KernelSmoothing

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../../_images/KernelSmoothing.png
class KernelSmoothing(*args)

Non parametric continuous distribution estimation by kernel smoothing.

Refer to Kernel smoothing.

Parameters
kernelDistribution, optional

Univariate distribution of the kernel that will be used. By default, the standard Normal distribution is used.

binnedbool, optional

Activates bining mecanism only in the univariate or bivariate cases. It allows to speed up the manipulation of the density function of the resulting distribution. By default, the mecanism is activated.

binNumberint, binNumber \geq 2, optional

Indicates the number of bins used by the bining mecanism. By default, OpenTURNS uses the values stored in the ResourceMap.

boundaryCorrectionbool, optional

Activates the boundary correction using the mirroring technique. By default, the correction is not provided.

Notes

The binning mechanism creates a regular grid of binNumber intervals in each dimension, then the unit weight of each point is linearly affected to the vertices of the bin containing the point. See [wand1994] for the details.

The boundary correction is available only in one dimension, and it is done using the mirroring technique. See the notes of the setBoundingOption() method for details.

When applied to multivariate samples, the kernel is the kernel product of the univariate distribution specified in the constructor.

Examples

Fit a distribution on data thanks to the kernel smoothing technique:

>>> import openturns as ot
>>> sample = ot.Gamma(6.0, 1.0).getSample(100)
>>> ks = ot.KernelSmoothing()
>>> fittedDist = ks.build(sample)
>>> print(fittedDist.getClassName())
Distribution

The build() method produces a generic Distribution object. Other build methods (detailed below) produce more specific objects.

Get the bandwidth:

>>> bandwidth = ks.getBandwidth()
>>> print(bandwidth)
[1.03374]

The bandwidth was guessed by the build() method. It could also have been provided by the user.

>>> bandwidth = [0.9]
>>> fittedDist = ks.build(sample, bandwidth)

Compare the PDFs:

>>> graph = fittedDist.drawPDF()
>>> graph.add( ot.Gamma(6.0, 1.0).drawPDF())
>>> graph.setColors(ot.Drawable.BuildDefaultPalette(2))
>>> graph.setLegends(['KS dist', 'Gamma'])

The default values of the parameters of the constructor usually provide good results. Nevertheless, the parameters can be manually set.

>>> kernel = ot.Uniform()
>>> ks = ot.KernelSmoothing(kernel)
>>> binned = True # by default True
>>> binNumber = 64
>>> ks = ot.KernelSmoothing(kernel, binned, binNumber)
>>> boundaryCorrection = True # by default False
>>> ks = ot.KernelSmoothing(kernel, binned, binNumber, boundaryCorrection)

Variants of the build() method can be used when the distribution to build is expected to be of a certain type. In those cases however, the bandwidth must be user-specified. To use buildAsTruncatedDistribution(), boundary correction must be enabled.

>>> distribution = ks.buildAsKernelMixture(sample, bandwidth)
>>> print(distribution.getClassName())
KernelMixture
>>> distribution = ks.buildAsMixture(sample, bandwidth)
>>> print(distribution.getClassName())
Mixture
>>> distribution = ks.buildAsTruncatedDistribution(sample, bandwidth)
>>> print(distribution.getClassName())
TruncatedDistribution

Methods

build(*args)

Fit a kernel smoothing distribution on data.

buildAsKernelMixture(sample, bandwidth)

Fit a kernel smoothing distribution on data.

buildAsMixture(sample, bandwidth)

Fit a kernel smoothing distribution on data.

buildAsTruncatedDistribution(sample, bandwidth)

Fit a kernel smoothing distribution on data.

buildEstimator(*args)

Build the distribution and the parameter distribution.

computeMixedBandwidth(sample)

Compute the bandwith according to a mixed rule.

computePluginBandwidth(sample)

Compute the bandwith according to the plugin rule.

computeSilvermanBandwidth(sample)

Compute the bandwith according to the Silverman rule.

