119 lines
4.1 KiB
Python
119 lines
4.1 KiB
Python
"""Functions for computing rich-club coefficients."""
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import networkx as nx
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from itertools import accumulate
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from networkx.utils import not_implemented_for
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__all__ = ["rich_club_coefficient"]
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@not_implemented_for("directed")
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@not_implemented_for("multigraph")
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def rich_club_coefficient(G, normalized=True, Q=100, seed=None):
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r"""Returns the rich-club coefficient of the graph `G`.
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For each degree *k*, the *rich-club coefficient* is the ratio of the
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number of actual to the number of potential edges for nodes with
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degree greater than *k*:
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.. math::
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\phi(k) = \frac{2 E_k}{N_k (N_k - 1)}
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where `N_k` is the number of nodes with degree larger than *k*, and
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`E_k` is the number of edges among those nodes.
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Parameters
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----------
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G : NetworkX graph
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Undirected graph with neither parallel edges nor self-loops.
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normalized : bool (optional)
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Normalize using randomized network as in [1]_
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Q : float (optional, default=100)
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If `normalized` is True, perform `Q * m` double-edge
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swaps, where `m` is the number of edges in `G`, to use as a
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null-model for normalization.
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seed : integer, random_state, or None (default)
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Indicator of random number generation state.
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See :ref:`Randomness<randomness>`.
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Returns
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-------
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rc : dictionary
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A dictionary, keyed by degree, with rich-club coefficient values.
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Examples
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--------
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>>> G = nx.Graph([(0, 1), (0, 2), (1, 2), (1, 3), (1, 4), (4, 5)])
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>>> rc = nx.rich_club_coefficient(G, normalized=False, seed=42)
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>>> rc[0]
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0.4
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Notes
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-----
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The rich club definition and algorithm are found in [1]_. This
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algorithm ignores any edge weights and is not defined for directed
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graphs or graphs with parallel edges or self loops.
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Estimates for appropriate values of `Q` are found in [2]_.
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References
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----------
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.. [1] Julian J. McAuley, Luciano da Fontoura Costa,
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and Tibério S. Caetano,
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"The rich-club phenomenon across complex network hierarchies",
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Applied Physics Letters Vol 91 Issue 8, August 2007.
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https://arxiv.org/abs/physics/0701290
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.. [2] R. Milo, N. Kashtan, S. Itzkovitz, M. E. J. Newman, U. Alon,
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"Uniform generation of random graphs with arbitrary degree
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sequences", 2006. https://arxiv.org/abs/cond-mat/0312028
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"""
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if nx.number_of_selfloops(G) > 0:
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raise Exception(
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"rich_club_coefficient is not implemented for " "graphs with self loops."
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)
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rc = _compute_rc(G)
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if normalized:
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# make R a copy of G, randomize with Q*|E| double edge swaps
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# and use rich_club coefficient of R to normalize
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R = G.copy()
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E = R.number_of_edges()
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nx.double_edge_swap(R, Q * E, max_tries=Q * E * 10, seed=seed)
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rcran = _compute_rc(R)
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rc = {k: v / rcran[k] for k, v in rc.items()}
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return rc
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def _compute_rc(G):
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"""Returns the rich-club coefficient for each degree in the graph
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`G`.
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`G` is an undirected graph without multiedges.
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Returns a dictionary mapping degree to rich-club coefficient for
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that degree.
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"""
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deghist = nx.degree_histogram(G)
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total = sum(deghist)
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# Compute the number of nodes with degree greater than `k`, for each
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# degree `k` (omitting the last entry, which is zero).
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nks = (total - cs for cs in accumulate(deghist) if total - cs > 1)
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# Create a sorted list of pairs of edge endpoint degrees.
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#
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# The list is sorted in reverse order so that we can pop from the
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# right side of the list later, instead of popping from the left
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# side of the list, which would have a linear time cost.
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edge_degrees = sorted((sorted(map(G.degree, e)) for e in G.edges()), reverse=True)
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ek = G.number_of_edges()
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k1, k2 = edge_degrees.pop()
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rc = {}
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for d, nk in enumerate(nks):
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while k1 <= d:
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if len(edge_degrees) == 0:
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ek = 0
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break
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k1, k2 = edge_degrees.pop()
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ek -= 1
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rc[d] = 2 * ek / (nk * (nk - 1))
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return rc
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