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[mpi] add mpi into ssgplvm

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This commit is contained in:
Zhenwen Dai 2014-05-14 15:07:39 +01:00
parent a702b0862b
commit d911766624
6 changed files with 165 additions and 288 deletions
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268
GPy/models/ss_gplvm.py
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@ -28,8 +28,10 @@ class SSGPLVM(SparseGP):
"""
def __init__(self, Y, input_dim, X=None, X_variance=None, init='PCA', num_inducing=10,
Z=None, kernel=None, inference_method=None, likelihood=None, name='Spike-and-Slab GPLVM', group_spike=False, **kwargs):
Z=None, kernel=None, inference_method=None, likelihood=None, name='Spike-and-Slab GPLVM', group_spike=False, mpi_comm=None, **kwargs):
self.mpi_comm = mpi_comm
if X == None:
from ..util.initialization import initialize_latent
X, fracs = initialize_latent(init, input_dim, Y)
@ -52,19 +54,25 @@ class SSGPLVM(SparseGP):
Z = np.random.permutation(X.copy())[:num_inducing]
assert Z.shape[1] == X.shape[1]
pi = np.empty((input_dim))
pi[:] = 0.5
if mpi_comm != None:
mpi_comm.Bcast(X, root=0)
mpi_comm.Bcast(fracs, root=0)
mpi_comm.Bcast(X_variance, root=0)
mpi_comm.Bcast(gamma, root=0)
mpi_comm.Bcast(Z, root=0)
mpi_comm.Bcast(pi, root=0)
if likelihood is None:
likelihood = Gaussian()
if kernel is None:
kernel = kern.RBF(input_dim, lengthscale=fracs, ARD=True) # + kern.white(input_dim)
pi = np.empty((input_dim))
pi[:] = 0.5
self.variational_prior = SpikeAndSlabPrior(pi=pi) # the prior probability of the latent binary variable b
X = np.asfortranarray(X)
X_variance = np.asfortranarray(X_variance)
gamma = np.asfortranarray(gamma)
X = SpikeAndSlabPosterior(X, X_variance, gamma)
if group_spike:
@ -75,13 +83,25 @@ class SSGPLVM(SparseGP):
self.add_parameter(self.X, index=0)
self.add_parameter(self.variational_prior)
if mpi_comm != None:
from ..util.mpi import divide_data
Y_start, Y_end, Y_list = divide_data(Y.shape[0], mpi_comm)
self.Y_local = self.Y[Y_start:Y_end]
self.X_local = self.X[Y_start:Y_end]
self.Y_range = (Y_start, Y_end)
self.Y_list = np.array(Y_list)
def set_X_gradients(self, X, X_grad):
"""Set the gradients of the posterior distribution of X in its specific form."""
X.mean.gradient, X.variance.gradient, X.binary_prob.gradient = X_grad
def get_X_gradients(self, X):
"""Get the gradients of the posterior distribution of X in its specific form."""
return X.mean.gradient, X.variance.gradient, X.binary_prob.gradient
def parameters_changed(self):
if isinstance(self.inference_method, VarDTC_GPU) or isinstance(self.inference_method, VarDTC_minibatch):
update_gradients(self)
update_gradients(self, mpi_comm=self.mpi_comm)
return
super(SSGPLVM, self).parameters_changed()
@ -105,235 +125,3 @@ class SSGPLVM(SparseGP):
return dim_reduction_plots.plot_latent(self, plot_inducing=plot_inducing, *args, **kwargs)
def do_test_latents(self, Y):
"""
Compute the latent representation for a set of new points Y
Notes:
This will only work with a univariate Gaussian likelihood (for now)
"""
assert not self.likelihood.is_heteroscedastic
N_test = Y.shape[0]
input_dim = self.Z.shape[1]
means = np.zeros((N_test, input_dim))
covars = np.zeros((N_test, input_dim))
dpsi0 = -0.5 * self.output_dim * self.likelihood.precision
dpsi2 = self.dL_dpsi2[0][None, :, :] # TODO: this may change if we ignore het. likelihoods
V = self.likelihood.precision * Y
#compute CPsi1V
if self.Cpsi1V is None:
psi1V = np.dot(self.psi1.T, self.likelihood.V)
tmp, _ = linalg.dtrtrs(self._Lm, np.asfortranarray(psi1V), lower=1, trans=0)
tmp, _ = linalg.dpotrs(self.LB, tmp, lower=1)
self.Cpsi1V, _ = linalg.dtrtrs(self._Lm, tmp, lower=1, trans=1)
dpsi1 = np.dot(self.Cpsi1V, V.T)
start = np.zeros(self.input_dim * 2)
for n, dpsi1_n in enumerate(dpsi1.T[:, :, None]):
args = (self.kern, self.Z, dpsi0, dpsi1_n.T, dpsi2)
xopt, fopt, neval, status = SCG(f=latent_cost, gradf=latent_grad, x=start, optargs=args, display=False)
mu, log_S = xopt.reshape(2, 1, -1)
means[n] = mu[0].copy()
covars[n] = np.exp(log_S[0]).copy()
return means, covars
def dmu_dX(self, Xnew):
"""
Calculate the gradient of the prediction at Xnew w.r.t Xnew.
