# -*- coding: utf-8 -*- """Algorithms for spectral clustering""" # Author: Gael Varoquaux gael.varoquaux@normalesup.org # Brian Cheung # Wei LI # License: BSD 3 clause import warnings import numpy as np from ..base import BaseEstimator, ClusterMixin from ..utils import check_random_state, as_float_array from ..utils.validation import check_array from ..metrics.pairwise import pairwise_kernels from ..neighbors import kneighbors_graph from ..manifold import spectral_embedding from .k_means_ import k_means def discretize(vectors, copy=True, max_svd_restarts=30, n_iter_max=20, random_state=None): """Search for a partition matrix (clustering) which is closest to the eigenvector embedding. Parameters ---------- vectors : array-like, shape: (n_samples, n_clusters) The embedding space of the samples. copy : boolean, optional, default: True Whether to copy vectors, or perform in-place normalization. max_svd_restarts : int, optional, default: 30 Maximum number of attempts to restart SVD if convergence fails n_iter_max : int, optional, default: 30 Maximum number of iterations to attempt in rotation and partition matrix search if machine precision convergence is not reached random_state : int, RandomState instance or None, optional, default: None If int, random_state is the seed used by the random number generator; If RandomState instance, random_state is the random number generator; If None, the random number generator is the RandomState instance used by `np.random`. Returns ------- labels : array of integers, shape: n_samples The labels of the clusters. References ---------- - Multiclass spectral clustering, 2003 Stella X. Yu, Jianbo Shi http://www1.icsi.berkeley.edu/~stellayu/publication/doc/2003kwayICCV.pdf Notes ----- The eigenvector embedding is used to iteratively search for the closest discrete partition. First, the eigenvector embedding is normalized to the space of partition matrices. An optimal discrete partition matrix closest to this normalized embedding multiplied by an initial rotation is calculated. Fixing this discrete partition matrix, an optimal rotation matrix is calculated. These two calculations are performed until convergence. The discrete partition matrix is returned as the clustering solution. Used in spectral clustering, this method tends to be faster and more robust to random initialization than k-means. """ from scipy.sparse import csc_matrix from scipy.linalg import LinAlgError random_state = check_random_state(random_state) vectors = as_float_array(vectors, copy=copy) eps = np.finfo(float).eps n_samples, n_components = vectors.shape # Normalize the eigenvectors to an equal length of a vector of ones. # Reorient the eigenvectors to point in the negative direction with respect # to the first element. This may have to do with constraining the # eigenvectors to lie in a specific quadrant to make the discretization # search easier. norm_ones = np.sqrt(n_samples) for i in range(vectors.shape[1]): vectors[:, i] = (vectors[:, i] / np.linalg.norm(vectors[:, i])) \ * norm_ones if vectors[0, i] != 0: vectors[:, i] = -1 * vectors[:, i] * np.sign(vectors[0, i]) # Normalize the rows of the eigenvectors. Samples should lie on the unit # hypersphere centered at the origin. This transforms the samples in the # embedding space to the space of partition matrices. vectors = vectors / np.sqrt((vectors ** 2).sum(axis=1))[:, np.newaxis] svd_restarts = 0 has_converged = False # If there is an exception we try to randomize and rerun SVD again # do this max_svd_restarts times. while (svd_restarts < max_svd_restarts) and not has_converged: # Initialize first column of rotation matrix with a row of the # eigenvectors rotation = np.zeros((n_components, n_components)) rotation[:, 0] = vectors[random_state.randint(n_samples), :].T # To initialize the rest of the rotation matrix, find the rows # of the eigenvectors that are as orthogonal to each other as # possible c = np.zeros(n_samples) for j in range(1, n_components): # Accumulate c to ensure row is as orthogonal as possible to # previous picks as well as current one c += np.abs(np.dot(vectors, rotation[:, j - 1])) rotation[:, j] = vectors[c.argmin(), :].T last_objective_value = 0.0 n_iter = 0 while not has_converged: n_iter += 1 t_discrete = np.dot(vectors, rotation) labels = t_discrete.argmax(axis=1) vectors_discrete = csc_matrix( (np.ones(len(labels)), (np.arange(0, n_samples), labels)), shape=(n_samples, n_components)) t_svd = vectors_discrete.T * vectors try: U, S, Vh = np.linalg.svd(t_svd) svd_restarts += 1 except LinAlgError: print("SVD did not converge, randomizing and trying again") break ncut_value = 2.0 * (n_samples - S.sum()) if ((abs(ncut_value - last_objective_value) < eps) or (n_iter > n_iter_max)): has_converged = True else: # otherwise calculate rotation and continue last_objective_value = ncut_value rotation = np.dot(Vh.T, U.T) if not has_converged: raise LinAlgError('SVD did not converge') return labels def spectral_clustering(affinity, n_clusters=8, n_components=None, eigen_solver=None, random_state=None, n_init=10, eigen_tol=0.0, assign_labels='kmeans'): """Apply clustering to a projection to the normalized laplacian. In practice Spectral Clustering is very useful when the structure of the individual clusters is highly non-convex or more generally when