| import numpy as np |
| import numpy.matlib |
|
|
| LEFT, ROPE, RIGHT = range(3) |
|
|
| def correlated_ttest_MC(x, rope, runs=1, nsamples=50000): |
| """ |
| See correlated_ttest module for explanations |
| """ |
| if x.ndim == 2: |
| x = x[:, 1] - x[:, 0] |
| diff=x |
| n = len(diff) |
| nfolds = n / runs |
| x = np.mean(diff) |
| |
| var = np.var(diff, ddof=1) * (1 / n + 1 / (nfolds - 1)) |
| if var == 0: |
| return int(x < rope), int(-rope <= x <= rope), int(rope < x) |
| |
| return x+np.sqrt(var)*np.random.standard_t( n - 1, nsamples) |
| |
| |
|
|
| |
| def correlated_ttest(x, rope, runs=1, verbose=False, names=('C1', 'C2')): |
| import scipy.stats as stats |
| """ |
| Compute correlated t-test |
| |
| The function uses the Bayesian interpretation of the p-value and returns |
| the probabilities the difference are below `-rope`, within `[-rope, rope]` |
| and above the `rope`. For details, see `A Bayesian approach for comparing |
| cross-validated algorithms on multiple data sets |
| <http://link.springer.com/article/10.1007%2Fs10994-015-5486-z>`_, |
| G. Corani and A. Benavoli, Mach Learning 2015. |
| |
| | |
| The test assumes that the classifiers were evaluated using cross |
| validation. The number of folds is determined from the length of the vector |
| of differences, as `len(diff) / runs`. The variance includes a correction |
| for underestimation of variance due to overlapping training sets, as |
| described in `Inference for the Generalization Error |
| <http://link.springer.com/article/10.1023%2FA%3A1024068626366>`_, |
| C. Nadeau and Y. Bengio, Mach Learning 2003.) |
| |
| | |
| Args: |
| x (array): a vector of differences or a 2d array with pairs of scores. |
| rope (float): the width of the rope |
| runs (int): number of repetitions of cross validation (default: 1) |
| return: probablities (tuple) that differences are below -rope, within rope or |
| above rope |
| """ |
| if x.ndim == 2: |
| x = x[:, 1] - x[:, 0] |
| diff=x |
| n = len(diff) |
| nfolds = n / runs |
| x = np.mean(diff) |
| |
| var = np.var(diff, ddof=1) * (1 / n + 1 / (nfolds - 1)) |
| if var == 0: |
| return int(x < rope), int(-rope <= x <= rope), int(rope < x) |
| pr = 1-stats.t.cdf(rope, n - 1, x, np.sqrt(var)) |
| pl = stats.t.cdf(-rope, n - 1, x, np.sqrt(var)) |
| pe=1-pl-pr |
| if verbose: |
| print('P({c1} > {c2}) = {pl}, P(rope) = {pe}, P({c2} > {c1}) = {pr}'. |
| format(c1=names[0], c2=names[1], pl=pl, pe=pe, pr=pr)) |
| return pl, pe, pr |
| |
| |
| def signtest_MC(x, rope, prior_strength=1, prior_place=ROPE, nsamples=50000): |
| """ |
| Args: |
| x (array): a vector of differences or a 2d array with pairs of scores. |
| rope (float): the width of the rope |
| prior_strength (float): prior strength (default: 1) |
| prior_place (LEFT, ROPE or RIGHT): the region to which the prior is |
| assigned (default: ROPE) |
| nsamples (int): the number of Monte Carlo samples |
| |
| Returns: |
| 2-d array with rows corresponding to samples and columns to |
| probabilities `[p_left, p_rope, p_right]` |
