"""Orthogonal matching pursuit algorithms """ # Author: Vlad Niculae # # License: BSD 3 clause import warnings import numpy as np from scipy import linalg from scipy.linalg.lapack import get_lapack_funcs from .base import LinearModel, _pre_fit from ..base import RegressorMixin from ..utils import as_float_array, check_array, check_X_y from ..model_selection import check_cv from ..externals.joblib import Parallel, delayed solve_triangular_args = {'check_finite': False} premature = """ Orthogonal matching pursuit ended prematurely due to linear dependence in the dictionary. The requested precision might not have been met. """ def _cholesky_omp(X, y, n_nonzero_coefs, tol=None, copy_X=True, return_path=False): """Orthogonal Matching Pursuit step using the Cholesky decomposition. Parameters ---------- X : array, shape (n_samples, n_features) Input dictionary. Columns are assumed to have unit norm. y : array, shape (n_samples,) Input targets n_nonzero_coefs : int Targeted number of non-zero elements tol : float Targeted squared error, if not None overrides n_nonzero_coefs. copy_X : bool, optional Whether the design matrix X must be copied by the algorithm. A false value is only helpful if X is already Fortran-ordered, otherwise a copy is made anyway. return_path : bool, optional. Default: False Whether to return every value of the nonzero coefficients along the forward path. Useful for cross-validation. Returns ------- gamma : array, shape (n_nonzero_coefs,) Non-zero elements of the solution idx : array, shape (n_nonzero_coefs,) Indices of the positions of the elements in gamma within the solution vector coef : array, shape (n_features, n_nonzero_coefs) The first k values of column k correspond to the coefficient value for the active features at that step. The lower left triangle contains garbage. Only returned if ``return_path=True``. n_active : int Number of active features at convergence. """ if copy_X: X = X.copy('F') else: # even if we are allowed to overwrite, still copy it if bad order X = np.asfortranarray(X) min_float = np.finfo(X.dtype).eps nrm2, swap = linalg.get_blas_funcs(('nrm2', 'swap'), (X,)) potrs, = get_lapack_funcs(('potrs',), (X,)) alpha = np.dot(X.T, y) residual = y gamma = np.empty(0) n_active = 0 indices = np.arange(X.shape[1]) # keeping track of swapping max_features = X.shape[1] if tol is not None else n_nonzero_coefs if solve_triangular_args: # new scipy, don't need to initialize because check_finite=False L = np.empty((max_features, max_features), dtype=X.dtype) else: # old scipy, we need the garbage upper triangle to be non-Inf L = np.zeros((max_features, max_features), dtype=X.dtype) L[0, 0] = 1. if return_path: coefs = np.empty_like(L) while True: lam = np.argmax(np.abs(np.dot(X.T, residual))) if lam < n_active or alpha[lam] ** 2 < min_float: # atom already selected or inner product too small warnings.warn(premature, RuntimeWarning, stacklevel=2) break if n_active > 0: # Updates the Cholesky decomposition of X' X L[n_active, :n_active] = np.dot(X[:, :n_active].T, X[:, lam]) linalg.solve_triangular(L[:n_active, :n_active], L[n_active, :n_active], trans=0, lower=1, overwrite_b=True, **solve_triangular_args) v = nrm2(L[n_active, :n_active]) ** 2 if 1 - v <= min_float: # selected atoms are dependent warnings.warn(premature, RuntimeWarning, stacklevel=2) break L[n_active, n_active] = np.sqrt(1 - v) X.T[n_active], X.T[lam] = swap(X.T[n_active], X.T[lam]) alpha[n_active], alpha[lam] = alpha[lam], alpha[n_active] indices[n_active], indices[lam] = indices[lam], indices[n_active] n_active += 1 # solves LL'x = y as a composition of two triangular systems gamma, _ = potrs(L[:n_active, :n_active], alpha[:n_active], lower=True, overwrite_b=False) if