Python numpy.dot() 使用实例

Example 1

def rhoA(self):
        # rhoA
        rhoA = pd.DataFrame(0, index=np.arange(1), columns=self.latent)

        for i in range(self.lenlatent):
            weights = pd.DataFrame(self.outer_weights[self.latent[i]])
            weights = weights[(weights.T != 0).any()]
            result = pd.DataFrame.dot(weights.T, weights)
            result_ = pd.DataFrame.dot(weights, weights.T)

            S = self.data_[self.Variables['measurement'][
                self.Variables['latent'] == self.latent[i]]]
            S = pd.DataFrame.dot(S.T, S) / S.shape[0]
            numerador = (
                np.dot(np.dot(weights.T, (S - np.diag(np.diag(S)))), weights))
            denominador = (
                (np.dot(np.dot(weights.T, (result_ - np.diag(np.diag(result_)))), weights)))
            rhoA_ = ((result)**2) * (numerador / denominador)
            if(np.isnan(rhoA_.values)):
                rhoA[self.latent[i]] = 1
            else:
                rhoA[self.latent[i]] = rhoA_.values

        return rhoA.T 

Example 2

def PCA(data, num_components=None):
    # mean center the data
    data -= data.mean(axis=0)
    # calculate the covariance matrix
    R = np.cov(data, rowvar=False)
    # calculate eigenvectors & eigenvalues of the covariance matrix
    # use 'eigh' rather than 'eig' since R is symmetric,
    # the performance gain is substantial
    V, E = np.linalg.eigh(R)
    # sort eigenvalue in decreasing order
    idx = np.argsort(V)[::-1]
    E = E[:,idx]
    # sort eigenvectors according to same index
    V = V[idx]
    # select the first n eigenvectors (n is desired dimension
    # of rescaled data array, or dims_rescaled_data)
    E = E[:, :num_components]
    # carry out the transformation on the data using eigenvectors
    # and return the re-scaled data, eigenvalues, and eigenvectors
    return np.dot(E.T, data.T).T, V, E 

Example 3

def backPropagate(Z1, Z2, y, W2, b2):
    ## YOUR CODE HERE ##
    E2 = 0
    E1 = 0
    Eb1 = 0

    # E2 is the error in output layer. To find it we should exract estimated value from actual output.
    # We should find 5 error because there are 5 node in output layer.
    E2 = Z2 - y

    ## E1 is the error in the hidden layer. To find it we should use the error that we found in output layer and the weights between
    ## output and hidden layer
    ## We should find 30 error because there are 30 node in hidden layer.
    E1 = np.dot(W2, np.transpose(E2))

    ## Eb1 is the error bias for hidden layer. To find it we should use the error that we found in output layer and the weights between
    ## output and bias layer
    ## We should find 1 error because there are 1 bias node in hidden layer.
    Eb1 = np.dot(b2, np.transpose(E2))
    ####################
    return E2, E1, Eb1

# calculate the gradients for weights between units and the bias weights 

Example 4

def get_nodal_differentiation_matrix(order,
                                     s2c=None,c2s=None,
                                     Dmodal=None):
    """
    Returns the differentiation matrix for the first derivative
    in the nodal basis

    It goes without saying that this differentiation matrix is for the
    reference cell.
    """
    if Dmodal is None:
        Dmodal = get_modal_differentiation_matrix(order)
    if s2c is None or c2s is None:
        s2c,c2s = get_vandermonde_matrices(order)
    return np.dot(s2c,np.dot(Dmodal,c2s))
# ======================================================================



# Operators Outside Reference Cell
# ====================================================================== 

Example 5

def differentiate(self,grid_func,orderx,ordery):
        """Given a grid function defined on the colocation points,
        differentiate it up to the appropriate order in each direction.
        """
        assert type(orderx) is int
        assert type(ordery) is int
        assert orderx >= 0
        assert ordery >= 0
        
        if orderx > 0:
            df = np.dot(self.stencil_x.PD,grid_func)
            return self.differentiate(df,orderx-1,ordery)

        if ordery > 0:
            df = np.dot(grid_func,self.stencil_y.PD.transpose())
            return self.differentiate(df,orderx,ordery-1)

        #if orderx == 0 and ordery == 0:
        return grid_func 

Example 6

def fit(self, graphs, y=None):
		rnd = check_random_state(self.random_state)
		n_samples = len(graphs)

		# get basis vectors
		if self.n_components > n_samples:
			n_components = n_samples
		else:
			n_components = self.n_components
		n_components = min(n_samples, n_components)
		inds = rnd.permutation(n_samples)
		basis_inds = inds[:n_components]
		basis = []
		for ind in basis_inds:
			basis.append(graphs[ind])

		basis_kernel = self.kernel(basis, basis, **self._get_kernel_params())

		# sqrt of kernel matrix on basis vectors
		U, S, V = svd(basis_kernel)
		S = np.maximum(S, 1e-12)
		self.normalization_ = np.dot(U * 1. / np.sqrt(S), V)
		self.components_ = basis
		self.component_indices_ = inds
		return self 

Example 7

def _ikf_iteration(self, x, n, ranges, h, H, z, estimate, R):
        """Update tracker based on a multi-range message.