| """ |
| if prior_strength < 0: |
| raise ValueError('Prior strength must be nonegative') |
| if nsamples < 0: |
| raise ValueError('Number of samples must be a positive integer') |
| if rope < 0: |
| raise ValueError('Rope must be a positive number') |
| |
| if x.ndim == 2: |
| x = x[:, 1] - x[:, 0] |
| nleft = sum(x < -rope) |
| nright = sum(x > rope) |
| nrope = len(x) - nleft - nright |
| alpha = np.array([nleft, nrope, nright], dtype=float) |
| alpha += 0.0001 |
| alpha[prior_place] += prior_strength |
| return np.random.dirichlet(alpha, nsamples) |
|
|
| def signtest(x, rope, prior_strength=1, prior_place=ROPE, nsamples=50000, |
| verbose=False, names=('C1', 'C2')): |
| """ |
| Args: |
| x (array): a vector of differences or a 2d array with pairs of scores. |
| rope (float): the width of the rope |
| prior_strength (float): prior strength (default: 1) |
| prior_place (LEFT, ROPE or RIGHT): the region to which the prior is |
| assigned (default: ROPE) |
| nsamples (int): the number of Monte Carlo samples |
| verbose (bool): report the computed probabilities |
| names (pair of str): the names of the two classifiers |
| |
| Returns: |
| p_left, p_rope, p_right |
| """ |
| samples = signtest_MC(x, rope, prior_strength, prior_place, nsamples) |
| |
| winners = np.argmax(samples, axis=1) |
| pl, pe, pr = np.bincount(winners, minlength=3) / len(winners) |
| if verbose: |
| print('P({c1} > {c2}) = {pl}, P(rope) = {pe}, P({c2} > {c1}) = {pr}'. |
| format(c1=names[0], c2=names[1], pl=pl, pe=pe, pr=pr)) |
| return pl, pe, pr |
|
|
| |
| def heaviside(X): |
| Y = np.zeros(X.shape); |
| Y[np.where(X > 0)] = 1; |
| Y[np.where(X == 0)] = 0.5; |
| return Y |
|
|
| def signrank_MC(x, rope, prior_strength=0.6, prior_place=ROPE, nsamples=50000): |
| """ |
| Args: |
| x (array): a vector of differences or a 2d array with pairs of scores. |
| rope (float): the width of the rope |
| prior_strength (float): prior strength (default: 0.6) |
| prior_place (LEFT, ROPE or RIGHT): the region to which the prior is |
| assigned (default: ROPE) |
| nsamples (int): the number of Monte Carlo samples |
| |
| Returns: |
| 2-d array with rows corresponding to samples and columns to |
| probabilities `[p_left, p_rope, p_right]` |
| """ |
| if x.ndim == 2: |
| zm = x[:, 1] - x[:, 0] |
| else: |
| zm = x |
| nm=len(zm) |
| if prior_place==ROPE: |
| z0=[0] |
| if prior_place==LEFT: |
| z0=[-float('inf')] |
| if prior_place==RIGHT: |
| z0=[float('inf')] |
| z=np.concatenate((zm,z0)) |
| n=len(z) |
| z=np.transpose(np.asmatrix(z)) |
| X=np.matlib.repmat(z,1,n) |
| Y=np.matlib.repmat(-np.transpose(z)+2*rope,n,1) |
| Aright = heaviside(X-Y) |
| X=np.matlib.repmat(-z,1,n) |
| Y=np.matlib.repmat(np.transpose(z)+2*rope,n,1) |
| Aleft = heaviside(X-Y) |
| alpha=np.concatenate((np.ones(nm),[prior_strength]),axis=0) |
| samples=np.zeros((nsamples,3), dtype=float) |
| for i in range(0,nsamples): |
| data = np.random.dirichlet(alpha, 1) |
| samples[i,2]=numpy.inner(np.dot(data,Aright),data) |
| samples[i,0]=numpy.inner(np.dot(data,Aleft),data) |
