# coding=utf8 """ Label propagation in the context of this module refers to a set of semi-supervised classification algorithms. At a high level, these algorithms work by forming a fully-connected graph between all points given and solving for the steady-state distribution of labels at each point. These algorithms perform very well in practice. The cost of running can be very expensive, at approximately O(N^3) where N is the number of (labeled and unlabeled) points. The theory (why they perform so well) is motivated by intuitions from random walk algorithms and geometric relationships in the data. For more information see the references below. Model Features -------------- Label clamping: The algorithm tries to learn distributions of labels over the dataset given label assignments over an initial subset. In one variant, the algorithm does not allow for any errors in the initial assignment (hard-clamping) while in another variant, the algorithm allows for some wiggle room for the initial assignments, allowing them to change by a fraction alpha in each iteration (soft-clamping). Kernel: A function which projects a vector into some higher dimensional space. This implementation supports RBF and KNN kernels. Using the RBF kernel generates a dense matrix of size O(N^2). KNN kernel will generate a sparse matrix of size O(k*N) which will run much faster. See the documentation for SVMs for more info on kernels. Examples -------- >>> import numpy as np >>> from sklearn import datasets >>> from sklearn.semi_supervised import LabelPropagation >>> label_prop_model = LabelPropagation() >>> iris = datasets.load_iris() >>> rng = np.random.RandomState(42) >>> random_unlabeled_points = rng.rand(len(iris.target)) < 0.3 >>> labels = np.copy(iris.target) >>> labels[random_unlabeled_points] = -1 >>> label_prop_model.fit(iris.data, labels) LabelPropagation(...) Notes ----- References: [1] Yoshua Bengio, Olivier Delalleau, Nicolas Le Roux. In Semi-Supervised Learning (2006), pp. 193-216 [2] Olivier Delalleau, Yoshua Bengio, Nicolas Le Roux. Efficient Non-Parametric Function Induction in Semi-Supervised Learning. AISTAT 2005 """ # Authors: Clay Woolam # Utkarsh Upadhyay # License: BSD from abc import ABCMeta, abstractmethod import warnings import numpy as np from scipy import sparse from scipy.sparse import csgraph from ..base import BaseEstimator, ClassifierMixin from ..metrics.pairwise import rbf_kernel from ..neighbors import NearestNeighbors from ..utils.extmath import safe_sparse_dot from ..utils.multiclass import check_classification_targets from ..utils.validation import check_is_fitted, check_array from ..utils.validation import _deprecate_positional_args from ..exceptions import ConvergenceWarning class BaseLabelPropagation(ClassifierMixin, BaseEstimator, metaclass=ABCMeta): """Base class for label propagation module. Parameters ---------- kernel : {'knn', 'rbf'} or callable, default='rbf' String identifier for kernel function to use or the kernel function itself. Only 'rbf' and 'knn' strings are valid inputs. The function passed should take two inputs, each of shape (n_samples, n_features), and return a (n_samples, n_samples) shaped weight matrix. gamma : float, default=20 Parameter for rbf kernel. n_neighbors : int, default=7 Parameter for knn kernel. Need to be strictly positive. alpha : float, default=1.0 Clamping factor. max_iter : int, default=30 Change maximum number of iterations allowed. tol : float, default=1e-3 Convergence tolerance: threshold to consider the system at steady state. n_jobs : int, default=None The number of parallel jobs to run. ``None`` means 1 unless in a :obj:`joblib.parallel_backend` context. ``-1`` means using all processors. See :term:`Glossary ` for more details. """ @_deprecate_positional_args def __init__(self, kernel='rbf', *, gamma=20, n_neighbors=7, alpha=1, max_iter=30, tol=1e-3, n_jobs=None): self.max_iter = max_iter self.tol = tol # kernel parameters self.kernel = kernel self.gamma = gamma self.n_neighbors = n_neighbors # clamping factor self.alpha = alpha self.n_jobs = n_jobs def _get_kernel(self, X, y=None): if self.kernel == "rbf": if y is None: return rbf_kernel(X, X, gamma=self.gamma) else: return rbf_kernel(X, y, gamma=self.gamma) elif self.kernel == "knn": if self.nn_fit is None: self.nn_fit = NearestNeighbors(n_neighbors=self.n_neighbors, n_jobs=self.n_jobs).fit(X) if y is None: return self.nn_fit.kneighbors_graph(self.nn_fit._fit_X, self.n_neighbors, mode='connectivity') else: return self.nn_fit.kneighbors(y, return_distance=False) elif callable(self.kernel): if y is None: return self.kernel(X, X) else: return self.kernel(X, y) else: raise ValueError("%s is not a valid kernel. Only rbf and knn" " or an explicit function " " are supported at this time." % self.kernel) @abstractmethod def _build_graph(self): raise NotImplementedError("Graph construction must be implemented" " to fit a label propagation model.") def predict(self, X): """Performs inductive inference across the model. Parameters ---------- X : array-like of shape (n_samples, n_features) The data matrix. Returns ------- y : ndarray of shape (n_samples,) Predictions for input data. """ probas = self.predict_proba(X) return self.classes_[np.argmax(probas, axis=1)].ravel() def predict_proba(self, X): """Predict probability for each possible outcome. Compute the probability estimates for each single sample in X and each possible outcome seen during training (categorical distribution). Parameters ---------- X : array-like of shape (n_samples, n_features) The data matrix. Returns ------- probabilities : ndarray of shape (n_samples, n_classes) Normalized probability distributions across class labels. """ check_is_fitted(self) X_2d = check_array(X, accept_sparse=['csc', 'csr', 'coo', 'dok', 'bsr', 'lil', 'dia']) weight_matrices = self._get_kernel(self.X_, X_2d) if self.kernel == 'knn': probabilities = np.array([ np.sum(self.label_distributions_[weight_matrix], axis=0) for weight_matrix in weight_matrices]) else: weight_matrices = weight_matrices.T probabilities = safe_sparse_dot( weight_matrices, self.label_distributions_) normalizer = np.atleast_2d(np.sum(probabilities, axis=1)).T probabilities /= normalizer return probabilities def fit(self, X, y): """Fit a semi-supervised label propagation model based All the input data is provided matrix X (labeled and unlabeled) and corresponding label matrix y with a dedicated marker value for unlabeled samples. Parameters ---------- X : array-like of shape (n_samples, n_features) A matrix of shape (n_samples, n_samples) will be created from this. y : array-like of shape (n_samples,) `n_labeled_samples` (unlabeled points are marked as -1) All unlabeled samples will be transductively assigned labels. Returns ------- self : object """ X, y = self._validate_data(X, y) self.X_ = X check_classification_targets(y) # actual graph construction (implementations should override this) graph_matrix = self._build_graph() # label construction # construct a categorical distribution for classification only classes = np.unique(y) classes = (classes[classes != -1]) self.classes_ = classes n_samples, n_classes = len(y), len(classes) alpha = self.alpha if self._variant == 'spreading' and \ (alpha is None or alpha <= 0.0 or alpha >= 1.0): raise ValueError('alpha=%s is invalid: it must be inside ' 'the open interval (0, 1)' % alpha) y = np.asarray(y) unlabeled = y == -1 # initialize distributions self.label_distributions_ = np.zeros((n_samples, n_classes)) for label in classes: self.label_distributions_[y == label, classes == label] = 1 y_static = np.copy(self.label_distributions_) if self._variant == 'propagation': # LabelPropagation y_static[unlabeled] = 