"""
dmu_dX = np.zeros_like(Xnew)
for i in range(self.Z.shape[0]):
dmu_dX += self.kern.dK_dX(self.Cpsi1Vf[i:i + 1, :], Xnew, self.Z[i:i + 1, :])
return dmu_dX
def dmu_dXnew(self, Xnew):
"""
Individual gradient of prediction at Xnew w.r.t. each sample in Xnew
"""
dK_dX = np.zeros((Xnew.shape[0], self.num_inducing))
ones = np.ones((1, 1))
for i in range(self.Z.shape[0]):
dK_dX[:, i] = self.kern.dK_dX(ones, Xnew, self.Z[i:i + 1, :]).sum(-1)
return np.dot(dK_dX, self.Cpsi1Vf)
def plot_steepest_gradient_map(self, fignum=None, ax=None, which_indices=None, labels=None, data_labels=None, data_marker='o', data_s=40, resolution=20, aspect='auto', updates=False, ** kwargs):
input_1, input_2 = significant_dims = most_significant_input_dimensions(self, which_indices)
X = np.zeros((resolution ** 2, self.input_dim))
indices = np.r_[:X.shape[0]]
if labels is None:
labels = range(self.output_dim)
def plot_function(x):
X[:, significant_dims] = x
dmu_dX = self.dmu_dXnew(X)
argmax = np.argmax(dmu_dX, 1)
return dmu_dX[indices, argmax], np.array(labels)[argmax]
if ax is None:
fig = pyplot.figure(num=fignum)
ax = fig.add_subplot(111)
if data_labels is None:
data_labels = np.ones(self.num_data)
ulabels = []
for lab in data_labels:
if not lab in ulabels:
ulabels.append(lab)
marker = itertools.cycle(list(data_marker))
from GPy.util import Tango
for i, ul in enumerate(ulabels):
if type(ul) is np.string_:
this_label = ul
elif type(ul) is np.int64:
this_label = 'class %i' % ul
else:
this_label = 'class %i' % i
m = marker.next()
index = np.nonzero(data_labels == ul)[0]
x = self.X[index, input_1]
y = self.X[index, input_2]
ax.scatter(x, y, marker=m, s=data_s, color=Tango.nextMedium(), label=this_label)
ax.set_xlabel('latent dimension %i' % input_1)
ax.set_ylabel('latent dimension %i' % input_2)
from matplotlib.cm import get_cmap
from GPy.util.latent_space_visualizations.controllers.imshow_controller import ImAnnotateController
if not 'cmap' in kwargs.keys():
kwargs.update(cmap=get_cmap('jet'))
controller = ImAnnotateController(ax,
plot_function,
tuple(self.X.min(0)[:, significant_dims]) + tuple(self.X.max(0)[:, significant_dims]),
resolution=resolution,
aspect=aspect,
**kwargs)
ax.legend()
ax.figure.tight_layout()
if updates:
pyplot.show()
clear = raw_input('Enter to continue')
if clear.lower() in 'yes' or clear == '':
controller.deactivate()
return controller.view
def plot_X_1d(self, fignum=None, ax=None, colors=None):
"""
Plot latent space X in 1D:
- if fig is given, create input_dim subplots in fig and plot in these
- if ax is given plot input_dim 1D latent space plots of X into each `axis`
- if neither fig nor ax is given create a figure with fignum and plot in there
colors:
colors of different latent space dimensions input_dim
"""
import pylab
if ax is None:
fig = pylab.figure(num=fignum, figsize=(8, min(12, (2 * self.X.shape[1]))))
if colors is None:
colors = pylab.gca()._get_lines.color_cycle
pylab.clf()
else:
colors = iter(colors)
plots = []
x = np.arange(self.X.shape[0])
for i in range(self.X.shape[1]):
if ax is None:
a = fig.add_subplot(self.X.shape[1], 1, i + 1)
elif isinstance(ax, (tuple, list)):
a = ax[i]
else:
raise ValueError("Need one ax per latent dimnesion input_dim")
a.plot(self.X, c='k', alpha=.3)
plots.extend(a.plot(x, self.X.T[i], c=colors.next(), label=r"$\mathbf{{X_{{{}}}}}$".format(i)))
a.fill_between(x,
self.X.T[i] - 2 * np.sqrt(self.X_variance.T[i]),
self.X.T[i] + 2 * np.sqrt(self.X_variance.T[i]),
facecolor=plots[-1].get_color(),
alpha=.3)
a.legend(borderaxespad=0.)
