and possible shared neighbors if ``ratio is True`` [1]_. The nodes retain their attributes and are connected in the resulting graph if they have an edge to a common node in the original graph. Parameters ---------- B : NetworkX graph The input graph should be bipartite. nodes : list or iterable Nodes to project onto (the "bottom" nodes). ratio: Bool (default=False) If True, edge weight is the ratio between actual shared neighbors and maximum possible shared neighbors (i.e., the size of the other node set). If False, edges weight is the number of shared neighbors. Returns ------- Graph : NetworkX graph A graph that is the projection onto the given nodes. Examples -------- >>> from networkx.algorithms import bipartite >>> B = nx.path_graph(4) >>> G = bipartite.weighted_projected_graph(B, [1, 3]) >>> list(G) [1, 3] >>> list(G.edges(data=True)) [(1, 3, {'weight': 1})] >>> G = bipartite.weighted_projected_graph(B, [1, 3], ratio=True) >>> list(G.edges(data=True)) [(1, 3, {'weight': 0.5})] Notes ----- No attempt is made to verify that the input graph B is bipartite. The graph and node properties are (shallow) copied to the projected graph. See :mod:`bipartite documentation <networkx.algorithms.bipartite>` for further details on how bipartite graphs are handled in NetworkX. See Also -------- is_bipartite, is_bipartite_node_set, sets, collaboration_weighted_projected_graph, overlap_weighted_projected_graph, generic_weighted_projected_graph projected_graph References ---------- .. [1] Borgatti, S.P. and Halgin, D. In press. "Analyzing Affiliation Networks". In Carrington, P. and Scott, J. (eds) The Sage Handbook of Social Network Analysis. Sage Publications. """ if B.is_directed(): pred = B.pred G = nx.DiGraph() else: pred = B.adj G = nx.Graph() G.graph.update(B.graph) G.add_nodes_from((n, B.nodes[n]) for n in nodes) n_top = float(len(B) - len(nodes)) for u in nodes: unbrs = set(B[u]) nbrs2 = {n for nbr in unbrs for n in B[nbr]} - {u} for v in nbrs2: vnbrs = set(pred[v]) common = unbrs & vnbrs if not ratio: weight = len(common) else: weight = len(common) / n_top G.add_edge(u, v, weight=weight) return G @not_implemented_for("multigraph") def collaboration_weighted_projected_graph(B, nodes): r"""Newman's weighted projection of B onto one of its node sets. The collaboration weighted projection is the projection of the bipartite network B onto the specified nodes with weights assigned using Newman's collaboration model [1]_: .. math:: w_{u, v} = \sum_k \frac{\delta_{u}^{k} \delta_{v}^{k}}{d_k - 1} where `u` and `v` are nodes from the bottom bipartite node set, and `k` is a node of the top node set. The value `d_k` is the degree of node `k` in the bipartite network and `\delta_{u}^{k}` is 1 if node `u` is linked to node `k` in the original bipartite graph or 0 otherwise. The nodes retain their attributes and are connected in the resulting graph if have an edge to a common node in the original bipartite graph. Parameters ---------- B : NetworkX graph The input graph should be bipartite. nodes : list or iterable Nodes to project onto (the "bottom" nodes). Returns ------- Graph : NetworkX graph A graph that is the projection onto the given nodes. Examples -------- >>> from networkx.algorithms import bipartite >>> B = nx.path_graph(5) >>> B.add_edge(1, 5) >>> G = bipartite.collaboration_weighted_projected_graph(B, [0, 2, 4, 5]) >>> list(G) [0, 2, 4, 5] >>> for edge in sorted(G.edges(data=True)): ... print(edge) ... (0, 2, {'weight': 0.5}) (0, 5, {'weight': 0.5}) (2, 4, {'weight': 1.0}) (2, 5, {'weight': 0.5}) Notes ----- No attempt is made to verify that the input graph B is bipartite. The graph and node properties are (shallow) copied to the projected graph. See :mod:`bipartite documentation <networkx.algorithms.bipartite>` for further details on how bipartite graphs are handled in NetworkX. See Also -------- is_bipartite, is_bipartite_node_set, sets, weighted_projected_graph, overlap_weighted_projected_graph, generic_weighted_projected_graph, projected_graph References ---------- .. [1] Scientific collaboration networks: II. Shortest paths, weighted networks, and centrality, M. E. J. Newman, Phys. Rev. E 64, 016132 (2001). """ if B.is_directed(): pred = B.pred G = nx.DiGraph() else: pred = B.adj G = nx.Graph() G.graph.update(B.graph) G.add_nodes_from((n, B.nodes[n]) for n in nodes) for u in nodes: unbrs = set(B[u]) nbrs2 = {n for nbr in unbrs for n in B[nbr] if n != u} for v in nbrs2: vnbrs = set(pred[v]) common_degree = (len(B[n]) for n in unbrs & vnbrs) weight = sum(1.0 / (deg - 1) for deg in common_degree if deg > 1) G.add_edge(u, v, weight=weight) return G @not_implemented_for("multigraph") def overlap_weighted_projected_graph(B, nodes, jaccard=True): r"""Overlap weighted projection of B onto one of its node sets. The overlap weighted projection is the projection of the bipartite network B onto the specified nodes with weights representing the Jaccard index between the neighborhoods of the two nodes in the original bipartite network [1]_: .. math:: w_{v, u} = \frac{|N(u) \cap N(v)|}{|N(u) \cup N(v)|} or if the parameter 'jaccard' is False, the fraction of common neighbors by minimum of both nodes degree in the original bipartite graph [1]_: .. math:: w_{v, u} = \frac{|N(u) \cap N(v)|}{min(|N(u)|, |N(v)|)} The nodes retain their