        Args:
             multi_range_msg (uwb.msg.UWBMultiRangeWithOffsets): ROS multi-range message.

        Returns:
            new_estimate (StateEstimate): Updated position estimate.
        """
        new_position = n[0:3]
        self._compute_measurements_and_jacobians(ranges, new_position, h, H, z)
        res = z - h
        S = np.dot(np.dot(H, estimate.covariance), H.T) + R
        K = np.dot(estimate.covariance, self._solve_equation_least_squares(S.T, H).T)
        mahalanobis = np.sqrt(np.dot(self._solve_equation_least_squares(S.T, res).T, res))
        if res.size not in self.outlier_thresholds:
            self.outlier_thresholds[res.size] = scipy.stats.chi2.isf(self.outlier_threshold_quantile, res.size)
        outlier_threshold = self.outlier_thresholds[res.size]
        if mahalanobis < outlier_threshold:
            n = x + np.dot(K, (res - np.dot(H, x - n)))
            outlier_flag = False
        else:
            outlier_flag = True
        return n, K, outlier_flag 

Example 8

def normalized_distance(_a, _b):
    """Compute normalized distance between two points.

    Computes 1 - a * b / ( ||a|| * ||b||)

    Args:
        _a (numpy.ndarray): array of size m
        _b (numpy.ndarray): array of size m

    Returns:
        normalized distance between signatures (float)

    Examples:
        >>> a = gis.generate_signature('https://upload.wikimedia.org/wikipedia/commons/thumb/e/ec/Mona_Lisa,_by_Leonardo_da_Vinci,_from_C2RMF_retouched.jpg/687px-Mona_Lisa,_by_Leonardo_da_Vinci,_from_C2RMF_retouched.jpg')
        >>> b = gis.generate_signature('https://pixabay.com/static/uploads/photo/2012/11/28/08/56/mona-lisa-67506_960_720.jpg')
        >>> gis.normalized_distance(a, b)
        0.0332806110382

    """

    # return (1.0 - np.dot(_a, _b) / (np.linalg.norm(_a) * np.linalg.norm(_b)))
    return np.dot(_a, _b) / (np.linalg.norm(_a) * np.linalg.norm(_b)) 

Example 9

def observed_perplexity(self, counts):
        """Compute perplexity = exp(entropy) of observed variables.

        Perplexity is an information theoretic measure of the number of
        clusters or latent classes. Perplexity is a real number in the range
        [1, M], where M is model_num_clusters.

        Args:
            counts: A [V]-shaped array of multinomial counts.

        Returns:
            A [V]-shaped numpy array of perplexity.
        """
        V, E, M, R = self._VEMR
        if counts is not None:
            counts = np.ones(V, dtype=np.int8)
        assert counts.shape == (V, )
        assert counts.dtype == np.int8
        assert np.all(counts > 0)
        observed_entropy = np.empty(V, dtype=np.float32)
        for v in range(V):
            beg, end = self._ragged_index[v:v + 2]
            probs = np.dot(self._feat_cond[beg:end, :], self._vert_probs[v, :])
            observed_entropy[v] = multinomial_entropy(probs, counts[v])
        return np.exp(observed_entropy) 

Example 10

def get_covariance(self):
        """Compute data covariance with the generative model.
        ``cov = components_.T * S**2 * components_ + sigma2 * eye(n_features)``
        where  S**2 contains the explained variances.
        Returns
        -------
        cov : array, shape=(n_features, n_features)
            Estimated covariance of data.
        """
        components_ = self.components_
        exp_var = self.explained_variance_
        if self.whiten:
            components_ = components_ * np.sqrt(exp_var[:, np.newaxis])
        exp_var_diff = np.maximum(exp_var - self.noise_variance_, 0.)
        cov = np.dot(components_.T * exp_var_diff, components_)
        cov.flat[::len(cov) + 1] += self.noise_variance_  # modify diag inplace
        return cov 

Example 11

def transform(self, X):
        """Apply the dimensionality reduction on X.
        X is projected on the first principal components previous extracted
        from a training set.
        Parameters
        ----------
        X : array-like, shape (n_samples, n_features)
            New data, where n_samples is the number of samples
            and n_features is the number of features.
        Returns
        -------
        X_new : array-like, shape (n_samples, n_components)
        """
        check_is_fitted(self, 'mean_')

        X = check_array(X)
        if self.mean_ is not None:
            X = X - self.mean_
        X_transformed = np.dot(X, self.components_.T)
        if self.whiten:
            X_transformed /= np.sqrt(self.explained_variance_)
        return X_transformed 

Example 12

def score_samples(self, X):
        """Return the log-likelihood of each sample
        See. "Pattern Recognition and Machine Learning"
        by C. Bishop, 12.2.1 p. 574
        or http://www.miketipping.com/papers/met-mppca.pdf
        Parameters
        ----------
        X: array, shape(n_samples, n_features)
            The data.
        Returns
        -------
        ll: array, shape (n_samples,)
            Log-likelihood of each sample under the current model
        """
        check_is_fitted(self, 'mean_')

