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"""Laplacian matrix of graphs. |
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""" |
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import networkx as nx |
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from networkx.utils import not_implemented_for |
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__all__ = [ |
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"laplacian_matrix", |
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"normalized_laplacian_matrix", |
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"total_spanning_tree_weight", |
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"directed_laplacian_matrix", |
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"directed_combinatorial_laplacian_matrix", |
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] |
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@not_implemented_for("directed") |
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@nx._dispatch(edge_attrs="weight") |
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def laplacian_matrix(G, nodelist=None, weight="weight"): |
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"""Returns the Laplacian matrix of G. |
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The graph Laplacian is the matrix L = D - A, where |
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A is the adjacency matrix and D is the diagonal matrix of node degrees. |
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Parameters |
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---------- |
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G : graph |
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A NetworkX graph |
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nodelist : list, optional |
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The rows and columns are ordered according to the nodes in nodelist. |
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If nodelist is None, then the ordering is produced by G.nodes(). |
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weight : string or None, optional (default='weight') |
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The edge data key used to compute each value in the matrix. |
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If None, then each edge has weight 1. |
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Returns |
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------- |
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L : SciPy sparse array |
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The Laplacian matrix of G. |
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Notes |
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----- |
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For MultiGraph, the edges weights are summed. |
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See Also |
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-------- |
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:func:`~networkx.convert_matrix.to_numpy_array` |
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normalized_laplacian_matrix |
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:func:`~networkx.linalg.spectrum.laplacian_spectrum` |
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Examples |
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-------- |
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For graphs with multiple connected components, L is permutation-similar |
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to a block diagonal matrix where each block is the respective Laplacian |
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matrix for each component. |
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>>> G = nx.Graph([(1, 2), (2, 3), (4, 5)]) |
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>>> print(nx.laplacian_matrix(G).toarray()) |
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[[ 1 -1 0 0 0] |
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[-1 2 -1 0 0] |
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[ 0 -1 1 0 0] |
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[ 0 0 0 1 -1] |
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[ 0 0 0 -1 1]] |
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""" |
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import scipy as sp |
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if nodelist is None: |
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nodelist = list(G) |
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A = nx.to_scipy_sparse_array(G, nodelist=nodelist, weight=weight, format="csr") |
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n, m = A.shape |
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D = sp.sparse.csr_array(sp.sparse.spdiags(A.sum(axis=1), 0, m, n, format="csr")) |
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return D - A |
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@not_implemented_for("directed") |
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@nx._dispatch(edge_attrs="weight") |
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def normalized_laplacian_matrix(G, nodelist=None, weight="weight"): |
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r"""Returns the normalized Laplacian matrix of G. |
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The normalized graph Laplacian is the matrix |
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.. math:: |
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N = D^{-1/2} L D^{-1/2} |
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where `L` is the graph Laplacian and `D` is the diagonal matrix of |
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node degrees [1]_. |
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Parameters |
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---------- |
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G : graph |
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A NetworkX graph |
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nodelist : list, optional |
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The rows and columns are ordered according to the nodes in nodelist. |
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If nodelist is None, then the ordering is produced by G.nodes(). |
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weight : string or None, optional (default='weight') |
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The edge data key used to compute each value in the matrix. |
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If None, then each edge has weight 1. |
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Returns |
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------- |
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N : SciPy sparse array |
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The normalized Laplacian matrix of G. |
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Notes |
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----- |
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For MultiGraph, the edges weights are summed. |
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See :func:`to_numpy_array` for other options. |
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If the Graph contains selfloops, D is defined as ``diag(sum(A, 1))``, where A is |
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the adjacency matrix [2]_. |
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See Also |
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-------- |
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laplacian_matrix |
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normalized_laplacian_spectrum |
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References |
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---------- |
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.. [1] Fan Chung-Graham, Spectral Graph Theory, |
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CBMS Regional Conference Series in Mathematics, Number 92, 1997. |
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.. [2] Steve Butler, Interlacing For Weighted Graphs Using The Normalized |
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Laplacian, Electronic Journal of Linear Algebra, Volume 16, pp. 90-98, |
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March 2007. |
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""" |
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import numpy as np |
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import scipy as sp |
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if nodelist is None: |
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nodelist = list(G) |
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A = nx.to_scipy_sparse_array(G, nodelist=nodelist, weight=weight, format="csr") |
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n, m = A.shape |
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diags = A.sum(axis=1) |
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D = sp.sparse.csr_array(sp.sparse.spdiags(diags, 0, m, n, format="csr")) |