0 else: # LabelSpreading y_static *= 1 - alpha l_previous = np.zeros((self.X_.shape[0], n_classes)) unlabeled = unlabeled[:, np.newaxis] if sparse.isspmatrix(graph_matrix): graph_matrix = graph_matrix.tocsr() for self.n_iter_ in range(self.max_iter): if np.abs(self.label_distributions_ - l_previous).sum() < self.tol: break l_previous = self.label_distributions_ self.label_distributions_ = safe_sparse_dot( graph_matrix, self.label_distributions_) if self._variant == 'propagation': normalizer = np.sum( self.label_distributions_, axis=1)[:, np.newaxis] self.label_distributions_ /= normalizer self.label_distributions_ = np.where(unlabeled, self.label_distributions_, y_static) else: # clamp self.label_distributions_ = np.multiply( alpha, self.label_distributions_) + y_static else: warnings.warn( 'max_iter=%d was reached without convergence.' % self.max_iter, category=ConvergenceWarning ) self.n_iter_ += 1 normalizer = np.sum(self.label_distributions_, axis=1)[:, np.newaxis] normalizer[normalizer == 0] = 1 self.label_distributions_ /= normalizer # set the transduction item transduction = self.classes_[np.argmax(self.label_distributions_, axis=1)] self.transduction_ = transduction.ravel() return self class LabelPropagation(BaseLabelPropagation): """Label Propagation classifier Read more in the :ref:`User Guide `. Parameters ---------- kernel : {'knn', 'rbf'} or callable, default='rbf' String identifier for kernel function to use or the kernel function itself. Only 'rbf' and 'knn' strings are valid inputs. The function passed should take two inputs, each of shape (n_samples, n_features), and return a (n_samples, n_samples) shaped weight matrix. gamma : float, default=20 Parameter for rbf kernel. n_neighbors : int, default=7 Parameter for knn kernel which need to be strictly positive. max_iter : int, default=1000 Change maximum number of iterations allowed. tol : float, 1e-3 Convergence tolerance: threshold to consider the system at steady state. n_jobs : int, default=None The number of parallel jobs to run. ``None`` means 1 unless in a :obj:`joblib.parallel_backend` context. ``-1`` means using all processors. See :term:`Glossary ` for more details. Attributes ---------- X_ : ndarray of shape (n_samples, n_features) Input array. classes_ : ndarray of shape (n_classes,) The distinct labels used in classifying instances. label_distributions_ : ndarray of shape (n_samples, n_classes) Categorical distribution for each item. transduction_ : ndarray of shape (n_samples) Label assigned to each item via the transduction. n_iter_ : int Number of iterations run. Examples -------- >>> import numpy as np >>> from sklearn import datasets >>> from sklearn.semi_supervised import LabelPropagation >>> label_prop_model = LabelPropagation() >>> iris = datasets.load_iris() >>> rng = np.random.RandomState(42) >>> random_unlabeled_points = rng.rand(len(iris.target)) < 0.3 >>> labels = np.copy(iris.target) >>> labels[random_unlabeled_points] = -1 >>> label_prop_model.fit(iris.data, labels) LabelPropagation(...) References ---------- Xiaojin Zhu and Zoubin Ghahramani. Learning from labeled and unlabeled data with label propagation. Technical Report CMU-CALD-02-107, Carnegie Mellon University, 2002 http://pages.cs.wisc.edu/~jerryzhu/pub/CMU-CALD-02-107.pdf See Also -------- LabelSpreading : Alternate label propagation strategy more robust to noise. """ _variant = 'propagation' @_deprecate_positional_args def __init__(self, kernel='rbf', *, gamma=20, n_neighbors=7, max_iter=1000, tol=1e-3, n_jobs=None): super().