# The data
data = np.load('data_concentrations_left_corners.npy')
# The forward model
diff_model = ContaminantTransportModelLeft()
print 'Num_input'
print str(diff_model.num_input) + '\n'
# The isotropic Likelihood
IsotropicL = IsotropicGaussianLikelihood(data[:], diff_model)
# The joint
log_p = Joint(IsotropicL, prior)
print 'Target:'
print str(log_p)

# The approximating distribution
comp = [MultivariateNormal(np.random.gamma(10,1,num_dim))]#, MultivariateNormal(np.random.gamma(10,1,num_dim))]
log_q = MixtureOfMultivariateNormals(comp)
log_q.comp[0].mu = np.ones(log_q.comp[0].mu.shape) * 0.5
#log_q.comp[1].mu = np.ones(log_q.comp[0].mu.shape) * 0.5
log_q.comp[0].C = np.eye(num_dim) * 1e-4
#log_q.comp[1].C = np.eye(num_dim) * 1e-4
print 'Initial:'
print log_q

# Pick an entropy approximation
entropy = FirstOrderEntropyApproximation()
# Pick an approximation for the expectation of the joint
expectation_functional = ThirdOrderExpectationFunctional(log_p)
# Restrictions for mu
mu_bounds = (tuple((0., 1.) for i in xrange(log_q.num_dim - 1))
            + ((1e-6, None), ))
C_bounds = tuple((1e-32, None) for i in xrange(log_q.num_comp * log_q.num_dim))
y = data[:, 1:]
y = y.reshape((1,y.shape[0] * y.shape[1]))
# The forward model
catal_model = CatalysisModel()
print 'Num_input'
print str(catal_model.num_input) + '\n'
# The isotropic Likelihood
IsotropicL = IsotropicGaussianLikelihood(y[0,:], catal_model)
# The joint
log_p = Joint(IsotropicL, prior)
print 'Target:'
print str(log_p)

# The approximating distribution
comp = [MultivariateNormal(np.random.gamma(10,1,num_dim))]#, MultivariateNormal(np.random.gamma(10,1,num_dim))]
log_q = MixtureOfMultivariateNormals(comp)
log_q.mu = np.ones(log_q.mu.shape) * 1e-4
log_q.comp[0].C = np.eye(num_dim) * 0.5
print 'Initial:'
print log_q

# Pick an entropy approximation
entropy = FirstOrderEntropyApproximation()
# Pick an approximation for the expectation of the joint
expectation_functional = ThirdOrderExpectationFunctional(log_p)
# Restrictions for mu
mu_bounds = (tuple((1e-6, 1) for i in xrange(log_q.num_dim - 1))
            + ((1e-6, None), ))
C_bounds = tuple((1e-32, None) for i in xrange(log_q.num_comp * log_q.num_dim))
# Build the ELBO
elbo = EvidenceLowerBound(entropy, expectation_functional)
data = np.load('data_concentrations_upperleft_corner.npy')
# The forward model
diff_model = ContaminantTransportModelUpperLeft()
print 'Num_input'
print str(diff_model.num_input) + '\n'
# The isotropic Likelihood
IsotropicL = IsotropicGaussianLikelihood(data[:], diff_model)
# The joint
log_p = Joint(IsotropicL, prior)
print 'Target:'
print str(log_p)

# The approximating distribution
comp = [MultivariateNormal(np.random.gamma(10,1,num_dim)), MultivariateNormal(np.random.gamma(10,1,num_dim))] 
       # MultivariateNormal(np.random.gamma(10,1,num_dim))]#, MultivariateNormal(np.random.gamma(10,1,num_dim))]
log_q = MixtureOfMultivariateNormals(comp)
log_q.comp[0].mu = np.ones(log_q.comp[0].mu.shape) * 0.25
log_q.comp[1].mu = np.ones(log_q.comp[0].mu.shape) * 0.75
#log_q.comp[2].mu = np.ones(log_q.comp[2].mu.shape) * 0.4
#log_q.comp[3].mu = np.ones(log_q.comp[3].mu.shape) * 0.6
log_q.comp[0].C = np.eye(num_dim) * 1e-4
log_q.comp[1].C = np.eye(num_dim) * 1e-4
#log_q.comp[2].C = np.eye(num_dim) * 1e-4
#log_q.comp[3].C = np.eye(num_dim) * 1e-4
print 'Initial:'
print log_q