getBandwidth()

Accessor to the bandwith used in the kernel smoothing.

getBootstrapSize()

Accessor to the bootstrap size.

getClassName()

Accessor to the object's name.

getId()

Accessor to the object's id.

getKernel()

Accessor to kernel used in the kernel smoothing.

getName()

Accessor to the object's name.

getShadowedId()

Accessor to the object's shadowed id.

getVisibility()

Accessor to the object's visibility state.

hasName()

Test if the object is named.

hasVisibleName()

Test if the object has a distinguishable name.

setAutomaticLowerBound(automaticLowerBound)

Accessor to the flag for an automatic selection of lower bound.

setAutomaticUpperBound(automaticUpperBound)

Accessor to the flag for an automatic selection of upper bound.

setBootstrapSize(bootstrapSize)

Accessor to the bootstrap size.

setBoundaryCorrection(boundaryCorrection)

Accessor to the boundary correction flag.

setBoundingOption(boundingOption)

Accessor to the boundary correction option.

setLowerBound(lowerBound)

Accessor to the lower bound for boundary correction.

setName(name)

Accessor to the object's name.

setShadowedId(id)

Accessor to the object's shadowed id.

setUpperBound(upperBound)

Accessor to the upper bound for boundary correction.

setVisibility(visible)

Accessor to the object's visibility state.

__init__(*args)
build(*args)

Fit a kernel smoothing distribution on data.

Parameters
sample2-d sequence of float

Data on which the distribution is fitted. Any dimension.

bandwidthPoint, optional

Contains the bandwith in each direction. If not specified, the bandwith is calculated using the mixed rule from data.

Returns
fittdDistDistribution

The fitted distribution.

Notes

According to the dimension of the data and the specified treatments, the resulting distribution differs.

  • If the sample is constant, a Dirac distribution is built.

  • If dimension > 2 or if no treatment has been asked for, a KernelMixture is built by calling buildAsKernelMixture.

  • If dimension = 1 and a boundary treatment has been asked for, a TruncatedDistribution is built by calling buildAsTruncatedDistribution

  • If dimension = 1 or 2 and no boundary treatment has been asked for, but a binning treatment has been asked for,

    • If the sample size is greater than the bin number, then a Mixture is built by calling buildAsMixture

    • Otherwise a KernelMixture is built by calling buildAsKernelMixture

The bandwidth selection depends on the dimension.

  • If dimension = 1, then computeMixedBandwidth is used.

  • Otherwise, then the only multivariate rule computeSilvermanBandwidth is used.

Examples

See the effect of the boundary correction:

>>> import openturns as ot
>>> sample = ot.Exponential(1.0).getSample(1000)
>>> smoother = ot.KernelSmoothing()
>>> fittedDistNoCorr = smoother.build(sample)
>>> smoother.setBoundaryCorrection(True)
>>> fittedDistWithCorr = smoother.build(sample)

Compare the PDFs:

>>> graph = ot.Exponential(1.0).drawPDF()
>>> graph.add(fittedDistNoCorr.drawPDF())
>>> graph.add(fittedDistWithCorr.drawPDF())
>>> graph.setColors(['black', 'blue', 'red'])
>>> graph.setLegends(['Exp dist', 'No boundary corr', 'Boundary corr'])
buildAsKernelMixture(sample, bandwidth)

Fit a kernel smoothing distribution on data.

Parameters
sample2-d sequence of float

Data on which the distribution is fitted. Any dimension.

bandwidthPoint

Contains the bandwith in each direction.

Returns
fittdDistKernelMixture

The fitted distribution.

Notes

It builds a ~openturns.KernelMixture using the given data and bandwidth regardless of the binning or boundary treatment flags.

Examples

>>> import openturns as ot
>>> sample = ot.Exponential(1.0).getSample(1000)
>>> smoother = ot.KernelSmoothing()
>>> kernelMixture = smoother.buildAsKernelMixture(sample, [1.0])
buildAsMixture(sample, bandwidth)

Fit a kernel smoothing distribution on data.

