File:GaussianProcessDecomposition 3RandomSignals.svg
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Size of this PNG preview of this SVG file: 378 × 270 pixels. Other resolutions: 320 × 229 pixels | 640 × 457 pixels | 1,024 × 731 pixels | 1,280 × 914 pixels | 2,560 × 1,829 pixels.
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Summary[edit]
| Description |
English: Three randomly generated signals that follow certain Gaussian processes.
Deutsch: Drei zufällig erzeugte Signale, die bestimmten Gaußprozessen folgen. |
| Date | |
| Source | Own work |
| Author | Christian Schirm |
| SVG development |  This plot was created with Matplotlib. |
| Source code | Python code#This source code is public domain
#Author: Christian Schirm
import numpy, scipy.spatial
import matplotlib.pyplot as plt
import imageio
numpy.random.seed(50)
# Covariance matrix
def covMat(x1, x2, covFunc, noise=0):
cov = covFunc(scipy.spatial.distance_matrix(numpy.atleast_2d(x1).T, numpy.atleast_2d(x2).T))
if noise: cov += numpy.diag(numpy.ones(len(cov))*noise)
return cov
# Decomposition of e.g. sum of signals into components
def decompose(xIn, yIn, xOut, covFuncIn, covFuncListOut):
Ckk = covMat(xIn, xIn, covFuncIn, noise=0)
n = len(covFuncListOut)
N = len(xOut)
Cuu = numpy.zeros((n*len(xOut), n*len(xOut)))
Cuk = numpy.zeros((n*len(xOut), len(xOut)))
for i,covOut in enumerate(covFuncListOut):
Cuu[i*N:(i+1)*N, i*N:(i+1)*N] = covMat(xOut, xOut, covOut, noise=0)
Cuk[i*N:(i+1)*N,:] = covMat(xOut, xIn, covOut, noise=0)
CkkInv = numpy.linalg.inv(Ckk)
y = Cuk.dot(CkkInv.dot(yIn))
sigmaSplit = (Cuu - Cuk.dot(CkkInv.dot(Cuk.T)))
return y, sigmaSplit
# Covariance function 1: smooth random signal underground
covFunc1 = lambda d: 2.7**2*numpy.exp(-((d/1.)**2))
# Covariance function 2: periodic signal
covFunc2 = lambda d: 2.7**2*numpy.exp(-0.4*numpy.abs((numpy.sin(numpy.pi*d/2.5))))
# Covariance function 3: white gaussian noise
covFunc3 = lambda d: d*0 + 0.8**2*(numpy.abs(d)<0.00001)
# Covariance function of sum
covFuncSum = lambda d: covFunc1(d) + covFunc2(d) + covFunc3(d)
x = numpy.linspace(0, 10, 300)
# Generate random signales
Y = []
for covFunc in covFunc1, covFunc2, covFunc3:
y = numpy.random.multivariate_normal(x.ravel()*0, covMat(x, x, covFunc))
Y += [y]
# perform decomposition
YSplit = []
YSigma = []
ySplit, sigmaSplit = decompose(x, Y[0]+Y[1]+Y[2], x, covFuncSum, [covFunc1, covFunc2, covFunc3])
YSplit = ySplit.reshape(3,len(x))
# set prior mean of signals 1 and 2
meanShift = 3
YSplit[0] += meanShift
Y[0] += meanShift
YSplit[1] -= meanShift
Y[1] -= meanShift
# Random gaussian process signals
fig = plt.figure(figsize=(4.2,3.0))
for i,c in (2,1), (0,0), (1,2):
plt.plot(x, Y[i], color='C'+str(c), label=u'Prediction',alpha=1)
plt.axis([0,10,-10,10])
plt.xlabel('t')
plt.tight_layout()
plt.savefig('GaussianProcessDecomposition_3RandomSignals.svg')
plt.show()
# Sum of all 3 signals
fig = plt.figure(figsize=(4.2,3.0))
plt.plot(x, (Y[0]+Y[1]+Y[2]), 'r-', label=u'Prediction')
plt.axis([0,10,-10,10])
plt.xlabel('t')
plt.tight_layout()
plt.savefig('GaussianProcessDecomposition_SumOf3Signals.svg')
plt.show()
# plot figures
# Decomposion of sum into single signals
fig = plt.figure(figsize=(4.2,3.0))
for i,c in (2,1), (0,0), (1,2):
plt.plot(x, Y[i], '--', color='C'+str(c), label=u'Prediction',alpha=0.4)
plt.plot(x, YSplit[i], color='C'+str(c), label=u'Prediction',alpha=1)
plt.axis([0,10,-10,10])
plt.xlabel('t')
plt.tight_layout()
plt.savefig('GaussianProcessDecomposition_DecomposedSignals.svg')
plt.show()
# Uncertainty animation
t = numpy.arange(0, 1, 0.02)
covFunc = lambda d: numpy.exp(-(3*numpy.sin(d*numpy.pi))**2) # Covariance function
chol = numpy.linalg.cholesky(covMat(t, t, covFunc, noise=1E-5))
r = chol.dot(numpy.random.randn(len(t), len(sigmaSplit)))
cov = sigmaSplit+1E-5*numpy.identity(len(sigmaSplit))
rSmooth = numpy.linalg.cholesky(cov).dot(r.T).reshape(3,len(x),len(t))
images = []
fig = plt.figure(figsize=(4.2,3.0))
for ti in [0]+list(range(len(t))):
for i,c in (2,1), (0,0), (1,2):
plt.plot(x, YSplit[i] + rSmooth[i,:,ti], color='C'+str(c), label=u'Prediction',alpha=1)
plt.axis([0,10,-10,10])
plt.xlabel('t')
plt.tight_layout()
fig.canvas.draw()
s, (width, height) = fig.canvas.print_to_buffer()
images.append(numpy.array(list(s), numpy.uint8).reshape((height, width, 4)))
fig.clf()
# Save GIF animation
imageio.mimsave('GaussianProcessDecomposition_Uncertainty.gif', images[1:])
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Licensing[edit]
I, the copyright holder of this work, hereby publish it under the following license:
 
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This file is made available under the Creative Commons CC0 1.0 Universal Public Domain Dedication. |
| The person who associated a work with this deed has dedicated the work to the public domain by waiving all of their rights to the work worldwide under copyright law, including all related and neighboring rights, to the extent allowed by law. You can copy, modify, distribute and perform the work, even for commercial purposes, all without asking permission.
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| Date/Time | Thumbnail | Dimensions | User | Comment | |
|---|---|---|---|---|---|
| current | 18:18, 1 August 2019 | | 378 × 270 (30 KB) | Physikinger (talk | contribs) | With random seed |
| 21:03, 29 July 2019 |  | 378 × 270 (30 KB) | Physikinger (talk | contribs) | new | |
| 10:06, 4 September 2018 |  | 378 × 270 (32 KB) | Physikinger (talk | contribs) | bigger label | |
| 09:44, 4 September 2018 |  | 405 × 315 (32 KB) | Physikinger (talk | contribs) | axis label | |
| 14:08, 3 September 2018 |  | 405 × 315 (31 KB) | Physikinger (talk | contribs) | Improved colors | |
| 09:11, 3 September 2018 |  | 405 × 315 (31 KB) | Physikinger (talk | contribs) | User created page with UploadWizard |
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