attributes and are connected in the resulting graph if have an edge to a common node in the original bipartite graph. Parameters ---------- B : NetworkX graph The input graph should be bipartite. nodes : list or iterable Nodes to project onto (the "bottom" nodes). jaccard: Bool (default=True) Returns ------- Graph : NetworkX graph A graph that is the projection onto the given nodes. Examples -------- >>> from networkx.algorithms import bipartite >>> B = nx.path_graph(5) >>> nodes = [0, 2, 4] >>> G = bipartite.overlap_weighted_projected_graph(B, nodes) >>> list(G) [0, 2, 4] >>> list(G.edges(data=True)) [(0, 2, {'weight': 0.5}), (2, 4, {'weight': 0.5})] >>> G = bipartite.overlap_weighted_projected_graph(B, nodes, jaccard=False) >>> list(G.edges(data=True)) [(0, 2, {'weight': 1.0}), (2, 4, {'weight': 1.0})] Notes ----- No attempt is made to verify that the input graph B is bipartite. The graph and node properties are (shallow) copied to the projected graph. See :mod:`bipartite documentation <networkx.algorithms.bipartite>` for further details on how bipartite graphs are handled in NetworkX. See Also -------- is_bipartite, is_bipartite_node_set, sets, weighted_projected_graph, collaboration_weighted_projected_graph, generic_weighted_projected_graph, projected_graph References ---------- .. [1] Borgatti, S.P. and Halgin, D. In press. Analyzing Affiliation Networks. In Carrington, P. and Scott, J. (eds) The Sage Handbook of Social Network Analysis. Sage Publications. """ if B.is_directed(): pred = B.pred G = nx.DiGraph() else: pred = B.adj G = nx.Graph() G.graph.update(B.graph) G.add_nodes_from((n, B.nodes[n]) for n in nodes) for u in nodes: unbrs = set(B[u]) nbrs2 = {n for nbr in unbrs for n in B[nbr]} - {u} for v in nbrs2: vnbrs = set(pred[v]) if jaccard: wt = float(len(unbrs & vnbrs)) / len(unbrs | vnbrs) else: wt = float(len(unbrs & vnbrs)) / min(len(unbrs), len(vnbrs)) G.add_edge(u, v, weight=wt) return G @not_implemented_for("multigraph") def generic_weighted_projected_graph(B, nodes, weight_function=None): r"""Weighted projection of B with a user-specified weight function. The bipartite network B is projected on to the specified nodes with weights computed by a user-specified function. This function must accept as a parameter the neighborhood sets of two nodes and return an integer or a float. The nodes retain their attributes and are connected in the resulting graph if they have an edge to a common node in the original graph. Parameters ---------- B : NetworkX graph The input graph should be bipartite. nodes : list or iterable Nodes to project onto (the "bottom" nodes). weight_function : function This function must accept as parameters the same input graph that this function, and two nodes; and return an integer or a float. The default function computes the number of shared neighbors. Returns ------- Graph : NetworkX graph A graph that is the projection onto the given nodes. Examples -------- >>> from networkx.algorithms import bipartite >>> # Define some custom weight functions >>> def jaccard(G, u, v): ... unbrs = set(G[u]) ... vnbrs = set(G[v]) ... return float(len(unbrs & vnbrs)) / len(unbrs | vnbrs) ... >>> def my_weight(G, u, v, weight="weight"): ... w = 0 ... for nbr in set(G[u]) & set(G[v]): ... w += G[u][nbr].get(weight, 1) + G[v][nbr].get(weight, 1) ... return w ... >>> # A complete bipartite graph with 4 nodes and 4 edges >>> B = nx.complete_bipartite_graph(2, 2) >>> # Add some arbitrary weight to the edges >>> for i, (u, v) in enumerate(B.edges()): ... B.edges[u, v]["weight"] = i + 1 ... >>> for edge in B.edges(data=True): ... print(edge) ... (0, 2, {'weight': 1}) (0, 3, {'weight': 2}) (1, 2, {'weight': 3}) (1, 3, {'weight': 4}) >>> # By default, the weight is the number of shared neighbors >>> G = bipartite.generic_weighted_projected_graph(B, [0, 1]) >>> print(list(G.edges(data=True))) [(0, 1, {'weight': 2})] >>> # To specify a custom weight function use the weight_function parameter >>> G = bipartite.generic_weighted_projected_graph( ... B, [0, 1], weight_function=jaccard ... ) >>> print(list(G.edges(data=True))) [(0, 1, {'weight': 1.0})] >>> G = bipartite.generic_weighted_projected_graph( ... B, [0, 1], weight_function=my_weight ... ) >>> print(list(G.edges(data=True))) [(0, 1, {'weight': 10})] Notes ----- No attempt is made to verify that the input graph B is bipartite. The graph and node properties are (shallow) copied to the projected graph. See :mod:`bipartite documentation <networkx.algorithms.bipartite>` for further details on how bipartite graphs are handled in NetworkX. See Also -------- is_bipartite, is_bipartite_node_set, sets, weighted_projected_graph, collaboration_weighted_projected_graph, overlap_weighted_projected_graph, projected_graph """ if B.is_directed(): pred = B.pred G = nx.DiGraph() else: pred = B.adj G = nx.Graph() if weight_function is None: def weight_function(G, u, v): # Notice that we use set(pred[v]) for handling the directed case. return len(set(G[u]) & set(pred[v])) G.graph.update(B.graph) G.add_nodes_from((n, B.nodes[n]) for n in nodes) for u in nodes: nbrs2 = {n for nbr in set(B[u]) for n in B[nbr]} - {u} for v in nbrs2: weight = weight_function(B, u, v) G.add_edge(u, v, weight=weight) return G def project(B, nodes, create_using=None): return projected_graph(B, nodes)