        X = check_array(X)
        Xr = X - self.mean_
        n_features = X.shape[1]
        log_like = np.zeros(X.shape[0])
        precision = self.get_precision()
        log_like = -.5 * (Xr * (np.dot(Xr, precision))).sum(axis=1)
        log_like -= .5 * (n_features * log(2. * np.pi)
                          - fast_logdet(precision))
        return log_like 

Example 13

def optSigma2(self, U, s, y, covars, logdetXX, reml, ldeltamin=-5, ldeltamax=5):

		#Prepare required matrices
		Uy = U.T.dot(y).flatten()
		UX = U.T.dot(covars)		
		
		if (U.shape[1] < U.shape[0]):
			UUX = covars - U.dot(UX)
			UUy = y - U.dot(Uy)
			UUXUUX = UUX.T.dot(UUX)
			UUXUUy = UUX.T.dot(UUy)
			UUyUUy = UUy.T.dot(UUy)
		else: UUXUUX, UUXUUy, UUyUUy = None, None, None
		numIndividuals = U.shape[0]
		ldeltaopt_glob = optimize.minimize_scalar(self.negLLevalLong, bounds=(-5, 5), method='Bounded', args=(s, Uy, UX, logdetXX, UUXUUX, UUXUUy, UUyUUy, numIndividuals, reml)).x
		
		ll, sig2g, beta, r2 = self.negLLevalLong(ldeltaopt_glob, s, Uy, UX, logdetXX, UUXUUX, UUXUUy, UUyUUy, numIndividuals, reml, returnAllParams=True)
		sig2e = np.exp(ldeltaopt_glob) * sig2g
			
		return sig2g, sig2e, beta, ll 

Example 14

def BorthogonalityTest(B, U):
    """
    Test the frobenious norm of  U^TBU - I_k
    """
    BU = np.zeros(U.shape)
    Bu = Vector()
    u = Vector()
    B.init_vector(Bu,0)
    B.init_vector(u,1)
    
    nvec  = U.shape[1]
    for i in range(0,nvec):
        u.set_local(U[:,i])
        B.mult(u,Bu)
        BU[:,i] = Bu.get_local()
        
    UtBU = np.dot(U.T, BU)
    err = UtBU - np.eye(nvec, dtype=UtBU.dtype)
    print("|| UtBU - I ||_F = ", np.linalg.norm(err, 'fro') ) 

Example 15

def _ireduce_linalg(arrays, func, **kwargs):
    """
    Yield the cumulative reduction of a linag algebra function
    """
    arrays = iter(arrays)
    first = next(arrays)
    second = next(arrays)
    
    func = partial(func, **kwargs)

    accumulator = func(first,  second)
    yield accumulator

    for array in arrays:
        # For some reason, np.dot(..., out = accumulator) did not produce results
        # that were equal to numpy.linalg.multi_dot
        func(accumulator, array, out = accumulator)
        yield accumulator 

Example 16

def idot(arrays):
    """
    Yields the cumulative array inner product (dot product) of arrays.

    Parameters
    ----------
    arrays : iterable
        Arrays to be reduced.
    
    Yields
    ------
    online_dot : ndarray

    See Also
    --------
    numpy.linalg.multi_dot : Compute the dot product of two or more arrays in a single function call, 
                             while automatically selecting the fastest evaluation order.
    """
    yield from _ireduce_linalg(arrays, np.dot) 

Example 17

def itensordot(arrays, axes = 2):
    """
    Yields the cumulative array inner product (dot product) of arrays.

    Parameters
    ----------
    arrays : iterable
        Arrays to be reduced.
    axes : int or (2,) array_like
        * integer_like: If an int N, sum over the last N axes of a 
          and the first N axes of b in order. The sizes of the corresponding axes must match.
        * (2,) array_like: Or, a list of axes to be summed over, first sequence applying to a, 
          second to b. Both elements array_like must be of the same length.
    
    Yields
    ------
    online_tensordot : ndarray

    See Also
    --------
    numpy.tensordot : Compute the tensordot on two tensors.
    """
    yield from _ireduce_linalg(arrays, np.tensordot, axes = axes) 

Example 18

def _convert(matrix, arr):
    """Do the color space conversion.

    Parameters
    ----------
    matrix : array_like
        The 3x3 matrix to use.
    arr : array_like
        The input array.