a measure of the center and spread of the cluster is not a suitable description of the complete cluster. For instance when clusters are nested circles on the 2D plan. If affinity is the adjacency matrix of a graph, this method can be used to find normalized graph cuts. Read more in the :ref:`User Guide `. Parameters ----------- affinity : array-like or sparse matrix, shape: (n_samples, n_samples) The affinity matrix describing the relationship of the samples to embed. **Must be symmetric**. Possible examples: - adjacency matrix of a graph, - heat kernel of the pairwise distance matrix of the samples, - symmetric k-nearest neighbours connectivity matrix of the samples. n_clusters : integer, optional Number of clusters to extract. n_components : integer, optional, default is n_clusters Number of eigen vectors to use for the spectral embedding eigen_solver : {None, 'arpack', 'lobpcg', or 'amg'} The eigenvalue decomposition strategy to use. AMG requires pyamg to be installed. It can be faster on very large, sparse problems, but may also lead to instabilities random_state : int, RandomState instance or None, optional, default: None A pseudo random number generator used for the initialization of the lobpcg eigen vectors decomposition when eigen_solver == 'amg' and by the K-Means initialization. If int, random_state is the seed used by the random number generator; If RandomState instance, random_state is the random number generator; If None, the random number generator is the RandomState instance used by `np.random`. n_init : int, optional, default: 10 Number of time the k-means algorithm will be run with different centroid seeds. The final results will be the best output of n_init consecutive runs in terms of inertia. eigen_tol : float, optional, default: 0.0 Stopping criterion for eigendecomposition of the Laplacian matrix when using arpack eigen_solver. assign_labels : {'kmeans', 'discretize'}, default: 'kmeans' The strategy to use to assign labels in the embedding space. There are two ways to assign labels after the laplacian embedding. k-means can be applied and is a popular choice. But it can also be sensitive to initialization. Discretization is another approach which is less sensitive to random initialization. See the 'Multiclass spectral clustering' paper referenced below for more details on the discretization approach. Returns ------- labels : array of integers, shape: n_samples The labels of the clusters. References ---------- - Normalized cuts and image segmentation, 2000 Jianbo Shi, Jitendra Malik http://citeseer.ist.psu.edu/viewdoc/summary?doi=10.1.1.160.2324 - A Tutorial on Spectral Clustering, 2007 Ulrike von Luxburg http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.165.9323 - Multiclass spectral clustering, 2003 Stella X. Yu, Jianbo Shi http://www1.icsi.berkeley.edu/~stellayu/publication/doc/2003kwayICCV.pdf Notes ------ The graph should contain only one connect component, elsewhere the results make little sense. This algorithm solves the normalized cut for k=2: it is a normalized spectral clustering. """ if assign_labels not in ('kmeans', 'discretize'): raise ValueError("The 'assign_labels' parameter should be " "'kmeans' or 'discretize', but '%s' was given" % assign_labels) random_state = check_random_state(random_state) n_components = n_clusters if n_components is None else n_components maps = spectral_embedding(affinity, n_components=n_components, eigen_solver=eigen_solver, random_state=random_state, eigen_tol=eigen_tol, drop_first=False) if assign_labels == 'kmeans': _, labels, _ = k_means(maps, n_clusters, random_state=random_state, n_init=n_init) else: labels = discretize(maps, random_state=random_state) return labels class SpectralClustering(BaseEstimator, ClusterMixin): """Apply clustering to a projection to the normalized laplacian. In practice Spectral Clustering is very useful when the structure of the individual clusters is highly non-convex or more generally when a measure of the center and spread of the cluster is not a suitable description of the complete cluster. For instance when clusters are nested circles on the 2D plan. If affinity is the adjacency matrix of a graph, this method can be used to find normalized graph cuts. When calling ``fit``, an affinity matrix is constructed using either kernel function such the Gaussian (aka RBF) kernel of the euclidean distanced ``d(X, X)``:: np.exp(-gamma * d(X,X) ** 2) or a k-nearest neighbors connectivity matrix. Alternatively, using ``precomputed``, a user-provided affinity matrix can be used. Read more in the :ref:`User Guide `. Parameters ----------- n_clusters : integer, optional The dimension of the projection subspace. eigen_solver : {None, 'arpack', 'lobpcg', or 'amg'} The eigenvalue decomposition strategy to use. AMG requires pyamg to be installed. It can be faster on very large, sparse problems, but may also lead to instabilities random_state : int, RandomState instance or None, optional, default: None A pseudo random number generator used for the initialization of the lobpcg eigen vectors decomposition when eigen_solver == 'amg' and by the K-Means initialization. If int, random_state is the seed used by the random number generator; If RandomState instance, random_state is the random number generator; If None, the random