return_path: coefs[:n_active, n_active - 1] = gamma residual = y - np.dot(X[:, :n_active], gamma) if tol is not None and nrm2(residual) ** 2 <= tol: break elif n_active == max_features: break if return_path: return gamma, indices[:n_active], coefs[:, :n_active], n_active else: return gamma, indices[:n_active], n_active def _gram_omp(Gram, Xy, n_nonzero_coefs, tol_0=None, tol=None, copy_Gram=True, copy_Xy=True, return_path=False): """Orthogonal Matching Pursuit step on a precomputed Gram matrix. This function uses the Cholesky decomposition method. Parameters ---------- Gram : array, shape (n_features, n_features) Gram matrix of the input data matrix Xy : array, shape (n_features,) Input targets n_nonzero_coefs : int Targeted number of non-zero elements tol_0 : float Squared norm of y, required if tol is not None. tol : float Targeted squared error, if not None overrides n_nonzero_coefs. copy_Gram : bool, optional Whether the gram matrix must be copied by the algorithm. A false value is only helpful if it is already Fortran-ordered, otherwise a copy is made anyway. copy_Xy : bool, optional Whether the covariance vector Xy must be copied by the algorithm. If False, it may be overwritten. return_path : bool, optional. Default: False Whether to return every value of the nonzero coefficients along the forward path. Useful for cross-validation. Returns ------- gamma : array, shape (n_nonzero_coefs,) Non-zero elements of the solution idx : array, shape (n_nonzero_coefs,) Indices of the positions of the elements in gamma within the solution vector coefs : array, shape (n_features, n_nonzero_coefs) The first k values of column k correspond to the coefficient value for the active features at that step. The lower left triangle contains garbage. Only returned if ``return_path=True``. n_active : int Number of active features at convergence. """ Gram = Gram.copy('F') if copy_Gram else np.asfortranarray(Gram) if copy_Xy: Xy = Xy.copy() min_float = np.finfo(Gram.dtype).eps nrm2, swap = linalg.get_blas_funcs(('nrm2', 'swap'), (Gram,)) potrs, = get_lapack_funcs(('potrs',), (Gram,)) indices = np.arange(len(Gram)) # keeping track of swapping alpha = Xy tol_curr = tol_0 delta = 0 gamma = np.empty(0) n_active = 0 max_features = len(Gram) if tol is not None else n_nonzero_coefs if solve_triangular_args: # new scipy, don't need to initialize because check_finite=False L = np.empty((max_features, max_features), dtype=Gram.dtype) else: # old scipy, we need the garbage upper triangle to be non-Inf L = np.zeros((max_features, max_features), dtype=Gram.dtype) L[0, 0] = 1. if return_path: coefs = np.empty_like(L) while True: lam = np.argmax(np.abs(alpha)) if lam < n_active or alpha[lam] ** 2 < min_float: # selected same atom twice, or inner product too small warnings.warn(premature, RuntimeWarning, stacklevel=3) break if n_active > 0: L[n_active, :n_active] = Gram[lam, :n_active] linalg.solve_triangular(L[:n_active, :n_active], L[n_active, :n_active], trans=0, lower=1, overwrite_b=True, **solve_triangular_args) v = nrm2(L[n_active, :n_active]) ** 2 if 1 - v <= min_float: # selected atoms are dependent warnings.warn(premature, RuntimeWarning, stacklevel=3) break L[n_active, n_active] = np.sqrt(1 - v) Gram[n_active], Gram[lam] = swap(Gram[n_active], Gram[lam]) Gram.T[n_active], Gram.T[lam] = swap(Gram.T[n_active], Gram.T[lam]) indices[n_active], indices[lam] = indices[lam], indices[n_active] Xy[n_active], Xy[lam] = Xy[lam], Xy[n_active] n_active += 1 # solves LL'x = y as a composition of two triangular systems gamma, _ = potrs(L[:n_active, :n_active], Xy[:n_active], lower=True, overwrite_b=False) if return_path: coefs[:n_active, n_active - 1] = gamma beta = np.dot(Gram[:, :n_active], gamma) alpha = Xy - beta if tol is not None: tol_curr += delta delta = np.inner(gamma, beta[:n_active]) tol_curr -= delta if abs(tol_curr) <= tol: break elif n_active == max_features: break if return_path: return gamma, indices[:n_active], coefs[:, :n_active], n_active else: return gamma, indices[:n_active], n_active def orthogonal_mp(X, y, n_nonzero_coefs=None, tol=None, precompute=False, copy_X=True, return_path=False, return_n_iter=False): """Orthogonal Matching Pursuit (OMP) Solves n_targets Orthogonal Matching Pursuit problems. An instance of the problem has the form: When parametrized by the number of non-zero coefficients using `n_nonzero_coefs`: argmin ||y - X\gamma||^2 subject to ||\gamma||_0 <= n_{nonzero coefs} When parametrized by error using the parameter `tol`: argmin ||\gamma||_0 subject to ||y - X\gamma||^2 <= tol Read more in the :ref:`User Guide `. Parameters ---------- X : array, shape (n_samples, n_features) Input data. Columns are assumed to have unit norm. y : array, shape (n_samples,) or (n_samples, n_targets) Input targets n_nonzero_coefs : int Desired number of non-zero entries in the solution. If None (by default) this value is set to 10% of n_features. tol : float Maximum norm of the residual. If not None, overrides n_nonzero_coefs. precompute : {True, False, 'auto'}, Whether to perform precomputations. Improves performance when n_targets or n_samples is very large. copy_X : bool, optional Whether the design matrix X must be copied by the algorithm. A false value is only helpful if X is already Fortran-ordered, otherwise a copy is made anyway. return_path : bool, optional. Default: False Whether to return every value of the nonzero coefficients along the forward path. Useful for cross-validation. return_n_iter : bool, optional default False Whether or not to return the number of iterations. Returns ------- coef : array, shape (n_features,) or (n_features, n_targets) Coefficients of the OMP solution. If `return_path=True`, this contains the whole coefficient path. In this case its shape is (n_features, n_features) or (n_features, n_targets, n_features) and iterating over the last axis yields coefficients in increasing order of active features. n_iters : array-like or int Number of active features across every target. Returned only if `return_n_iter` is set to True. See also -------- OrthogonalMatchingPursuit orthogonal_mp_gram lars_path decomposition.sparse_encode Notes ----- Orthogonal matching pursuit was introduced in S. Mallat, Z. Zhang, Matching pursuits with time-frequency dictionaries, IEEE Transactions on Signal Processing, Vol. 41, No. 12. (December 1993), pp. 3397-3415. (http://blanche.polytechnique.fr/~mallat/papiers/MallatPursuit93.pdf) This implementation is based on Rubinstein, R., Zibulevsky, M. and Elad, M., Efficient Implementation of the K-SVD Algorithm using Batch Orthogonal Matching Pursuit Technical Report - CS Technion, April 2008. http://www.cs.technion.ac.il/~ronrubin/Publications/KSVD-OMP-v2.pdf """ X = check_array(X, order='F', copy=copy_X) copy_X = False if y.ndim == 1: y = y.reshape(-1, 1) y = check_array(y) if y.shape[1] > 1: # subsequent targets will be affected copy_X = True if n_nonzero_coefs is None and tol is None: # default for n_nonzero_coefs is 0.1 * n_features # but at least one. n_nonzero_coefs = max(int(0.1 * X.shape[1]), 1) if tol is not None and tol < 0: raise ValueError("Epsilon cannot be negative") if tol is None and n_nonzero_coefs <= 0: raise ValueError("The number of atoms must be positive") if tol is None and n_nonzero_coefs > X.shape[1]: raise ValueError("The number of atoms cannot be more than the number " "of features") if precompute == 'auto': precompute = X.shape[0] > X.shape[1] if