    Returns
    -------
    out : ndarray, dtype=float
        The converted array.
    """
    arr = _prepare_colorarray(arr)
    arr = np.swapaxes(arr, 0, -1)
    oldshape = arr.shape
    arr = np.reshape(arr, (3, -1))
    out = np.dot(matrix, arr)
    out.shape = oldshape
    out = np.swapaxes(out, -1, 0)

    return np.ascontiguousarray(out) 

Example 19

def rotate_point_cloud(batch_data):
    """ Randomly rotate the point clouds to augument the dataset
        rotation is per shape based along up direction
        Input:
          BxNx3 array, original batch of point clouds
        Return:
          BxNx3 array, rotated batch of point clouds
    """
    rotated_data = np.zeros(batch_data.shape, dtype=np.float32)
    for k in range(batch_data.shape[0]):
        rotation_angle = np.random.uniform() * 2 * np.pi
        cosval = np.cos(rotation_angle)
        sinval = np.sin(rotation_angle)
        rotation_matrix = np.array([[cosval, 0, sinval],
                                    [0, 1, 0],
                                    [-sinval, 0, cosval]])
        shape_pc = batch_data[k, ...]
        rotated_data[k, ...] = np.dot(shape_pc.reshape((-1, 3)), rotation_matrix)
    return rotated_data 

Example 20

def rotate_point_cloud_by_angle(batch_data, rotation_angle):
    """ Rotate the point cloud along up direction with certain angle.
        Input:
          BxNx3 array, original batch of point clouds
        Return:
          BxNx3 array, rotated batch of point clouds
    """
    rotated_data = np.zeros(batch_data.shape, dtype=np.float32)
    for k in range(batch_data.shape[0]):
        #rotation_angle = np.random.uniform() * 2 * np.pi
        cosval = np.cos(rotation_angle)
        sinval = np.sin(rotation_angle)
        rotation_matrix = np.array([[cosval, 0, sinval],
                                    [0, 1, 0],
                                    [-sinval, 0, cosval]])
        shape_pc = batch_data[k, ...]
        rotated_data[k, ...] = np.dot(shape_pc.reshape((-1, 3)), rotation_matrix)
    return rotated_data 

Example 21

def computeStep(X, y, theta):
    '''YOUR CODE HERE'''
    function_result = np.array([0,0], dtype= np.float)
    m = float(len(X))

    d1 = 0.0
    d2 = 0.0
    for i in range(len(X)):
        h1 = np.dot(theta.transpose(), X[i])
        c1 = h1 - y[i]
        d1 = d1 + c1
    j1 = d1/m
    for u in range(len(X)):
        h2 = np.dot(theta.transpose(), X[u])
        c2 = (h2 - y[u]) * X[u][1]
        d2 = d2 + c2
    j2 = d2/m

    function_result[0] = j1
    function_result[1] = j2
    return function_result



# Part 4: Implement the cost function calculation 

Example 22

def computeCost(X, y, theta):
    '''YOUR CODE HERE'''
    m = float(len(X))

    d = 0
    for i in range(len(X)):
        h = np.dot(theta.transpose(), X[i])
        c = (h - y[i])

        c = (c **2)
        d = (d + c)
    j = (1.0 / (2 * m)) * d
    return j


# Part 5: Prepare the data so that the input X has two columns: first a column of ones to accomodate theta0 and then a column of city population data 

Example 23

def forwardPropagate(X, W1, b1, W2, b2):
    ## YOUR CODE HERE ##
    Z1 = 0
    Z2 = 0

    S1 = 0
    S2 = 0
    ## Here we should find 2 result: first for input and hidden layer then for hidden and output layer.
    ## First I found the result for every node in hidden layer then put them into activation function.
    S1 = np.dot(X, W1)+ b1
    Z1 = calcActivation(S1)

    ## Second I found the result for every node in output layer then put them into activation function.
    S2 = np.dot(Z1, W2) + b2
    Z2 = calcActivation(S2)

    ####################
    return Z1, Z2

# calculate the cost 

Example 24

def calcGrads(X, Z1, Z2, E1, E2, Eb1):
    ## YOUR CODE HERE ##
    d_W1 = 0
    d_b1 = 0
    d_W2 = 0
    d_b2 = 0


    ## In here we should the derivatives for gradients. To find derivative, we should multiply.

    # d_w2 is the derivative for weights between hidden layer and the output layer.
    d_W2 = np.dot(np.transpose(E2), Z1)
    # d_w1 is the derivative for weights between hidden layer and the input layer.
    d_W1 = np.dot(E1, X)
    # d_b2 is the derivative for weights between hidden layer bias and the output layer.
    d_b2 = np.dot(np.transpose(E2), Eb1)
    # d_b1 is the derivative for weights between hidden layer bias and the input layer.
    d_b1 = np.dot(np.transpose(E1), 1)


    ####################
    return d_W1, d_W2, d_b1, d_b2

# update the weights between units and the bias weights using a learning rate of alpha 

Example 25

def doesnt_match(self, words):
        """
        Which word from the given list doesn't go with the others?