number generator is the RandomState instance used by `np.random`. n_init : int, optional, default: 10 Number of time the k-means algorithm will be run with different centroid seeds. The final results will be the best output of n_init consecutive runs in terms of inertia. gamma : float, default=1.0 Kernel coefficient for rbf, poly, sigmoid, laplacian and chi2 kernels. Ignored for ``affinity='nearest_neighbors'``. affinity : string, array-like or callable, default 'rbf' If a string, this may be one of 'nearest_neighbors', 'precomputed', 'rbf' or one of the kernels supported by `sklearn.metrics.pairwise_kernels`. Only kernels that produce similarity scores (non-negative values that increase with similarity) should be used. This property is not checked by the clustering algorithm. n_neighbors : integer Number of neighbors to use when constructing the affinity matrix using the nearest neighbors method. Ignored for ``affinity='rbf'``. eigen_tol : float, optional, default: 0.0 Stopping criterion for eigendecomposition of the Laplacian matrix when using arpack eigen_solver. assign_labels : {'kmeans', 'discretize'}, default: 'kmeans' The strategy to use to assign labels in the embedding space. There are two ways to assign labels after the laplacian embedding. k-means can be applied and is a popular choice. But it can also be sensitive to initialization. Discretization is another approach which is less sensitive to random initialization. degree : float, default=3 Degree of the polynomial kernel. Ignored by other kernels. coef0 : float, default=1 Zero coefficient for polynomial and sigmoid kernels. Ignored by other kernels. kernel_params : dictionary of string to any, optional Parameters (keyword arguments) and values for kernel passed as callable object. Ignored by other kernels. n_jobs : int, optional (default = 1) The number of parallel jobs to run. If ``-1``, then the number of jobs is set to the number of CPU cores. Attributes ---------- affinity_matrix_ : array-like, shape (n_samples, n_samples) Affinity matrix used for clustering. Available only if after calling ``fit``. labels_ : Labels of each point Notes ----- If you have an affinity matrix, such as a distance matrix, for which 0 means identical elements, and high values means very dissimilar elements, it can be transformed in a similarity matrix that is well suited for the algorithm by applying the Gaussian (RBF, heat) kernel:: np.exp(- dist_matrix ** 2 / (2. * delta ** 2)) Where ``delta`` is a free parameter representing the width of the Gaussian kernel. Another alternative is to take a symmetric version of the k nearest neighbors connectivity matrix of the points. If the pyamg package is installed, it is used: this greatly speeds up computation. References ---------- - Normalized cuts and image segmentation, 2000 Jianbo Shi, Jitendra Malik http://citeseer.ist.psu.edu/viewdoc/summary?doi=10.1.1.160.2324 - A Tutorial on Spectral Clustering, 2007 Ulrike von Luxburg http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.165.9323 - Multiclass spectral clustering, 2003 Stella X. Yu, Jianbo Shi http://www1.icsi.berkeley.edu/~stellayu/publication/doc/2003kwayICCV.pdf """ def __init__(self, n_clusters=8, eigen_solver=None, random_state=None, n_init=10, gamma=1., affinity='rbf', n_neighbors=10, eigen_tol=0.0, assign_labels='kmeans', degree=3, coef0=1, kernel_params=None, n_jobs=1): self.n_clusters = n_clusters self.eigen_solver = eigen_solver self.random_state = random_state self.n_init = n_init self.gamma = gamma self.affinity = affinity self.n_neighbors = n_neighbors self.eigen_tol = eigen_tol self.assign_labels = assign_labels self.degree = degree self.coef0 = coef0 self.kernel_params = kernel_params self.n_jobs = n_jobs def fit(self, X, y=None): """Creates an affinity matrix for X using the selected affinity, then applies spectral clustering to this affinity matrix. Parameters ---------- X : array-like or sparse matrix, shape (n_samples, n_features) OR, if affinity==`precomputed`, a precomputed affinity matrix of shape (n_samples, n_samples) y : Ignored """ X = check_array(X, accept_sparse=['csr', 'csc', 'coo'], dtype=np.float64) if X.shape[0] == X.shape[1] and self.affinity != "precomputed": warnings.warn("The spectral clustering API has changed. ``fit``" "now constructs an affinity matrix from data. To use" " a custom affinity matrix, " "set ``affinity=precomputed``.") if self.affinity == 'nearest_neighbors': connectivity = kneighbors_graph(X, n_neighbors=self.n_neighbors, include_self=True, n_jobs=self.n_jobs) self.affinity_matrix_ = 0.5 * (connectivity + connectivity.T) elif self.affinity == 'precomputed': self.affinity_matrix_ = X else: params = self.kernel_params if params is None: params = {} if not callable(self.affinity): params['gamma'] = self.gamma params['degree'] = self.degree params['coef0'] = self.coef0 self.affinity_matrix_ = pairwise_kernels(X, metric=self.affinity, filter_params=True, **params) random_state = check_random_state(self.random_state) self.labels_ = spectral_clustering(self.affinity_matrix_, n_clusters=self.n_clusters, eigen_solver=self.eigen_solver, random_state=random_state, n_init=self.n_init, eigen_tol=self.eigen_tol, assign_labels=self.assign_labels) return self @property def _pairwise(self): return self.affinity == "precomputed"