| samples[i,1]=1-samples[i,0]-samples[i,2] |
| |
| return samples |
|
|
| def signrank(x, rope, prior_strength=0.6, prior_place=ROPE, nsamples=50000, |
| verbose=False, names=('C1', 'C2')): |
| """ |
| Args: |
| x (array): a vector of differences or a 2d array with pairs of scores. |
| rope (float): the width of the rope |
| prior_strength (float): prior strength (default: 0.6) |
| prior_place (LEFT, ROPE or RIGHT): the region to which the prior is |
| assigned (default: ROPE) |
| nsamples (int): the number of Monte Carlo samples |
| verbose (bool): report the computed probabilities |
| names (pair of str): the names of the two classifiers |
| |
| Returns: |
| p_left, p_rope, p_right |
| """ |
| samples = signrank_MC(x, rope, prior_strength, prior_place, nsamples) |
| |
| winners = np.argmax(samples, axis=1) |
| pl, pe, pr = np.bincount(winners, minlength=3) / len(winners) |
| if verbose: |
| print('P({c1} > {c2}) = {pl}, P(rope) = {pe}, P({c2} > {c1}) = {pr}'. |
| format(c1=names[0], c2=names[1], pl=pl, pe=pe, pr=pr)) |
| return pl, pe, pr |
|
|
|
|
| def hierarchical(diff, rope, rho, upperAlpha=2, lowerAlpha =1, lowerBeta = 0.01, upperBeta = 0.1,std_upper_bound=1000, verbose=False, names=('C1', 'C2') ): |
| |
| |
| |
| |
| |
| samples=hierarchical_MC(diff, rope, rho, upperAlpha, lowerAlpha, lowerBeta, upperBeta, std_upper_bound,names ) |
| winners = np.argmax(samples, axis=1) |
| pl, pe, pr = np.bincount(winners, minlength=3) / len(winners) |
| if verbose: |
| print('P({c1} > {c2}) = {pl}, P(rope) = {pe}, P({c2} > {c1}) = {pr}'. |
| format(c1=names[0], c2=names[1], pl=pl, pe=pe, pr=pr)) |
| return pl, pe, pr |
|
|
| def hierarchical_MC(diff, rope, rho, upperAlpha=2, lowerAlpha =1, lowerBeta = 0.01, upperBeta = 0.1, std_upper_bound=1000, names=('C1', 'C2') ): |
| |
| |
| |
| |
|
|
| import scipy.stats as stats |
| import pystan |
| |
| stdX = np.mean(np.std(diff,1)) |
| x = diff/stdX |
| rope=rope/stdX |
| |
| |
| for i in range(0,len(x)): |
| if np.std(x[i,:])==0: |
| x[i,:]=x[i,:]+np.random.normal(0,np.min(1/1000000000,np.abs(np.mean(x[i,:])/100000000))) |
| |
| |
| |
| hierarchical_code = """ |
| /*Hierarchical Bayesian model for the analysis of competing cross-validated classifiers on multiple data sets. |
| */ |
| |
| data { |
| |
| real deltaLow; |
| real deltaHi; |
| |
| //bounds of the sigma of the higher-level distribution |
| real std0Low; |
| real std0Hi; |
| |
| //bounds on the domain of the sigma of each data set |
| real stdLow; |
| real stdHi; |
| |
| |
| //number of results for each data set. Typically 100 (10 runs of 10-folds cv) |
| int<lower=2> Nsamples; |
| |
| //number of data sets. |
| int<lower=1> q; |
| |
| //difference of accuracy between the two classifier, on each fold of each data set. |
| matrix[q,Nsamples] x; |
| |
| //correlation (1/(number of folds)) |
| real rho; |
| |
| real upperAlpha; |
| real lowerAlpha; |
| real upperBeta; |
| real lowerBeta; |
| |
| } |
| |
| |
| transformed data { |
| |
| //vector of 1s appearing in the likelihood |