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L = D - A |
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with np.errstate(divide="ignore"): |
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diags_sqrt = 1.0 / np.sqrt(diags) |
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diags_sqrt[np.isinf(diags_sqrt)] = 0 |
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DH = sp.sparse.csr_array(sp.sparse.spdiags(diags_sqrt, 0, m, n, format="csr")) |
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return DH @ (L @ DH) |
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@nx._dispatch(edge_attrs="weight") |
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def total_spanning_tree_weight(G, weight=None): |
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""" |
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Returns the total weight of all spanning trees of `G`. |
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Kirchoff's Tree Matrix Theorem states that the determinant of any cofactor of the |
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Laplacian matrix of a graph is the number of spanning trees in the graph. For a |
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weighted Laplacian matrix, it is the sum across all spanning trees of the |
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multiplicative weight of each tree. That is, the weight of each tree is the |
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product of its edge weights. |
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Parameters |
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---------- |
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G : NetworkX Graph |
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The graph to use Kirchhoff's theorem on. |
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weight : string or None |
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The key for the edge attribute holding the edge weight. If `None`, then |
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each edge is assumed to have a weight of 1 and this function returns the |
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total number of spanning trees in `G`. |
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Returns |
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------- |
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float |
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The sum of the total multiplicative weights for all spanning trees in `G` |
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""" |
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import numpy as np |
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G_laplacian = nx.laplacian_matrix(G, weight=weight).toarray() |
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return abs(np.linalg.det(G_laplacian[1:, 1:])) |
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@not_implemented_for("undirected") |
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@not_implemented_for("multigraph") |
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@nx._dispatch(edge_attrs="weight") |
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def directed_laplacian_matrix( |
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G, nodelist=None, weight="weight", walk_type=None, alpha=0.95 |
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): |
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r"""Returns the directed Laplacian matrix of G. |
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The graph directed Laplacian is the matrix |
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.. math:: |
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L = I - (\Phi^{1/2} P \Phi^{-1/2} + \Phi^{-1/2} P^T \Phi^{1/2} ) / 2 |
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where `I` is the identity matrix, `P` is the transition matrix of the |
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graph, and `\Phi` a matrix with the Perron vector of `P` in the diagonal and |
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zeros elsewhere [1]_. |
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Depending on the value of walk_type, `P` can be the transition matrix |
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induced by a random walk, a lazy random walk, or a random walk with |
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teleportation (PageRank). |
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Parameters |
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---------- |
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G : DiGraph |
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A NetworkX graph |
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nodelist : list, optional |
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The rows and columns are ordered according to the nodes in nodelist. |
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If nodelist is None, then the ordering is produced by G.nodes(). |
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weight : string or None, optional (default='weight') |
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The edge data key used to compute each value in the matrix. |
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If None, then each edge has weight 1. |
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walk_type : string or None, optional (default=None) |
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If None, `P` is selected depending on the properties of the |
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graph. Otherwise is one of 'random', 'lazy', or 'pagerank' |
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alpha : real |
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(1 - alpha) is the teleportation probability used with pagerank |
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Returns |
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------- |
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L : NumPy matrix |
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Normalized Laplacian of G. |
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Notes |
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----- |
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Only implemented for DiGraphs |
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See Also |
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-------- |
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laplacian_matrix |
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References |
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---------- |
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.. [1] Fan Chung (2005). |
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Laplacians and the Cheeger inequality for directed graphs. |
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Annals of Combinatorics, 9(1), 2005 |
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""" |
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import numpy as np |
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import scipy as sp |
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P = _transition_matrix( |
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G, nodelist=nodelist, weight=weight, walk_type=walk_type, alpha=alpha |
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) |
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n, m = P.shape |
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evals, evecs = sp.sparse.linalg.eigs(P.T, k=1) |
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v = evecs.flatten().real |
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p = v / v.sum() |
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sqrtp = np.sqrt(np.abs(p)) |
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Q = ( |
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sp.sparse.csr_array(sp.sparse.spdiags(sqrtp, 0, n, n)) |
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@ P |
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@ sp.sparse.csr_array(sp.sparse.spdiags(1.0 / sqrtp, 0, n, n)) |
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) |
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I = np.identity(len(G)) |
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return I - (Q + Q.T) / 2.0 |
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@not_implemented_for("undirected") |
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@not_implemented_for("multigraph") |
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@nx._dispatch(edge_attrs="weight") |
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def directed_combinatorial_laplacian_matrix( |
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G, nodelist=None, weight="weight", walk_type=None, alpha=0.95 |
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): |
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r"""Return the directed combinatorial Laplacian matrix of G. |
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The graph directed combinatorial Laplacian is the matrix |
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.. math:: |
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L = \Phi - (\Phi P + P^T \Phi) / 2 |