precompute: G = np.dot(X.T, X) G = np.asfortranarray(G) Xy = np.dot(X.T, y) if tol is not None: norms_squared = np.sum((y ** 2), axis=0) else: norms_squared = None return orthogonal_mp_gram(G, Xy, n_nonzero_coefs, tol, norms_squared, copy_Gram=copy_X, copy_Xy=False, return_path=return_path) if return_path: coef = np.zeros((X.shape[1], y.shape[1], X.shape[1])) else: coef = np.zeros((X.shape[1], y.shape[1])) n_iters = [] for k in range(y.shape[1]): out = _cholesky_omp( X, y[:, k], n_nonzero_coefs, tol, copy_X=copy_X, return_path=return_path) if return_path: _, idx, coefs, n_iter = out coef = coef[:, :, :len(idx)] for n_active, x in enumerate(coefs.T): coef[idx[:n_active + 1], k, n_active] = x[:n_active + 1] else: x, idx, n_iter = out coef[idx, k] = x n_iters.append(n_iter) if y.shape[1] == 1: n_iters = n_iters[0] if return_n_iter: return np.squeeze(coef), n_iters else: return np.squeeze(coef) def orthogonal_mp_gram(Gram, Xy, n_nonzero_coefs=None, tol=None, norms_squared=None, copy_Gram=True, copy_Xy=True, return_path=False, return_n_iter=False): """Gram Orthogonal Matching Pursuit (OMP) Solves n_targets Orthogonal Matching Pursuit problems using only the Gram matrix X.T * X and the product X.T * y. Read more in the :ref:`User Guide `. Parameters ---------- Gram : array, shape (n_features, n_features) Gram matrix of the input data: X.T * X Xy : array, shape (n_features,) or (n_features, n_targets) Input targets multiplied by X: X.T * y n_nonzero_coefs : int Desired number of non-zero entries in the solution. If None (by default) this value is set to 10% of n_features. tol : float Maximum norm of the residual. If not None, overrides n_nonzero_coefs. norms_squared : array-like, shape (n_targets,) Squared L2 norms of the lines of y. Required if tol is not None. copy_Gram : bool, optional Whether the gram matrix must be copied by the algorithm. A false value is only helpful if it is already Fortran-ordered, otherwise a copy is made anyway. copy_Xy : bool, optional Whether the covariance vector Xy must be copied by the algorithm. If False, it may be overwritten. return_path : bool, optional. Default: False Whether to return every value of the nonzero coefficients along the forward path. Useful for cross-validation. return_n_iter : bool, optional default False Whether or not to return the number of iterations. Returns ------- coef : array, shape (n_features,) or (n_features, n_targets) Coefficients of the OMP solution. If `return_path=True`, this contains the whole coefficient path. In this case its shape is (n_features, n_features) or (n_features, n_targets, n_features) and iterating over the last axis yields coefficients in increasing order of active features. n_iters : array-like or int Number of active features across every target. Returned only if `return_n_iter` is set to True. See also -------- OrthogonalMatchingPursuit orthogonal_mp lars_path decomposition.sparse_encode Notes ----- Orthogonal matching pursuit was introduced in G. Mallat, Z. Zhang, Matching pursuits with time-frequency dictionaries, IEEE Transactions on Signal Processing, Vol. 41, No. 12. (December 1993), pp. 3397-3415. (http://blanche.polytechnique.fr/~mallat/papiers/MallatPursuit93.pdf) This implementation is based on Rubinstein, R., Zibulevsky, M. and Elad, M., Efficient Implementation of the K-SVD Algorithm using Batch Orthogonal Matching Pursuit Technical Report - CS Technion, April 2008. http://www.cs.technion.ac.il/~ronrubin/Publications/KSVD-OMP-v2.pdf """ Gram = check_array(Gram, order='F', copy=copy_Gram) Xy = np.asarray(Xy) if Xy.ndim > 1 and Xy.shape[1] > 1: # or subsequent target will be affected copy_Gram = True if Xy.ndim == 1: Xy = Xy[:, np.newaxis] if tol is not None: norms_squared = [norms_squared] if n_nonzero_coefs is None and tol is None: n_nonzero_coefs = int(0.1 * len(Gram)) if tol is not None and norms_squared is None: raise ValueError('Gram OMP needs the precomputed norms in order ' 'to evaluate the error sum of squares.') if tol is not None and tol < 0: raise ValueError("Epsilon cannot be negative") if tol is None and n_nonzero_coefs <= 0: raise ValueError("The number of atoms must be positive") if tol is None and n_nonzero_coefs > len(Gram): raise ValueError("The number of atoms cannot be more than the number " "of features") if return_path: coef = np.zeros((len(Gram), Xy.shape[1], len(Gram))) else: coef = np.zeros((len(Gram), Xy.shape[1])) n_iters = [] for k in range(Xy.shape[1]): out = _gram_omp( Gram, Xy[:, k], n_nonzero_coefs, norms_squared[k] if tol is not None else None, tol, copy_Gram=copy_Gram, copy_Xy=copy_Xy, return_path=return_path) if return_path: _, idx, coefs, n_iter = out coef = coef[:, :, :len(idx)] for n_active, x in enumerate(coefs.T): coef[idx[:n_active + 1], k, n_active] = x[:n_active + 1] else: x, idx, n_iter = out coef[idx, k] = x n_iters.append(n_iter) if Xy.shape[1] == 1: n_iters = n_iters[0] if return_n_iter: return np.squeeze(coef), n_iters else: return np.squeeze(coef) class OrthogonalMatchingPursuit(LinearModel, RegressorMixin): """Orthogonal Matching Pursuit model (OMP) Read more in the :ref:`User Guide `. Parameters ---------- n_nonzero_coefs : int, optional Desired number of non-zero entries in the solution. If None (by default) this value is set to 10% of n_features. tol : float, optional Maximum norm of the residual. If not None, overrides n_nonzero_coefs. fit_intercept : boolean, optional whether to calculate the intercept for this model. If set to false, no intercept will be used in calculations (e.g. data is expected to be already centered). normalize : boolean, optional, default True This parameter is ignored when ``fit_intercept`` is set to False. If True, the regressors X will be normalized before regression by subtracting the mean and dividing by the l2-norm. If you wish to standardize, please use :class:`sklearn.preprocessing.StandardScaler` before calling ``fit`` on an estimator with ``normalize=False``. precompute : {True, False, 'auto'}, default 'auto' Whether to use a precomputed Gram and Xy matrix to speed up calculations. Improves performance when `n_targets` or `n_samples` is very large. Note that if you already have such matrices, you can pass them directly to the fit method. Attributes ---------- coef_ : array, shape (n_features,) or (n_targets, n_features) parameter vector (w in the formula) intercept_ : float or array, shape (n_targets,) independent term in decision function. n_iter_ : int or array-like Number of active features across every target. Notes ----- Orthogonal matching pursuit was introduced in G. Mallat, Z. Zhang, Matching pursuits with time-frequency dictionaries, IEEE Transactions on Signal Processing, Vol. 41, No. 12. (December 1993), pp. 3397-3415. (http://blanche.polytechnique.fr/~mallat/papiers/MallatPursuit93.pdf) This implementation is based on Rubinstein, R., Zibulevsky, M. and Elad, M., Efficient Implementation of the K-SVD Algorithm using Batch Orthogonal Matching Pursuit Technical Report - CS Technion, April 2008. http://www.cs.technion.ac.il/~ronrubin/Publications/KSVD-OMP-v2.pdf See also -------- orthogonal_mp orthogonal_mp_gram lars_path Lars LassoLars decomposition.sparse_encode """ def __init__(self, n_nonzero_coefs=None, tol=None, fit_intercept=True, normalize=True, precompute='auto'): self.n_nonzero_coefs = n_nonzero_coefs self.tol = tol self.fit_intercept = fit_intercept self.normalize = normalize self.precompute = precompute def