Parameters
sample2-d sequence of float

Data on which the distribution is fitted. Any dimension.

bandwidthPoint

Contains the bandwith in each direction.

Returns
fittdDistKernelMixture

The fitted distribution.

Notes

It builds a ~openturns.Mixture using the given bandwidth and a binning of the given data regardless of the bin number, the data size, the binning flag or boundary treatment flags. This method is available only for 1D or 2D samples.

Examples

>>> import openturns as ot
>>> sample = ot.Exponential(1.0).getSample(1000)
>>> smoother = ot.KernelSmoothing(ot.Normal(), True, 100, False)
>>> mixture = smoother.buildAsMixture(sample, [1.0])
buildAsTruncatedDistribution(sample, bandwidth)

Fit a kernel smoothing distribution on data.

Parameters
sample2-d sequence of float

Data on which the distribution is fitted. Any dimension.

bandwidthPoint

Contains the bandwith in each direction.

Returns
fittdDistKernelMixture

The fitted distribution.

Notes

It builds a ~openturns.TruncatedDistribution using the given bandwidth and the given data regardless of the boundary treatment flags. A binning is done if asked for and if the sample size is greater than the bin number. Then, the corresponding KernelMixture if no binning, Mixture otherwise, is truncated to the range of the sample.

Examples

>>> import openturns as ot
>>> sample = ot.Exponential(1.0).getSample(1000)
>>> smoother = ot.KernelSmoothing(ot.Normal(), False, 0, True)
>>> truncated = smoother.buildAsTruncatedDistribution(sample, [1.0])
buildEstimator(*args)

Build the distribution and the parameter distribution.

Parameters
sample2-d sequence of float

Sample from which the distribution parameters are estimated.

parametersDistributionParameters

Optional, the parametrization.

Returns
resDistDistributionFactoryResult

The results.

Notes

According to the way the native parameters of the distribution are estimated, the parameters distribution differs:

  • Moments method: the asymptotic parameters distribution is normal and estimated by Bootstrap on the initial data;

  • Maximum likelihood method with a regular model: the asymptotic parameters distribution is normal and its covariance matrix is the inverse Fisher information matrix;

  • Other methods: the asymptotic parameters distribution is estimated by Bootstrap on the initial data and kernel fitting (see KernelSmoothing).

If another set of parameters is specified, the native parameters distribution is first estimated and the new distribution is determined from it:

  • if the native parameters distribution is normal and the transformation regular at the estimated parameters values: the asymptotic parameters distribution is normal and its covariance matrix determined from the inverse Fisher information matrix of the native parameters and the transformation;

  • in the other cases, the asymptotic parameters distribution is estimated by Bootstrap on the initial data and kernel fitting.

computeMixedBandwidth(sample)

Compute the bandwith according to a mixed rule.

Returns
bandwidthPoint

Bandwith wich components are evaluated according to a mixed rule.

Notes

Use the plugin rule for small sample, estimate the ratio between the plugin rule and the Silverman rule on this small sample, and finally scale the Silverman bandwidth computed on the full sample with this ratio. The size of the small sample is based on the KernelSmoothing-SmallSize key of the ResourceMap.

computePluginBandwidth(sample)

Compute the bandwith according to the plugin rule.

Returns
bandwidthPoint

Bandwith wich components are evaluated according to the plugin rule.

Notes

This plug-in method is based on the solve-the-equation rule from (Sheather, Jones, 1991). This method can take a lot of time for large samples, as the cost is quadratic with the sample size.

The KernelSmoothing-CutOffPlugin key of the ResourceMap controls the accuracy of the approximation used to estimate the rugosity of the second derivative of the distribution. The default value ensures that terms in the sum which weight are lower than 4.e-6 are ignored, which can reduce the calculation in some situations. The properties of the standard gaussian density are so that, in order to make the computation exact, the value of the KernelSmoothing-CutOffPlugin must be set to 39, but this may increase the computation time.

computeSilvermanBandwidth(sample)

Compute the bandwith according to the Silverman rule.