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where `P` is the transition matrix of the graph and `\Phi` a matrix |
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with the Perron vector of `P` in the diagonal and zeros elsewhere [1]_. |
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Depending on the value of walk_type, `P` can be the transition matrix |
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induced by a random walk, a lazy random walk, or a random walk with |
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teleportation (PageRank). |
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Parameters |
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---------- |
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G : DiGraph |
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A NetworkX graph |
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nodelist : list, optional |
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The rows and columns are ordered according to the nodes in nodelist. |
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If nodelist is None, then the ordering is produced by G.nodes(). |
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weight : string or None, optional (default='weight') |
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The edge data key used to compute each value in the matrix. |
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If None, then each edge has weight 1. |
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walk_type : string or None, optional (default=None) |
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If None, `P` is selected depending on the properties of the |
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graph. Otherwise is one of 'random', 'lazy', or 'pagerank' |
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alpha : real |
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(1 - alpha) is the teleportation probability used with pagerank |
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Returns |
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------- |
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L : NumPy matrix |
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Combinatorial Laplacian of G. |
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Notes |
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----- |
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Only implemented for DiGraphs |
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See Also |
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-------- |
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laplacian_matrix |
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References |
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---------- |
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.. [1] Fan Chung (2005). |
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Laplacians and the Cheeger inequality for directed graphs. |
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Annals of Combinatorics, 9(1), 2005 |
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""" |
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import scipy as sp |
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P = _transition_matrix( |
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G, nodelist=nodelist, weight=weight, walk_type=walk_type, alpha=alpha |
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) |
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n, m = P.shape |
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evals, evecs = sp.sparse.linalg.eigs(P.T, k=1) |
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v = evecs.flatten().real |
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p = v / v.sum() |
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Phi = sp.sparse.csr_array(sp.sparse.spdiags(p, 0, n, n)).toarray() |
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return Phi - (Phi @ P + P.T @ Phi) / 2.0 |
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def _transition_matrix(G, nodelist=None, weight="weight", walk_type=None, alpha=0.95): |
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"""Returns the transition matrix of G. |
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This is a row stochastic giving the transition probabilities while |
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performing a random walk on the graph. Depending on the value of walk_type, |
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P can be the transition matrix induced by a random walk, a lazy random walk, |
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or a random walk with teleportation (PageRank). |
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Parameters |
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---------- |
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G : DiGraph |
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A NetworkX graph |
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nodelist : list, optional |
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The rows and columns are ordered according to the nodes in nodelist. |
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If nodelist is None, then the ordering is produced by G.nodes(). |
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weight : string or None, optional (default='weight') |
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The edge data key used to compute each value in the matrix. |
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If None, then each edge has weight 1. |
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walk_type : string or None, optional (default=None) |
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If None, `P` is selected depending on the properties of the |
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graph. Otherwise is one of 'random', 'lazy', or 'pagerank' |
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alpha : real |
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(1 - alpha) is the teleportation probability used with pagerank |
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Returns |
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------- |
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P : numpy.ndarray |
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transition matrix of G. |
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Raises |
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------ |
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NetworkXError |
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If walk_type not specified or alpha not in valid range |
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""" |
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import numpy as np |
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import scipy as sp |
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if walk_type is None: |
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if nx.is_strongly_connected(G): |
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if nx.is_aperiodic(G): |
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walk_type = "random" |
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else: |
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walk_type = "lazy" |
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else: |
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walk_type = "pagerank" |
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A = nx.to_scipy_sparse_array(G, nodelist=nodelist, weight=weight, dtype=float) |
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n, m = A.shape |
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if walk_type in ["random", "lazy"]: |
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DI = sp.sparse.csr_array(sp.sparse.spdiags(1.0 / A.sum(axis=1), 0, n, n)) |
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if walk_type == "random": |
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P = DI @ A |
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else: |
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I = sp.sparse.csr_array(sp.sparse.identity(n)) |
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P = (I + DI @ A) / 2.0 |
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elif walk_type == "pagerank": |
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if not (0 < alpha < 1): |
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raise nx.NetworkXError("alpha must be between 0 and 1") |
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A = A.toarray() |
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A[A.sum(axis=1) == 0, :] = 1 / n |
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A = A / A.sum(axis=1)[np.newaxis, :].T |
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P = alpha * A + (1 - alpha) / n |
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else: |
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raise nx.NetworkXError("walk_type must be random, lazy, or pagerank") |
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return P |
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