fit(self, X, y): """Fit the model using X, y as training data. Parameters ---------- X : array-like, shape (n_samples, n_features) Training data. y : array-like, shape (n_samples,) or (n_samples, n_targets) Target values. Will be cast to X's dtype if necessary Returns ------- self : object returns an instance of self. """ X, y = check_X_y(X, y, multi_output=True, y_numeric=True) n_features = X.shape[1] X, y, X_offset, y_offset, X_scale, Gram, Xy = \ _pre_fit(X, y, None, self.precompute, self.normalize, self.fit_intercept, copy=True) if y.ndim == 1: y = y[:, np.newaxis] if self.n_nonzero_coefs is None and self.tol is None: # default for n_nonzero_coefs is 0.1 * n_features # but at least one. self.n_nonzero_coefs_ = max(int(0.1 * n_features), 1) else: self.n_nonzero_coefs_ = self.n_nonzero_coefs if Gram is False: coef_, self.n_iter_ = orthogonal_mp( X, y, self.n_nonzero_coefs_, self.tol, precompute=False, copy_X=True, return_n_iter=True) else: norms_sq = np.sum(y ** 2, axis=0) if self.tol is not None else None coef_, self.n_iter_ = orthogonal_mp_gram( Gram, Xy=Xy, n_nonzero_coefs=self.n_nonzero_coefs_, tol=self.tol, norms_squared=norms_sq, copy_Gram=True, copy_Xy=True, return_n_iter=True) self.coef_ = coef_.T self._set_intercept(X_offset, y_offset, X_scale) return self def _omp_path_residues(X_train, y_train, X_test, y_test, copy=True, fit_intercept=True, normalize=True, max_iter=100): """Compute the residues on left-out data for a full LARS path Parameters ----------- X_train : array, shape (n_samples, n_features) The data to fit the LARS on y_train : array, shape (n_samples) The target variable to fit LARS on X_test : array, shape (n_samples, n_features) The data to compute the residues on y_test : array, shape (n_samples) The target variable to compute the residues on copy : boolean, optional Whether X_train, X_test, y_train and y_test should be copied. If False, they may be overwritten. fit_intercept : boolean whether to calculate the intercept for this model. If set to false, no intercept will be used in calculations (e.g. data is expected to be already centered). normalize : boolean, optional, default True This parameter is ignored when ``fit_intercept`` is set to False. If True, the regressors X will be normalized before regression by subtracting the mean and dividing by the l2-norm. If you wish to standardize, please use :class:`sklearn.preprocessing.StandardScaler` before calling ``fit`` on an estimator with ``normalize=False``. max_iter : integer, optional Maximum numbers of iterations to perform, therefore maximum features to include. 100 by default. Returns ------- residues : array, shape (n_samples, max_features) Residues of the prediction on the test data """ if copy: X_train = X_train.copy() y_train = y_train.copy() X_test = X_test.copy() y_test = y_test.copy() if fit_intercept: X_mean = X_train.mean(axis=0) X_train -= X_mean X_test -= X_mean y_mean = y_train.mean(axis=0) y_train = as_float_array(y_train, copy=False) y_train -= y_mean y_test = as_float_array(y_test, copy=False) y_test -= y_mean if normalize: norms = np.sqrt(np.sum(X_train ** 2, axis=0)) nonzeros = np.flatnonzero(norms) X_train[:, nonzeros] /= norms[nonzeros] coefs = orthogonal_mp(X_train, y_train, n_nonzero_coefs=max_iter, tol=None, precompute=False, copy_X=False, return_path=True) if coefs.ndim == 1: coefs = coefs[:, np.newaxis] if normalize: coefs[nonzeros] /= norms[nonzeros][:, np.newaxis] return np.dot(coefs.T, X_test.T) - y_test class OrthogonalMatchingPursuitCV(LinearModel, RegressorMixin): """Cross-validated Orthogonal Matching Pursuit model (OMP) Read more in the :ref:`User Guide `. Parameters ---------- copy : bool, optional Whether the design matrix X must be copied