| vector[Nsamples] H; |
| |
| //vector of 0s: the mean of the mvn noise |
| vector[Nsamples] zeroMeanVec; |
| |
| /* M is the correlation matrix of the mvn noise. |
| invM is its inverse, detM its determinant */ |
| matrix[Nsamples,Nsamples] invM; |
| real detM; |
| |
| //The determinant of M is analytically known |
| detM <- (1+(Nsamples-1)*rho)*(1-rho)^(Nsamples-1); |
| |
| //build H and invM. They do not depend on the data. |
| for (j in 1:Nsamples){ |
| zeroMeanVec[j]<-0; |
| H[j]<-1; |
| for (i in 1:Nsamples){ |
| if (j==i) |
| invM[j,i]<- (1 + (Nsamples-2)*rho)*pow((1-rho),Nsamples-2); |
| else |
| invM[j,i]<- -rho * pow((1-rho),Nsamples-2); |
| } |
| } |
| /*at this point invM contains the adjugate of M. |
| we divide it by det(M) to obtain the inverse of M.*/ |
| invM <-invM/detM; |
| } |
| |
| parameters { |
| //mean of the hyperprior from which we sample the delta_i |
| real<lower=deltaLow,upper=deltaHi> delta0; |
| |
| //std of the hyperprior from which we sample the delta_i |
| real<lower=std0Low,upper=std0Hi> std0; |
| |
| //delta_i of each data set: vector of lenght q. |
| vector[q] delta; |
| |
| //sigma of each data set: : vector of lenght q. |
| vector<lower=stdLow,upper=stdHi>[q] sigma; |
| |
| /* the domain of (nu - 1) starts from 0 |
| and can be given a gamma prior*/ |
| real<lower=0> nuMinusOne; |
| |
| //parameters of the Gamma prior on nuMinusOne |
| real<lower=lowerAlpha,upper=upperAlpha> gammaAlpha; |
| real<lower=lowerBeta, upper=upperBeta> gammaBeta; |
| |
| } |
| |
| transformed parameters { |
| //degrees of freedom |
| real<lower=1> nu ; |
| |
| /*difference between the data (x matrix) and |
| the vector of the q means.*/ |
| matrix[q,Nsamples] diff; |
| |
| vector[q] diagQuad; |
| |
| /*vector of length q: |
| 1 over the variance of each data set*/ |
| vector[q] oneOverSigma2; |
| |
| vector[q] logDetSigma; |
| |
| vector[q] logLik; |
| |
| //degrees of freedom |
| nu <- nuMinusOne + 1 ; |
| |
| //1 over the variance of each data set |
| oneOverSigma2 <- rep_vector(1, q) ./ sigma; |
| oneOverSigma2 <- oneOverSigma2 ./ sigma; |
| |
| /*the data (x) minus a matrix done as follows: |
| the delta vector (of lenght q) pasted side by side Nsamples times*/ |
| diff <- x - rep_matrix(delta,Nsamples); |
| |
| //efficient matrix computation of the likelihood. |
| diagQuad <- diagonal (quad_form (invM,diff')); |
| logDetSigma <- 2*Nsamples*log(sigma) + log(detM) ; |
| logLik <- -0.5 * logDetSigma - 0.5*Nsamples*log(6.283); |
| logLik <- logLik - 0.5 * oneOverSigma2 .* diagQuad; |
| |
| } |
| |
| model { |
| /*mu0 and std0 are not explicitly sampled here. |
| Stan automatically samples them: mu0 as uniform and std0 as |
| uniform over its domain (std0Low,std0Hi).*/ |
| |
| //sampling the degrees of freedom |
| nuMinusOne ~ gamma ( gammaAlpha, gammaBeta); |
| |
| //vectorial sampling of the delta_i of each data set |
| delta ~ student_t(nu, delta0, std0); |
| |
| //logLik is computed in the previous block |
| increment_log_prob(sum(logLik)); |
| } |
| """ |
| datatable=x |
