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# CURRENTLY UNDER PROGRESS
# Copyright (c) 2013, Mu Niu,Arno Solin, Simo Sarkka.
# Licensed under the BSD 3-clause license (see LICENSE.txt)
#
# This implementation of converting GPs to state space models is based on the article:
#
# @article{Sarkka+Solin+Hartikainen:2013,
# author = {Simo S\"arkk\"a and Arno Solin and Jouni Hartikainen},
# year = {2013},
# title = {Spatiotemporal learning via infinite-dimensional {B}ayesian filtering and smoothing},
# journal = {IEEE Signal Processing Magazine},
# volume = {30},
# number = {4},
# pages = {51--61}
# }
#
import numpy as np
from scipy import linalg
from ..core import Model
from .. import kern
from GPy.util.plot import gpplot, Tango, x_frame1D
import pylab as pb
class StateSpace_ODE(Model):
def __init__(self, X, Y, kernel=None):
super(StateSpace_ODE, self).__init__()
self.num_data, input_dim = X.shape
assert input_dim==1, "State space methods for time only but for two outputs"
num_data_Y, self.output_dim = Y.shape
assert num_data_Y == self.num_data, "X and Y data don't match"
assert self.output_dim == 2, "State space methods for single outputs only"
# Make sure the observations are ordered in time
sort_index = np.argsort(X[:,0])
self.X = X[sort_index]
self.Y = Y[sort_index]
self.a = 1.
self.b = 1.
# Noise variance
self.sigma2 = .1
# Default kernel
if kernel is None:
self.kern = kern.Matern32(1)
else:
self.kern = kernel
# Make sure all parameters are positive
self.ensure_default_constraints()
# Assert that the kernel is supported
#assert self.kern.sde() not False, "This kernel is not supported for state space estimation"
def _set_params(self, x):
self.kern._set_params(x[:self.kern.num_params_transformed()])
self.sigma2 = x[-3]
self.a = x[-2]
self.b = x[-1]
def _get_params(self):
#return np.append(self.kern._get_params_transformed(), self.sigma2, self.a, self.b)
return np.hstack([ self.kern._get_params_transformed(), self.sigma2, self.a, self.b ])
def _get_param_names(self):
return self.kern._get_param_names_transformed() + ['noise_variance','a','b']
def log_likelihood(self):
# Get the model matrices from the kernel
#(F,L,Qc,H,Pinf) = self.kern.sde()
(F,L,Qc,H,Pinf,use1,use2,use3) = self.kern.sde()
Fm = np.zeros((3,3))
Fm[1:,1:] = F
Fm[0,0] = -self.a
Fm[0,1] = self.b
Lm = np.zeros((3,1))
Lm[1:,0] = L.flatten()
Hm = np.zeros((2,3))
Hm[0,0] = 1
Hm[1,1:] = H
Pinfm = linalg.solve_lyapunov(Fm,-Lm.dot(Qc).dot(Lm.T))
# Use the Kalman filter to evaluate the likelihood
#return self.kf_likelihood(F,L,Qc,H,self.sigma2,Pinf,self.X.T,self.Y.T)
return self.kf_likelihood(Fm,Lm,Qc,Hm,self.sigma2,Pinfm,self.X.T,self.Y.T)
def _log_likelihood_gradients(self):
# Get the model matrices from the kernel
#(F,L,Qc,H,Pinf,dF,dQc,dPinf) = self.kern.sde()