        Example::
          >>> trained_model.doesnt_match("breakfast cereal dinner lunch".split())
          'cereal'
        """
        words = [word for word in words if word in self.vocab]  # filter out OOV words
        logger.debug("using words %s" % words)
        if not words:
            raise ValueError("cannot select a word from an empty list")
        # which word vector representation is furthest away from the mean?
        selection = self.syn0norm[[self.vocab[word].index for word in words]]
        mean = np.mean(selection, axis=0)
        sim = np.dot(selection, mean / np.linalg.norm(mean))
        return words[np.argmin(sim)] 

Example 26

def __mul__(self, other):
        """ 
        Left-multiply RigidTransform with another rigid transform
        
        Two variants: 
           RigidTransform: Identical to oplus operation
           ndarray: transform [N x 3] point set (X_2 = p_21 * X_1)

        """
        if isinstance(other, DualQuaternion):
            return DualQuaternion.from_dq(other.real * self.real, 
                                          other.dual * self.real + other.real * self.dual)
        elif isinstance(other, float):
            return DualQuaternion.from_dq(self.real * other, self.dual * other)
        # elif isinstance(other, nd.array): 
        #     X = np.hstack([other, np.ones((len(other),1))]).T
        #     return (np.dot(self.matrix, X).T)[:,:3]
        else: 
            raise TypeError('__mul__ typeerror {:}'.format(type(other))) 

Example 27

def interpolate(self, other, this_weight):
        q0, q1 = np.roll(self.q, shift=1), np.roll(other.q, shift=1)
        u = 1 - this_weight
        assert(u >= 0 and u <= 1)
        cos_omega = np.dot(q0, q1)

        if cos_omega < 0:
            result = -q0[:]
            cos_omega = -cos_omega
        else:
            result = q0[:]

        cos_omega = min(cos_omega, 1)

        omega = math.acos(cos_omega)
        sin_omega = math.sin(omega)
        a = math.sin((1-u) * omega)/ sin_omega
        b = math.sin(u * omega) / sin_omega

        if abs(sin_omega) < 1e-6:
            # direct linear interpolation for numerically unstable regions
            result = result * this_weight + q1 * u
            result /= math.sqrt(np.dot(result, result))
        else:
            result = result*a + q1*b
        return Quaternion(np.roll(result, shift=-1))

    # To conversions 

Example 28

def quaternion_matrix(quaternion):
    """Return homogeneous rotation matrix from quaternion.

    >>> R = quaternion_matrix([0.06146124, 0, 0, 0.99810947])
    >>> numpy.allclose(R, rotation_matrix(0.123, (1, 0, 0)))
    True

    """
    q = numpy.array(quaternion[:4], dtype=numpy.float64, copy=True)
    nq = numpy.dot(q, q)
    if nq < _EPS:
        return numpy.identity(4)
    q *= math.sqrt(2.0 / nq)
    q = numpy.outer(q, q)
    return numpy.array((
        (1.0-q[1, 1]-q[2, 2],     q[0, 1]-q[2, 3],     q[0, 2]+q[1, 3], 0.0),
        (    q[0, 1]+q[2, 3], 1.0-q[0, 0]-q[2, 2],     q[1, 2]-q[0, 3], 0.0),
        (    q[0, 2]-q[1, 3],     q[1, 2]+q[0, 3], 1.0-q[0, 0]-q[1, 1], 0.0),
        (                0.0,                 0.0,                 0.0, 1.0)
        ), dtype=numpy.float64) 

Example 29

def sampson_error(F, pts1, pts2): 
    """
    Computes the sampson error for F, and points pts1, pts2. Sampson
    error is the first order approximation to the geometric error.
    Remember that this is a squared error.
   
    (x'^{T} * F * x)^2
    -----------------
    (F * x)_1^2 + (F * x)_2^2 + (F^T * x')_1^2 + (F^T * x')_2^2

    where (F * x)_i^2 is the square of the i-th entry of the vector Fx
    """
    x1, x2 = unproject_points(pts1).T, unproject_points(pts2).T
    Fx1 = np.dot(F, x1)
    Fx2 = np.dot(F, x2)
       
    # Sampson distance as error measure
    denom = Fx1[0]**2 + Fx1[1]**2 + Fx2[0]**2 + Fx2[1]**2
    return ( np.diag(x1.T.dot(Fx2)) )**2 / denom 

Example 30

def getMedianDistanceBetweenSamples(self, sampleSet=None) :
        """
        Jaakkola's heuristic method for setting the width parameter of the Gaussian
        radial basis function kernel is to pick a quantile (usually the median) of
        the distribution of Euclidean distances between points having different
        labels.

        Reference:
        Jaakkola, M. Diekhaus, and D. Haussler. Using the Fisher kernel method to detect
        remote protein homologies. In T. Lengauer, R. Schneider, P. Bork, D. Brutlad, J.
        Glasgow, H.- W. Mewes, and R. Zimmer, editors, Proceedings of the Seventh
        International Conference on Intelligent Systems for Molecular Biology.
        """
        numrows = sampleSet.shape[0]
        samples = sampleSet

        G = sum((samples * samples), 1)
        Q = numpy.tile(G[:, None], (1, numrows))
        R = numpy.tile(G, (numrows, 1))

        distances = Q + R - 2 * numpy.dot(samples, samples.T)
        distances = distances - numpy.tril(distances)
        distances = distances.reshape(numrows**2, 1, order="F").copy()

        return numpy.sqrt(0.5 * numpy.median(distances[distances > 0])) 

Example 31

def refit_model(self):
        """Learns a new surrogate model using the data observed so far.