by the algorithm. A false value is only helpful if X is already Fortran-ordered, otherwise a copy is made anyway. fit_intercept : boolean, optional whether to calculate the intercept for this model. If set to false, no intercept will be used in calculations (e.g. data is expected to be already centered). normalize : boolean, optional, default True This parameter is ignored when ``fit_intercept`` is set to False. If True, the regressors X will be normalized before regression by subtracting the mean and dividing by the l2-norm. If you wish to standardize, please use :class:`sklearn.preprocessing.StandardScaler` before calling ``fit`` on an estimator with ``normalize=False``. max_iter : integer, optional Maximum numbers of iterations to perform, therefore maximum features to include. 10% of ``n_features`` but at least 5 if available. cv : int, cross-validation generator or an iterable, optional Determines the cross-validation splitting strategy. Possible inputs for cv are: - None, to use the default 3-fold cross-validation, - integer, to specify the number of folds. - An object to be used as a cross-validation generator. - An iterable yielding train/test splits. For integer/None inputs, :class:`KFold` is used. Refer :ref:`User Guide ` for the various cross-validation strategies that can be used here. n_jobs : integer, optional Number of CPUs to use during the cross validation. If ``-1``, use all the CPUs verbose : boolean or integer, optional Sets the verbosity amount Attributes ---------- intercept_ : float or array, shape (n_targets,) Independent term in decision function. coef_ : array, shape (n_features,) or (n_targets, n_features) Parameter vector (w in the problem formulation). n_nonzero_coefs_ : int Estimated number of non-zero coefficients giving the best mean squared error over the cross-validation folds. n_iter_ : int or array-like Number of active features across every target for the model refit with the best hyperparameters got by cross-validating across all folds. See also -------- orthogonal_mp orthogonal_mp_gram lars_path Lars LassoLars OrthogonalMatchingPursuit LarsCV LassoLarsCV decomposition.sparse_encode """ def __init__(self, copy=True, fit_intercept=True, normalize=True, max_iter=None, cv=None, n_jobs=1, verbose=False): self.copy = copy self.fit_intercept = fit_intercept self.normalize = normalize self.max_iter = max_iter self.cv = cv self.n_jobs = n_jobs self.verbose = verbose def fit(self, X, y): """Fit the model using X, y as training data. Parameters ---------- X : array-like, shape [n_samples, n_features] Training data. y : array-like, shape [n_samples] Target values. Will be cast to X's dtype if necessary Returns ------- self : object returns an instance of self. """ X, y = check_X_y(X, y, y_numeric=True, ensure_min_features=2, estimator=self) X = as_float_array(X, copy=False, force_all_finite=False) cv = check_cv(self.cv, classifier=False) max_iter = (min(max(int(0.1 * X.shape[1]), 5), X.shape[1]) if not self.max_iter else self.max_iter) cv_paths = Parallel(n_jobs=self.n_jobs, verbose=self.verbose)( delayed(_omp_path_residues)( X[train], y[train], X[test], y[test], self.copy, self.fit_intercept, self.normalize, max_iter) for train, test in cv.split(X)) min_early_stop = min(fold.shape[0] for fold in cv_paths) mse_folds = np.array([(fold[:min_early_stop] ** 2).mean(axis=1) for fold in cv_paths]) best_n_nonzero_coefs = np.argmin(mse_folds.mean(axis=0)) + 1 self.n_nonzero_coefs_ = best_n_nonzero_coefs omp = OrthogonalMatchingPursuit(n_nonzero_coefs=best_n_nonzero_coefs, fit_intercept=self.fit_intercept, normalize=self.normalize) omp.fit(X, y) self.coef_ = omp.coef_ self.intercept_ = omp.intercept_ self.n_iter_ = omp.n_iter_ return self