__init__(kernel=kernel, gamma=gamma, n_neighbors=n_neighbors, max_iter=max_iter, tol=tol, n_jobs=n_jobs, alpha=None) def _build_graph(self): """Matrix representing a fully connected graph between each sample This basic implementation creates a non-stochastic affinity matrix, so class distributions will exceed 1 (normalization may be desired). """ if self.kernel == 'knn': self.nn_fit = None affinity_matrix = self._get_kernel(self.X_) normalizer = affinity_matrix.sum(axis=0) if sparse.isspmatrix(affinity_matrix): affinity_matrix.data /= np.diag(np.array(normalizer)) else: affinity_matrix /= normalizer[:, np.newaxis] return affinity_matrix def fit(self, X, y): return super().fit(X, y) class LabelSpreading(BaseLabelPropagation): """LabelSpreading model for semi-supervised learning This model is similar to the basic Label Propagation algorithm, but uses affinity matrix based on the normalized graph Laplacian and soft clamping across the labels. Read more in the :ref:`User Guide `. Parameters ---------- kernel : {'knn', 'rbf'} or callable, default='rbf' String identifier for kernel function to use or the kernel function itself. Only 'rbf' and 'knn' strings are valid inputs. The function passed should take two inputs, each of shape (n_samples, n_features), and return a (n_samples, n_samples) shaped weight matrix. gamma : float, default=20 Parameter for rbf kernel. n_neighbors : int, default=7 Parameter for knn kernel which is a strictly positive integer. alpha : float, default=0.2 Clamping factor. A value in (0, 1) that specifies the relative amount that an instance should adopt the information from its neighbors as opposed to its initial label. alpha=0 means keeping the initial label information; alpha=1 means replacing all initial information. max_iter : int, default=30 Maximum number of iterations allowed. tol : float, default=1e-3 Convergence tolerance: threshold to consider the system at steady state. n_jobs : int, default=None The number of parallel jobs to run. ``None`` means 1 unless in a :obj:`joblib.parallel_backend` context. ``-1`` means using all processors. See :term:`Glossary ` for more details. Attributes ---------- X_ : ndarray of shape (n_samples, n_features) Input array. classes_ : ndarray of shape (n_classes,) The distinct labels used in classifying instances. label_distributions_ : ndarray of shape (n_samples, n_classes) Categorical distribution for each item. transduction_ : ndarray of shape (n_samples,) Label assigned to each item via the transduction. n_iter_ : int Number of iterations run. Examples -------- >>> import numpy as np >>> from sklearn import datasets >>> from sklearn.semi_supervised import LabelSpreading >>> label_prop_model = LabelSpreading() >>> iris = datasets.load_iris() >>> rng = np.random.RandomState(42) >>> random_unlabeled_points = rng.rand(len(iris.target)) < 0.3 >>> labels = np.copy(iris.target) >>> labels[random_unlabeled_points] = -1 >>> label_prop_model.fit(iris.data, labels) LabelSpreading(...) References ---------- Dengyong Zhou, Olivier Bousquet, Thomas Navin Lal, Jason Weston, Bernhard Schoelkopf. Learning with local and global consistency (2004) http://citeseer.ist.psu.edu/viewdoc/summary?doi=10.1.1.115.3219 See Also -------- LabelPropagation : Unregularized graph based semi-supervised learning. """ _variant = 'spreading' @_deprecate_positional_args def __init__(self, kernel='rbf', *, gamma=20, n_neighbors=7, alpha=0.2, max_iter=30, tol=1e-3, n_jobs=None): # this one has different base parameters super().__init__(kernel=kernel, gamma=gamma, n_neighbors=n_neighbors, alpha=alpha, max_iter=max_iter, tol=tol, n_jobs=n_jobs) def _build_graph(self): """Graph matrix for Label Spreading computes the graph laplacian""" # compute affinity matrix (or gram matrix) if self.kernel == 'knn': self.nn_fit = None n_samples = self.X_.shape[0] affinity_matrix = self._get_kernel(self.X_) laplacian = csgraph.laplacian(affinity_matrix, normed=True) laplacian = -laplacian if sparse.isspmatrix(laplacian): diag_mask = (laplacian.row == laplacian.col) laplacian.data[diag_mask] = 0.0 else: laplacian.flat[::n_samples + 1] = 0.0 # set diag to 0.0 return laplacian