# Pick an entropy approximation
entropy = FirstOrderEntropyApproximation()
# Pick an approximation for the expectation of the joint
expectation_functional = ThirdOrderExpectationFunctional(log_p)
num_comp = 1

# The model
model = TestModel0()

# The prior
log_p_x = MultivariateNormal(mu=[0])
log_p_z_fake = FlatPDF(model.num_output)
log_p_x_ext = PDFCollection([log_p_x, log_p_z_fake])
# The isotropic Likelihood
log_p_z_given_x = UncertaintyPropagationLikelihood(model, alpha=100.)
# The joint
log_p = Joint(log_p_z_given_x, log_p_x_ext)

# The approximating distribution
log_q = MixtureOfMultivariateNormals.create(log_p.num_dim, num_comp)

# Build the ELBO
# Pick an entropy approximation
entropy = FirstOrderEntropyApproximation()
# Pick an approximation for the expectation of the joint
expectation_functional = ThirdOrderExpectationFunctional(log_p)
# Build the ELBO
elbo = EvidenceLowerBound(entropy, expectation_functional)
print 'ELBO:'
print str(elbo)

# Optimize the elbo
optimizer = Optimizer(elbo)

C_bounds = tuple((1e-32, None) for i in xrange(log_q.num_comp * log_q.num_dim))
コード例 #5
0
num_comp = 5

# The model
model = TestModel1()

# The prior
log_p_x = MultivariateNormal(mu=[0])
log_p_z_fake = FlatPDF(model.num_output)
log_p_x_ext = PDFCollection([log_p_x, log_p_z_fake])
# The isotropic Likelihood
log_p_z_given_x = UncertaintyPropagationLikelihood(model, alpha=1e-1)
# The joint
log_p = Joint(log_p_z_given_x, log_p_x_ext)

# The approximating distribution
log_q = MixtureOfMultivariateNormals.create(log_p.num_dim, num_comp)

# Build the ELBO
# Pick an entropy approximation
entropy = FirstOrderEntropyApproximation()
# Pick an approximation for the expectation of the joint
expectation_functional = ThirdOrderExpectationFunctional(log_p)
# Build the ELBO
elbo = EvidenceLowerBound(entropy, expectation_functional)
print 'ELBO:'
print str(elbo)

# Optimize the elbo
optimizer = FullOptimizer(elbo)

C_bounds = tuple((1e-32, None) for i in xrange(log_q.num_comp * log_q.num_dim))
import numpy as np
import matplotlib.pyplot as plt
import sys
import os
sys.path.insert(0, os.path.abspath('.'))
from vuq import MixtureOfMultivariateNormals
from vuq import MonteCarloEntropyApproximation
from vuq import FirstOrderEntropyApproximation
from vuq import EntropyLowerBound


# Number of components for the test
num_dim = 1

# Create a random multivariate normal
q = MixtureOfMultivariateNormals.create(num_dim, 1) # With one component first

# Create the entropy approximation
S0 = FirstOrderEntropyApproximation()

# Create a monte carlo approximation to the entropy
Smc = MonteCarloEntropyApproximation(num_samples=100)

# The lower bound to the entropy
Sl = EntropyLowerBound()

# The first order approximation to the entropy
print 'S0[q] =', S0(q)['S']

# The lower bound to the entropy
print 'Sl[q] =', Sl.eval(q)
コード例 #7
0
                if k != j:
                    C_new[i, k, j] += h
                q.C = C_new
                Sph = S0.eval(q)[0]
                J[i, j, k] = (Sph - S) / h
                if k != j:
                    J[i, j, k] *= 0.5
                q.C = C
    return J