        """

        # only fit the model if there is data for it.
        if len(self.known_models) > 0:

            self._build_feature_maps(self.known_models, self.ngram_maxlen, self.thres)

            X = sp.vstack([ self._compute_features(mdl)
                    for mdl in self.known_models], "csr")
            y = np.array(self.known_scores, dtype='float64')

            #A = np.dot(X.T, X) + lamb * np.eye(X.shape[1])
            #b = np.dot(X.T, y)
            self.surr_model = lm.Ridge(self.lamb_ridge)
            self.surr_model.fit(X, y)


# NOTE: if the search space has holes, it break. needs try/except module. 

Example 32

def _update_ps(self, es):
        if not self.is_initialized:
            self.initialize(es)
        if self._ps_updated_iteration == es.countiter:
            return
        z = es.sm.transform_inverse((es.mean - es.mean_old) / es.sigma_vec.scaling)
        # works unless a re-parametrisation has been done
        # assert Mh.vequals_approximately(z, np.dot(es.B, (1. / es.D) *
        #         np.dot(es.B.T, (es.mean - es.mean_old) / es.sigma_vec)))
        z *= es.sp.weights.mueff**0.5 / es.sigma / es.sp.cmean
        # zzzzzzzzzzzzzzzzzzzzzzzzzzzzzzzzzz
        if es.opts['CSA_clip_length_value'] is not None:
            vals = es.opts['CSA_clip_length_value']
            min_len = es.N**0.5 + vals[0] * es.N / (es.N + 2)
            max_len = es.N**0.5 + vals[1] * es.N / (es.N + 2)
            act_len = sum(z**2)**0.5
            new_len = Mh.minmax(act_len, min_len, max_len)
            if new_len != act_len:
                z *= new_len / act_len
                # z *= (es.N / sum(z**2))**0.5  # ==> sum(z**2) == es.N
                # z *= es.const.chiN / sum(z**2)**0.5
        self.ps = (1 - self.cs) * self.ps + np.sqrt(self.cs * (2 - self.cs)) * z
        self._ps_updated_iteration = es.countiter 

Example 33

def isotropic_mean_shift(self):
        """normalized last mean shift, under random selection N(0,I)

        distributed.

        Caveat: while it is finite and close to sqrt(n) under random
        selection, the length of the normalized mean shift under
        *systematic* selection (e.g. on a linear function) tends to
        infinity for mueff -> infty. Hence it must be used with great
        care for large mueff.
        """
        z = self.sm.transform_inverse((self.mean - self.mean_old) /
                                      self.sigma_vec.scaling)
        # works unless a re-parametrisation has been done
        # assert Mh.vequals_approximately(z, np.dot(es.B, (1. / es.D) *
        #         np.dot(es.B.T, (es.mean - es.mean_old) / es.sigma_vec)))
        z /= self.sigma * self.sp.cmean
        z *= self.sp.weights.mueff**0.5
        return z 

Example 34

def norm(self, x):
        """compute the Mahalanobis norm that is induced by the
        statistical model / sample distribution, specifically by
        covariance matrix ``C``. The expected Mahalanobis norm is
        about ``sqrt(dimension)``.

        Example
        -------
        >>> import cma, numpy as np
        >>> sm = cma.sampler.GaussFullSampler(np.ones(10))
        >>> x = np.random.randn(10)
        >>> d = sm.norm(x)

        `d` is the norm "in" the true sample distribution,
        sampled points have a typical distance of ``sqrt(2*sm.dim)``,
        where ``sm.dim`` is the dimension, and an expected distance of
        close to ``dim**0.5`` to the sample mean zero. In the example,
        `d` is the Euclidean distance, because C = I.
        """
        return sum((np.dot(self.B.T, x) / self.D)**2)**0.5 

Example 35

def ask(self):
        """sample lambda candidate solutions

        distributed according to::

            m + sigma * Normal(0,C) = m + sigma * B * D * Normal(0,I)
                                    = m + B * D * sigma * Normal(0,I)

        and return a `list` of the sampled "vectors".
        """
        self.C.update_eigensystem(self.counteval,
                                  self.params.lazy_gap_evals)
        candidate_solutions = []
        for k in range(self.params.lam):  # repeat lam times
            z = [self.sigma * eigenval**0.5 * self.randn(0, 1)
                 for eigenval in self.C.eigenvalues]
            y = dot(self.C.eigenbasis, z)
            candidate_solutions.append(plus(self.xmean, y))
        return candidate_solutions 