(F,L,Qc,H,Pinf,use1,use2,use3) = self.kern.sde()
# Calculate the likelihood gradients TODO
#return self.kf_likelihood_g(F,L,Qc,self.sigma2,H,Pinf,dF,dQc,dPinf,self.X,self.Y)
return False
def predict_raw(self, Xnew, filteronly=False):
# Make a single matrix containing training and testing points
X = np.vstack((self.X, Xnew))
Y = np.vstack((self.Y, np.nan*np.zeros((Xnew.shape[0],2))))
# Sort the matrix (save the order)
_, return_index, return_inverse = np.unique(X,True,True)
X = X[return_index]
Y = Y[return_index]
# Get the model matrices from the kernel
#(F,L,Qc,H,Pinf) = self.kern.sde()
(F,L,Qc,H,Pinf,use1,use2,use3) = self.kern.sde()
Fm = np.zeros((3,3))
Fm[1:,1:] = F
Fm[0,0] = -self.a
Fm[0,1] = self.b
Lm = np.zeros((3,1))
Lm[1:,0] = L.flatten()
Hm = np.zeros((2,3))
Hm[0,0] = 1
Hm[1,1:] = H
Pinfm = linalg.solve_lyapunov(Fm,-Lm.dot(Qc).dot(Lm.T))
# Run the Kalman filter
#stop
(M, P) = self.kalman_filter(Fm,Lm,Qc,Hm,self.sigma2,Pinfm,X.T,Y.T)
# Run the Rauch-Tung-Striebel smoother
#if not filter:
(M, P) = self.rts_smoother(Fm,Lm,Qc,X.T,M,P)
# Put the data back in the original order
M = M[:,return_inverse]
P = P[:,:,return_inverse]
# Only return the values for Xnew
M = M[:,self.num_data:]
P = P[:,:,self.num_data:]
# Calculate the mean and variance
m = Hm.dot(M).T
V=P[0:2,0:2,:]
#V = np.tensordot(H[0],P,(0,0))
#V = np.tensordot(V,H[0],(0,0))
#V = V[:,None]
#stop
# Return the posterior of the state
return (m, V)
def predict(self, Xnew, filteronly=False):
# Run the Kalman filter to get the state
(m, V) = self.predict_raw(Xnew,filteronly=filteronly)
# Add the noise variance to the state variance
V[0,0,:] += self.sigma2
V[1,1,:] += self.sigma2
# Lower and upper bounds
lower = m[:,0] - 2*np.sqrt(V[0,0,:])
upper = m[:,0] + 2*np.sqrt(V[0,0,:])
#stop
# Return mean and variance
return (m[:,0], V[0,0,:], lower, upper)
def plot(self, plot_limits=None, levels=20, samples=0, fignum=None,
ax=None, resolution=None, plot_raw=False, plot_filter=False,
linecol=Tango.colorsHex['darkBlue'],fillcol=Tango.colorsHex['lightBlue']):
# Deal with optional parameters
if ax is None:
fig = pb.figure(num=fignum)
ax = fig.add_subplot(111)
# Define the frame on which to plot
resolution = resolution or 200
Xnew, xmin, xmax = x_frame1D(self.X, plot_limits=plot_limits)
Xgrid = np.empty((Xnew.shape[0],2))
Xgrid[:,0] = Xnew.flatten()
Xgrid[:,1] = 0
#stop
# Make a prediction on the frame and plot it
if plot_raw:
m, v = self.predict_raw(Xgrid,filteronly=plot_filter)
lower = m - 2*np.sqrt(v)
upper = m + 2*np.sqrt(v)
Y = self.Y
else:
#m, v, lower, upper = self.predict(Xgrid,filteronly=plot_filter)
m, v, lower, upper = self.predict(Xnew,filteronly=plot_filter)
Y = self.Y
#stop
# Plot the values
gpplot(Xnew, m, lower, upper, axes=ax, edgecol=linecol, fillcol=fillcol)
#ax.plot(self.X, self.Y, 'kx', mew=1.5)