# Number of components for the test
num_dim = 1

# Create a random multivariate normal
q = MixtureOfMultivariateNormals.create(num_dim, 2)  # With one component first

# Create the entropy approximation
#S0 = FirstOrderEntropyApproximation()
S0 = EntropyLowerBound()

# Create a monte carlo approximation to the entropy
Smc = MonteCarloEntropyApproximation(num_samples=100)

# Try it out with more components
print 'Doing it with two components...'
q = MixtureOfMultivariateNormals.create(num_dim, 2)
#q.comp[0].C = np.array([[2]])
#q.w = np.array([0.3, 0.7])
print str(q)
# Evaluate the entropy
def main(options):
    """
    The main function.
    """
    # DATA AND MODEL
    data = load_dimensionless_catalysis_data()
    model = catalysis_dimensionless_model.make_model()
    catal_model = model['catal_model']
    # VARIATIONAL PLOTS
    with open(options.var_file, 'rb') as fd:
        var_results = pickle.load(fd)
    log_q = var_results['log_q']
    if var_results.has_key('output_samples') and not options.force:
        Y = var_results['output_samples']
    else:
        Y = []
        for i in xrange(options.num_samples):
            print 'taking sample', i + 1
            omega = log_q.sample().flatten()
            x = omega[:5]
            sigma = np.exp(omega[5])
            y = catal_model(x)['f']
            Y.append(y + sigma * np.random.randn(*y.shape))
        Y = np.vstack(Y)
        var_results['output_samples'] = Y
        with open(options.var_file, 'wb') as fd:
            pickle.dump(var_results, fd, protocol=pickle.HIGHEST_PROTOCOL)
    var_out_fig = os.path.abspath(os.path.splitext(options.var_file)[0] + '_output.png')
    plot_catalysis_output(var_out_fig, Y, legend=True, title='VAR. (L=%d)' % log_q.num_comp)
    # MCMC PLOTS
    f = tb.open_file(options.mcmc_file, mode='r')
    chain = options.chain
    if chain is None:
        chain_counter = f.get_node('/mcmc/chain_counter')
        chain = chain_counter[-1][-1]
    chain_data = getattr(f.root.mcmc.data, chain)
    mcmc_step = chain_data.cols.step[:]
    omega = chain_data.cols.params[:]
    x = omega[:, :5]
    sigma = np.exp(omega[:, 5])
    # Do not do the following step unless this is a forced calculation
    mcmc_file_prefix = os.path.abspath(os.path.splitext(options.mcmc_file)[0]) +\
                                       '_ch=' + str(chain)
    mcmc_output_file = mcmc_file_prefix + '_output.pcl'
    if os.path.exists(mcmc_output_file) and not options.force:
        print '- I found', mcmc_output_file
        with open(mcmc_output_file, 'rb') as fd:
            Y_mcmc = pickle.load(fd)
    elif not options.skip_mcmc_output:
        print '- computing the output of the model for each one of the MCMC samples'
        print '- be patient'
        Y_mcmc = catal_model(x)['f']
        with open(mcmc_output_file, 'wb') as fd:
            pickle.dump(Y_mcmc, fd, protocol=pickle.HIGHEST_PROTOCOL)
    if not options.skip_mcmc_output:
        Y_mcmc = Y_mcmc[options.skip::options.thin, :]
        sigma = sigma[options.skip::options.thin]
        Y_mcmc += sigma[:, None] * np.random.randn(*Y_mcmc.shape)
        mcmc_out_fig = mcmc_file_prefix + '_output.png'
        plot_catalysis_output(mcmc_out_fig, Y_mcmc, title='MCMC (MALA)')
    # Plot the histograms
    or_omega = omega
    omega = np.exp(omega[options.skip::options.thin, :])
    w = log_q.w
    mu =log_q.mu
    C = log_q.C