Example 36

def __init__(self, dimension, randn=np.random.randn, debug=False):
        """pass dimension of the underlying sample space
        """
        try:
            self.N = len(dimension)
            std_vec = np.array(dimension, copy=True)
        except TypeError:
            self.N = dimension
            std_vec = np.ones(self.N)
        if self.N < 10:
            print('Warning: Not advised to use VD-CMA for dimension < 10.')
        self.randn = randn
        self.dvec = std_vec
        self.vvec = self.randn(self.N) / math.sqrt(self.N)
        self.norm_v2 = np.dot(self.vvec, self.vvec)
        self.norm_v = np.sqrt(self.norm_v2)
        self.vn = self.vvec / self.norm_v
        self.vnn = self.vn**2
        self.pc = np.zeros(self.N)
        self._debug = debug  # plot covariance matrix 

Example 37

def _get_params(self, weights, k):
        """Return the learning rate cone, cmu, cc depending on k

        Parameters
        ----------
        weights : list of float
            the weight values for vectors used to update the distribution
        k : int
            the number of vectors for covariance matrix

        Returns
        -------
        cone, cmu, cc : float in [0, 1]. Learning rates for rank-one, rank-mu,
         and the cumulation factor for rank-one.
        """
        w = np.array(weights)
        mueff = np.sum(w[w > 0.])**2 / np.dot(w[w > 0.], w[w > 0.])
        return self._get_params2(mueff, k) 

Example 38

def covariance_matrix(self):
        if self._debug:
            # return None
            ka = self.k_active
            if ka > 0:
                C = np.eye(self.N) + np.dot(self.V[:ka].T * self.S[:ka],
                                            self.V[:ka])
                C = (C * self.D).T * self.D
            else:
                C = np.diag(self.D**2)
            C *= self.sigma**2
        else:
            # Fake Covariance Matrix for Speed
            C = np.ones(1)
            self.B = np.ones(1)
        return C 

Example 39

def _evalfull(self, x):
        fadd = self.fopt
        curshape, dim = self.shape_(x)
        # it is assumed x are row vectors

        if self.lastshape != curshape:
            self.initwithsize(curshape, dim)

        # TRANSFORMATION IN SEARCH SPACE
        x = x - self.arrxopt # cannot be replaced with x -= arrxopt!

        # COMPUTATION core
        ftrue = dot(monotoneTFosc(x)**2, self.scales)
        fval = self.noise(ftrue) # without noise

        # FINALIZE
        ftrue += fadd
        fval += fadd
        return fval, ftrue 

Example 40

def _evalfull(self, x):
        fadd = self.fopt
        curshape, dim = self.shape_(x)
        # it is assumed x are row vectors

        if self.lastshape != curshape:
            self.initwithsize(curshape, dim)

        # TRANSFORMATION IN SEARCH SPACE
        x = x - self.arrxopt # cannot be replaced with x -= arrxopt!
        x = dot(x, self.linearTF) # TODO: check

        # COMPUTATION core
        idx = (x * self.arrxopt) > 0
        x[idx] = self.alpha * x[idx]
        ftrue = monotoneTFosc(np.sum(x**2, -1)) ** .9
        fval = self.noise(ftrue)

        # FINALIZE
        ftrue += fadd
        fval += fadd
        return fval, ftrue 

Example 41

def initwithsize(self, curshape, dim):
        # DIM-dependent initialization
        if self.dim != dim:
            if self.zerox:
                self.xopt = zeros(dim)
            else:
                self.xopt = compute_xopt(self.rseed, dim)
            self.rotation = compute_rotation(self.rseed + 1e6, dim)
            self.scales = self.condition ** linspace(0, 1, dim)
            self.linearTF = dot(compute_rotation(self.rseed, dim),
                                diag(((self.condition / 10.)**.5) ** linspace(0, 1, dim)))

        # DIM- and POPSI-dependent initialisations of DIM*POPSI matrices
        if self.lastshape != curshape:
            self.dim = dim
            self.lastshape = curshape
            self.arrxopt = resize(self.xopt, curshape) 

Example 42

def initwithsize(self, curshape, dim):
        # DIM-dependent initialization
        if self.dim != dim:
            if self.zerox:
                self.xopt = zeros(dim)
            else:
                self.xopt = compute_xopt(self.rseed, dim)
            scale = max(1, dim ** .5 / 8.) # nota: different from scales in F8
            self.linearTF = scale * compute_rotation(self.rseed, dim)
            self.xopt = np.hstack(dot(.5 * np.ones((1, dim)), self.linearTF.T)) / scale ** 2

        # DIM- and POPSI-dependent initialisations of DIM*POPSI matrices
        if self.lastshape != curshape:
            self.dim = dim
            self.lastshape = curshape
            self.arrxopt = resize(self.xopt, curshape) 

Example 43

def initwithsize(self, curshape, dim):
        # DIM-dependent initialization
        if self.dim != dim:
            if self.zerox:
                self.xopt = zeros(dim)
            else:
                self.xopt = compute_xopt(self.rseed, dim)
            self.rotation = compute_rotation(self.rseed + 1e6, dim)
            self.scales = (self.condition ** .5) ** linspace(0, 1, dim)
            self.linearTF = dot(compute_rotation(self.rseed, dim), diag(self.scales))
            self.linearTF = dot(self.linearTF, self.rotation)