ax.plot(self.X, self.Y[:,0], 'kx', mew=1.5)
# Optionally plot some samples
if samples:
Ysim = self.posterior_samples(Xgrid, samples)
for yi in Ysim.T:
ax.plot(Xgrid, yi, Tango.colorsHex['darkBlue'], linewidth=0.25)
# Set the limits of the plot to some sensible values
ymin, ymax = min(np.append(Y.flatten(), lower.flatten())), max(np.append(Y.flatten(), upper.flatten()))
ymin, ymax = ymin - 0.1 * (ymax - ymin), ymax + 0.1 * (ymax - ymin)
ax.set_xlim(xmin, xmax)
ax.set_ylim(ymin, ymax)
def posterior_samples_f(self,X,size=10):
# Reorder X values
sort_index = np.argsort(X[:,0])
X = X[sort_index]
# Get the model matrices from the kernel
#(F,L,Qc,H,Pinf) = self.kern.sde()
(F,L,Qc,H,Pinf,use1,use2,use3) = self.kern.sde()
# Allocate space for results
Y = np.empty((size,X.shape[0]))
# Simulate random draws
for j in range(0,size):
Y[j,:] = H.dot(self.simulate(F,L,Qc,Pinf,X.T))
# Reorder simulated values
Y[:,sort_index] = Y[:,:]
# Return trajectory
return Y.T
def posterior_samples(self, X, size=10):
# Make samples of f
Y = self.posterior_samples_f(X,size)
# Add noise
Y += np.sqrt(self.sigma2)*np.random.randn(Y.shape[0],Y.shape[1])
# Return trajectory
return Y
def kalman_filter(self,F,L,Qc,H,R,Pinf,X,Y):
# KALMAN_FILTER - Run the Kalman filter for a given model and data
# Allocate space for results
MF = np.empty((F.shape[0],Y.shape[1]))
PF = np.empty((F.shape[0],F.shape[0],Y.shape[1]))
# Initialize
MF[:,-1] = np.zeros(F.shape[0])
PF[:,:,-1] = Pinf.copy()
# Time step lengths
dt = np.empty(X.shape)
dt[:,0] = X[:,1]-X[:,0]
dt[:,1:] = np.diff(X)
# Solve the LTI SDE for these time steps
As, Qs, index = self.lti_disc(F,L,Qc,dt)
#stop
# Kalman filter
for k in range(0,Y.shape[1]):
# Form discrete-time model
#(A, Q) = self.lti_disc(F,L,Qc,dt[:,k])
A = As[:,:,index[k]];
Q = Qs[:,:,index[k]];
# Prediction step
MF[:,k] = A.dot(MF[:,k-1])
PF[:,:,k] = A.dot(PF[:,:,k-1]).dot(A.T) + Q
# Update step (only if there is data)
#if not np.isnan(Y[:,k]):
if not np.isnan(Y[0,k]):
if Y.shape[0]==1:
K = PF[:,:,k].dot(H.T)/(H.dot(PF[:,:,k]).dot(H.T) + R)
else:
#stop
LL = linalg.cho_factor(H.dot(PF[:,:,k]).dot(H.T) + R)
K = linalg.cho_solve(LL, H.dot(PF[:,:,k].T)).T
MF[:,k] += K.dot(Y[:,k]-H.dot(MF[:,k]))
PF[:,:,k] -= K.dot(H).dot(PF[:,:,k])
# Return values
return (MF, PF)
def rts_smoother(self,F,L,Qc,X,MS,PS):
# RTS_SMOOTHER - Run the RTS smoother for a given model and data
# Time step lengths
dt = np.empty(X.shape)
dt[:,0] = X[:,1]-X[:,0]
dt[:,1:] = np.diff(X)
# Solve the LTI SDE for these time steps
As, Qs, index = self.lti_disc(F,L,Qc,dt)
# Sequentially smooth states starting from the end
for k in range(2,X.shape[1]+1):
# Form discrete-time model
#(A, Q) = self.lti_disc(F,L,Qc,dt[:,1-k])
A = As[:,:,index[1-k]];
Q = Qs[:,:,index[1-k]];