    c = np.vstack([np.diag(C[i, :, :]) for i in xrange(log_q.num_comp)])
    for i in xrange(omega.shape[1]):
        fig = plt.figure()
        ax = fig.add_subplot(111)
        ax.hist(omega[:, i], alpha=0.5, normed=True)
        #ax.hist(smc_samples[:, i], weights=smc_weights, alpha=0.5, normed=True)
        x_min = omega[:, i].min()
        x_max = omega[:, i].max()
        x_i = np.linspace(x_min, x_max, 100)
        # Create a 1D mixture
        comp = [MultivariateNormal([[mu[j, i]]], C=[[c[j, i]]])
                for j in xrange(log_q.num_comp)]
        log_q_i = MixtureOfMultivariateNormals(comp)
        y_i = np.exp(log_q_i(np.log(x_i[:, None]))) / x_i
        mu_i = 0. if i < 5 else -1.
        x_p_max = min(np.exp(mu_i + 2.), x_i[-1])
        x_p_i = np.linspace(np.exp(mu_i - 2.), x_p_max, 100)
        ax.plot(x_p_i, stats.norm.pdf(np.log(x_p_i), mu_i, scale=1.) / x_p_i,
                'g--', linewidth=2)
        ax.plot(x_i, y_i, 'r-', linewidth=2)
        #ax.hist(samples_var[:, i], alpha=0.5, normed=True)
        name  = '\kappa_%d' % (i + 1) if i < 5 else '\sigma'
        xlabel = '$' + name + '$'
        ylabel = '$p(' + name + '|y)$'
        ax.set_xlabel(xlabel, fontsize=26)
        ax.set_ylabel(ylabel, fontsize=26)
        plt.setp(ax.get_xticklabels(), fontsize=26)
        plt.setp(ax.get_yticklabels(), fontsize=26)
        if i == 0:
            leg = plt.legend(['Prior', 'VAR ($L=%d$)' % log_q.num_comp, 'MCMC (MALA)'], loc='best')
            plt.setp(leg.get_texts(), fontsize=26)
        if i == 5:
            ax.xaxis.set_major_locator(plt.MaxNLocator(6))
        plt.tight_layout()
        png_file = os.path.abspath(os.path.splitext(options.var_file)[0] +
                                   '_input_' + str(i) + '.png')
        print '- writing', png_file
        plt.savefig(png_file)
        del fig
    # Draw the error of MCMC as a function of the number of evaluations
    # Compute the MCMC mean
    #x_m_mcmc = pd.rolling_mean(omega, options.rolling)
    #x_s_mcmc = pd.rolling_std(omega, options.rolling)
    omega = or_omega[50:, :]
    mcmc_step = mcmc_step[50:]
    x_m_mcmc = np.cumsum(omega, axis=0) / np.arange(1, omega.shape[0] + 1)[:, None]
    x_m_mcmc_2 = np.cumsum(omega ** 2., axis=0) / np.arange(1, omega.shape[0] + 1)[:, None]
    x_s_mcmc = np.sqrt(x_m_mcmc_2 - x_m_mcmc ** 2.) 
    x_m_var = np.mean(w * mu, axis=0)
    samples_var = log_q.sample(options.var_samples)
    x_s_var = np.std(samples_var, axis=0)
    # We will compute the mean and the std of MCMC as accurately as possible
    t_m = np.mean(or_omega[700:, :], axis=0)
    t_s = np.std(or_omega[700:, :], axis=0)
    #t_m = x_m_mcmc[-1, :]
    #t_s = x_s_mcmc[-1, :]
    e_m = x_m_mcmc - t_m
    m_rms = np.sqrt(np.mean(e_m ** 2., axis=1)) / np.linalg.norm(t_m)
    e_s = x_s_mcmc - t_s
    s_rms = np.sqrt(np.mean(e_s ** 2., axis=1)) / np.linalg.norm(t_s)
    # Variational error
    v_m_rms = np.linalg.norm(mu - t_m) / np.linalg.norm(t_m)
    v_s_rms = np.linalg.norm(np.sqrt(c) - t_s) / np.linalg.norm(t_s)
    fig = plt.figure()
    ax = fig.add_subplot(111)
    ax.plot(mcmc_step, m_rms, '-b', linewidth=2)
    ax.plot(mcmc_step, np.ones(mcmc_step.shape[0]) * v_m_rms, '--b', linewidth=2)
    ax.plot(mcmc_step, s_rms, '.-g', linewidth=2)
    ax.plot(mcmc_step, np.ones(mcmc_step.shape[0]) * v_s_rms, ':g', linewidth=2)
    ax.set_xlim([0, 70000])
    ax.set_yscale('log')
    png_file = 'rms.png'
    plt.savefig(png_file)