        # DIM- and POPSI-dependent initialisations of DIM*POPSI matrices
        if self.lastshape != curshape:
            self.dim = dim
            self.lastshape = curshape
            self.arrxopt = resize(self.xopt, curshape) 

Example 44

def _evalfull(self, x):
        fadd = self.fopt
        curshape, dim = self.shape_(x)
        # it is assumed x are row vectors

        if self.lastshape != curshape:
            self.initwithsize(curshape, dim)

        # BOUNDARY HANDLING

        # TRANSFORMATION IN SEARCH SPACE
        x = x - self.arrxopt # cannot be replaced with x -= arrxopt!
        x = dot(x, self.linearTF)

        # COMPUTATION core
        try:
            ftrue = x[:, 0] ** 2 + self.alpha * np.sqrt(np.sum(x[:, 1:] ** 2, -1))
        except IndexError:
            ftrue = x[0] ** 2 + self.alpha * np.sqrt(np.sum(x[1:] ** 2, -1))
        fval = self.noise(ftrue)

        # FINALIZE
        ftrue += fadd
        fval += fadd
        return fval, ftrue 

Example 45

def distance(v1, v2, normalised_vectors=False):
    """
    Returns the cosine distance between two vectors. 
    If the vectors are normalised, there is no need for the denominator, which is always one. 
    """
    if normalised_vectors:
        return 1 - dot(v1, v2)
    else:
        return 1 - dot(v1, v2) / ( norm(v1) * norm(v2) ) 

Example 46

def convert_to_num(Ybin, verbose=True):
	''' Convert binary targets to numeric vector (typically classification target values)'''
	if verbose: print("\tConverting to numeric vector")
	Ybin = np.array(Ybin)
	if len(Ybin.shape) ==1:
         return Ybin
	classid=range(Ybin.shape[1])
	Ycont = np.dot(Ybin, classid)
	if verbose: print Ycont
	return Ycont 

Example 47

def build_2D_cov_matrix(sigmax,sigmay,angle,verbose=True):
    """
    Build a covariance matrix for a 2D multivariate Gaussian

    --- INPUT ---
    sigmax          Standard deviation of the x-compoent of the multivariate Gaussian
    sigmay          Standard deviation of the y-compoent of the multivariate Gaussian
    angle           Angle to rotate matrix by in degrees (clockwise) to populate covariance cross terms
    verbose         Toggle verbosity
    --- EXAMPLE OF USE ---
    import tdose_utilities as tu
    covmatrix = tu.build_2D_cov_matrix(3,1,35)

    """
    if verbose: print ' - Build 2D covariance matrix with varinaces (x,y)=('+str(sigmax)+','+str(sigmay)+\
                      ') and then rotated '+str(angle)+' degrees'
    cov_orig      = np.zeros([2,2])
    cov_orig[0,0] = sigmay**2.0
    cov_orig[1,1] = sigmax**2.0

    angle_rad     = (180.0-angle) * np.pi/180.0 # The (90-angle) makes sure the same convention as DS9 is used
    c, s          = np.cos(angle_rad), np.sin(angle_rad)
    rotmatrix     = np.matrix([[c, -s], [s, c]])

    cov_rot       = np.dot(np.dot(rotmatrix,cov_orig),np.transpose(rotmatrix))  # performing rot * cov * rot^T

    return cov_rot
# = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = = 

Example 48

def get_continuous_object(grid_func,
                          xmin=LOCAL_XMIN,xmax=LOCAL_XMAX,
                          c2s=None):
    """
    Maps the grid function grid_func, which is any field defined
    on the colocation points to a continuous function that can
    be evaluated.

    Parameters
    ----------
    xmin -- the minimum value of the domain
    xmax -- the maximum value of the domain
    c2s  -- The Vandermonde matrix that maps the colocation representation
            to the spectral representation

    Returns
    -------
    An numpy polynomial object which can be called to be evaluated
    """
    order = len(grid_func)-1
    if c2s == None:
        s2c,c2s = get_vandermonde_matrices(order)
    spec_func = np.dot(c2s,grid_func)
    my_interp = poly(spec_func,domain=[xmin,xmax])
    return my_interp
# ======================================================================



# ======================================================================
# A convenience class that generates everything and can be called
# ====================================================================== 

Example 49

def differentiate(self,grid_func,order=1):
        """
        Given a grid function defined on the colocation points,
        returns its derivative of the appropriate order
        """
        assert type(order) == int
        assert order >= 0
        if order == 0:
            return grid_func
        else:
            return self.differentiate(np.dot(self.PD,grid_func),order-1) 

Example 50

def to_continuum(self,grid_func):
        coeffs_x = np.dot(self.stencil_x.c2s,grid_func)
        coeffs_xy = np.dot(coeffs_x,self.stencil_y.c2s.transpose())
        def f(x,y):
            mx,my = [s._coord_global_to_ref(c) \
                     for c,s in zip([x,y],self.stencils)]
            return pval2d(mx,my,coeffs_xy)
        return f 
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