# Smoothing step
LL = linalg.cho_factor(A.dot(PS[:,:,-k]).dot(A.T)+Q)
G = linalg.cho_solve(LL,A.dot(PS[:,:,-k])).T
MS[:,-k] += G.dot(MS[:,1-k]-A.dot(MS[:,-k]))
PS[:,:,-k] += G.dot(PS[:,:,1-k]-A.dot(PS[:,:,-k]).dot(A.T)-Q).dot(G.T)
# Return
return (MS, PS)
def kf_likelihood(self,F,L,Qc,H,R,Pinf,X,Y):
# Evaluate marginal likelihood
# Initialize
lik = 0
m = np.zeros((F.shape[0],1))
P = Pinf.copy()
# Time step lengths
dt = np.empty(X.shape)
dt[:,0] = X[:,1]-X[:,0]
dt[:,1:] = np.diff(X)
# Solve the LTI SDE for these time steps
As, Qs, index = self.lti_disc(F,L,Qc,dt)
# Kalman filter for likelihood evaluation
for k in range(0,Y.shape[1]):
# Form discrete-time model
#(A,Q) = self.lti_disc(F,L,Qc,dt[:,k])
A = As[:,:,index[k]];
Q = Qs[:,:,index[k]];
# Prediction step
m = A.dot(m)
P = A.dot(P).dot(A.T) + Q
#stop
# Update step only if there is data
if not np.isnan(Y[0,k]):
v = Y[:,k][:,None]-H.dot(m)
if Y.shape[0]==1:
S = H.dot(P).dot(H.T) + R
K = P.dot(H.T)/S
lik -= 0.5*np.log(S)
lik -= 0.5*v.shape[0]*np.log(2*np.pi)
lik -= 0.5*v*v/S
else:
LL, isupper = linalg.cho_factor(H.dot(P).dot(H.T) + R*np.eye(Y.shape[0]))
lik -= np.sum(np.log(np.diag(LL)))
lik -= 0.5*v.shape[0]*np.log(2*np.pi)
lik -= 0.5*linalg.cho_solve((LL, isupper),v).T.dot(v)
K = linalg.cho_solve((LL, isupper), H.dot(P.T)).T
m += K.dot(v)
P -= K.dot(H).dot(P)
#stop
# Return likelihood
return lik[0,0]
#return lik
def simulate(self,F,L,Qc,Pinf,X):
# Simulate a trajectory using the state space model
# Allocate space for results
f = np.zeros((F.shape[0],X.shape[1]))
# Initial state
f[:,0:1] = np.linalg.cholesky(Pinf).dot(np.random.randn(F.shape[0],1))
# Sweep through remaining time points
for k in range(1,X.shape[1]):
# Form discrete-time model
(A,Q) = self.lti_disc(F,L,Qc,X[:,k]-X[:,k-1])
# Draw the state
f[:,k] = A.dot(f[:,k-1]).T + np.dot(np.linalg.cholesky(Q),np.random.randn(A.shape[0],1)).T
# Return values
return f
def lti_disc(self,F,L,Qc,dt):
# Discrete-time solution to the LTI SDE
# Dimensionality
n = F.shape[0]
index = 0
# Check for numbers of time steps
if dt.flatten().shape[0]==1:
# The covariance matrix by matrix fraction decomposition
Phi = np.zeros((2*n,2*n))
Phi[:n,:n] = F
Phi[:n,n:] = L.dot(Qc).dot(L.T)
Phi[n:,n:] = -F.T
AB = linalg.expm(Phi*dt).dot(np.vstack((np.zeros((n,n)),np.eye(n))))
Q = linalg.solve(AB[n:,:].T,AB[:n,:].T)
# The dynamical model
A = linalg.expm(F*dt)
# Return
return A, Q
# Optimize for cases where time steps occur repeatedly
else:
# Time discretizations (round to 14 decimals to avoid problems)
dt, _, index = np.unique(np.round(dt,14),True,True)
# Allocate space for A and Q
A = np.empty((n,n,dt.shape[0]))
Q = np.empty((n,n,dt.shape[0]))
# Call this function for each dt
for j in range(0,dt.shape[0]):
A[:,:,j], Q[:,:,j] = self.lti_disc(F,L,Qc,dt[j])
# Return
return A, Q, index