| std_within=np.mean(np.std(datatable,1)) |
|
|
| Nsamples = len(datatable[0]) |
| q= len(datatable) |
| if q>1: |
| std_among=np.std(np.mean(datatable,1)) |
| else: |
| std_among=np.mean(np.std(datatable,1)) |
|
|
| |
| hierachical_dat = {'x': datatable, |
| 'deltaLow' : -np.max(np.abs(datatable)), |
| 'deltaHi' : np.max(np.abs(datatable)), |
| 'stdLow' : 0, |
| 'stdHi' : std_within*std_upper_bound, |
| 'std0Low' : 0, |
| 'std0Hi' : std_among*std_upper_bound, |
| 'Nsamples' : Nsamples, |
| 'q' : q, |
| 'rho' : rho, |
| 'upperAlpha' : upperAlpha, |
| 'lowerAlpha' : lowerAlpha, |
| 'upperBeta' : upperBeta, |
| 'lowerBeta' : lowerBeta} |
|
|
| |
| fit = pystan.stan(model_code=hierarchical_code, data=hierachical_dat, |
| iter=1000, chains=4) |
| |
| la = fit.extract(permuted=True) |
| mu = la['delta0'] |
| stdh = la['std0'] |
| nu = la['nu'] |
| |
| samples=np.zeros((len(mu),3), dtype=float) |
| for i in range(0,len(mu)): |
| samples[i,2]=1-stats.t.cdf(rope, nu[i], mu[i], stdh[i]) |
| samples[i,0]=stats.t.cdf(-rope, nu[i], mu[i], stdh[i]) |
| samples[i,1]=1-samples[i,0]-samples[i,2] |
| |
| return samples |
|
|
| def plot_posterior(samples, names=('C1', 'C2')): |
| """ |
| Args: |
| x (array): a vector of differences or a 2d array with pairs of scores. |
| names (pair of str): the names of the two classifiers |
| |
| Returns: |
| matplotlib.pyplot.figure |
| """ |
| return plot_simplex(samples, names) |
|
|
|
|
| def plot_simplex(points, names=('C1', 'C2')): |
| import matplotlib.pyplot as plt |
| from matplotlib.lines import Line2D |
| from matplotlib.pylab import rcParams |
|
|
| def _project(points): |
| from math import sqrt, sin, cos, pi |
| p1, p2, p3 = points.T / sqrt(3) |
| x = (p2 - p1) * cos(pi / 6) + 0.5 |
| y = p3 - (p1 + p2) * sin(pi / 6) + 1 / (2 * sqrt(3)) |
| return np.vstack((x, y)).T |
|
|
| vert0 = _project(np.array( |
| [[0.3333, 0.3333, 0.3333], [0.5, 0.5, 0], [0.5, 0, 0.5], [0, 0.5, 0.5]])) |
|
|
| fig = plt.figure() |
| fig.set_size_inches(8, 7) |
| |
| nl, ne, nr = np.max(points, axis=0) |
| for i, n in enumerate((nl, ne, nr)): |
| if n < 0.001: |
| print("p{} is too small, switching to 2d plot".format(names[::-1] + ["rope"])) |
| coords = sorted(set(range(3)) - i) |
| return plot2d(points[:, coords], labels[coords]) |
|
|
| |
| fig.gca().add_line( |
| Line2D([0, 0.5, 1.0, 0], |
| [0, np.sqrt(3) / 2, 0, 0], color='orange')) |
| |
| for i in (1, 2, 3): |
| fig.gca().add_line( |
| Line2D([vert0[0, 0], vert0[i, 0]], |
| [vert0[0, 1], vert0[i, 1]], color='orange')) |
| |
| rcParams.update({'font.size': 16}) |
| fig.gca().text(-0.08, -0.08, 'p({})'.format(names[0]), color='orange') |
| fig.gca().text(0.44, np.sqrt(3) / 2 + 0.05, 'p(rope)', color='orange') |
| fig.gca().text(1.00, -0.08, 'p({})'.format(names[1]), color='orange') |
|
|
| |
| tripts = _project(points[:, [0, 2, 1]]) |
| plt.hexbin(tripts[:, 0], tripts[:, 1], mincnt=1, cmap=plt.cm.Blues_r) |
| |
| fig.gca().set_xlim(-0.2, 1.2) |
| fig.gca().set_ylim(-0.2, 1.2) |
| fig.gca().axis('off') |
| return fig |
|
|