a.set_xlim(x.min(), x.max())
if i < self.X.shape[1] - 1:
a.set_xticklabels('')
pylab.draw()
if ax is None:
fig.tight_layout(h_pad=.01) # , rect=(0, 0, 1, .95))
return fig
def getstate(self):
"""
Get the current state of the class,
here just all the indices, rest can get recomputed
"""
return SparseGP._getstate(self) + [self.init]
def setstate(self, state):
self._const_jitter = None
self.init = state.pop()
SparseGP._setstate(self, state)
def latent_cost_and_grad(mu_S, kern, Z, dL_dpsi0, dL_dpsi1, dL_dpsi2):
"""
objective function for fitting the latent variables for test points
(negative log-likelihood: should be minimised!)
"""
mu, log_S = mu_S.reshape(2, 1, -1)
S = np.exp(log_S)
psi0 = kern.psi0(Z, mu, S)
psi1 = kern.psi1(Z, mu, S)
psi2 = kern.psi2(Z, mu, S)
lik = dL_dpsi0 * psi0 + np.dot(dL_dpsi1.flatten(), psi1.flatten()) + np.dot(dL_dpsi2.flatten(), psi2.flatten()) - 0.5 * np.sum(np.square(mu) + S) + 0.5 * np.sum(log_S)
mu0, S0 = kern.dpsi0_dmuS(dL_dpsi0, Z, mu, S)
mu1, S1 = kern.dpsi1_dmuS(dL_dpsi1, Z, mu, S)
mu2, S2 = kern.dpsi2_dmuS(dL_dpsi2, Z, mu, S)
dmu = mu0 + mu1 + mu2 - mu
# dS = S0 + S1 + S2 -0.5 + .5/S
dlnS = S * (S0 + S1 + S2 - 0.5) + .5
return -lik, -np.hstack((dmu.flatten(), dlnS.flatten()))
def latent_cost(mu_S, kern, Z, dL_dpsi0, dL_dpsi1, dL_dpsi2):
"""
objective function for fitting the latent variables (negative log-likelihood: should be minimised!)
This is the same as latent_cost_and_grad but only for the objective
"""
mu, log_S = mu_S.reshape(2, 1, -1)
S = np.exp(log_S)
psi0 = kern.psi0(Z, mu, S)
psi1 = kern.psi1(Z, mu, S)
psi2 = kern.psi2(Z, mu, S)
lik = dL_dpsi0 * psi0 + np.dot(dL_dpsi1.flatten(), psi1.flatten()) + np.dot(dL_dpsi2.flatten(), psi2.flatten()) - 0.5 * np.sum(np.square(mu) + S) + 0.5 * np.sum(log_S)
return -float(lik)
def latent_grad(mu_S, kern, Z, dL_dpsi0, dL_dpsi1, dL_dpsi2):
"""
This is the same as latent_cost_and_grad but only for the grad
"""
mu, log_S = mu_S.reshape(2, 1, -1)
S = np.exp(log_S)
mu0, S0 = kern.dpsi0_dmuS(dL_dpsi0, Z, mu, S)
mu1, S1 = kern.dpsi1_dmuS(dL_dpsi1, Z, mu, S)
mu2, S2 = kern.dpsi2_dmuS(dL_dpsi2, Z, mu, S)
dmu = mu0 + mu1 + mu2 - mu
# dS = S0 + S1 + S2 -0.5 + .5/S
dlnS = S * (S0 + S1 + S2 - 0.5) + .5
return -np.hstack((dmu.flatten(), dlnS.flatten()))