Returns
bandwidthPoint

Bandwith which components are evaluated according to the Silverman rule assuming a normal distribution. The bandwith uses a robust estimate of the sample standard deviation, based on the interquartile range (rather than the standard deviation of the distribution and the sample). This method can manage a multivariate sample and produces a multivariate bandwidth.

getBandwidth()

Accessor to the bandwith used in the kernel smoothing.

Returns
bandwidthPoint

Bandwith used in each direction.

getBootstrapSize()

Accessor to the bootstrap size.

Returns
sizeinteger

Size of the bootstrap.

getClassName()

Accessor to the object’s name.

Returns
class_namestr

The object class name (object.__class__.__name__).

getId()

Accessor to the object’s id.

Returns
idint

Internal unique identifier.

getKernel()

Accessor to kernel used in the kernel smoothing.

Returns
kernelDistribution

Univariate distribution used to build the kernel.

getName()

Accessor to the object’s name.

Returns
namestr

The name of the object.

getShadowedId()

Accessor to the object’s shadowed id.

Returns
idint

Internal unique identifier.

getVisibility()

Accessor to the object’s visibility state.

Returns
visiblebool

Visibility flag.

hasName()

Test if the object is named.

Returns
hasNamebool

True if the name is not empty.

hasVisibleName()

Test if the object has a distinguishable name.

Returns
hasVisibleNamebool

True if the name is not empty and not the default one.

setAutomaticLowerBound(automaticLowerBound)

Accessor to the flag for an automatic selection of lower bound.

Parameters
automaticLowerBoundbool

Flag to tell if the user-defined lower bound has to be taken into account (value False) or if the minimum of the given sample has to be used (value True).

setAutomaticUpperBound(automaticUpperBound)

Accessor to the flag for an automatic selection of upper bound.

Parameters
automaticUpperBoundbool

Flag to tell if the user-defined upper bound has to be taken into account (value False) or if the maximum of the given sample has to be used (value True).

setBootstrapSize(bootstrapSize)

Accessor to the bootstrap size.

Parameters
sizeinteger

Size of the bootstrap.

setBoundaryCorrection(boundaryCorrection)

Accessor to the boundary correction flag.

Parameters
boundaryCorrectionbool

Activates the boundary correction using the mirroring technique.

setBoundingOption(boundingOption)

Accessor to the boundary correction option.

Parameters
boundingOptionint

Select the boundary correction option, see notes.

Notes

The possible values for the bounding option are:

  • KernelSmoothing.NONE or 0: no boundary correction

  • KernelSmoothing.LOWER or 1: apply the boundary correction to the lower bound

  • KernelSmoothing.UPPER or 2: apply the boundary correction to the upper bound

  • KernelSmoothing.BOTH or 3: apply the boundary correction to both bounds

It applies only to 1D samples. Each bound can be defined by the user or computed automatically from the sample, see setLowerBound, setUpperBound, setAutomaticLowerBound, setAutomaticUpperBound.

setLowerBound(lowerBound)

Accessor to the lower bound for boundary correction.

Parameters
lowerBoundfloat

A user-defined lower bound to take into account for boundary correction.

Notes

This method automatically sets the automaticLowerBound flag to False. The given value will be taken into account only if boundingOption is set to either 1 or 3. If the algorithm is applied to a sample with a minimum value less than the user-defined lower bound and the automaticLowerBound is set to False, then an exception it raised.

setName(name)

Accessor to the object’s name.

Parameters
namestr

The name of the object.

setShadowedId(id)

Accessor to the object’s shadowed id.

Parameters
idint

Internal unique identifier.

setUpperBound(upperBound)

Accessor to the upper bound for boundary correction.

Parameters
upperBoundfloat

A user-defined lower bound to take into account for boundary correction.

Notes

This method automatically sets the automaticLowerBound flag to False. The given value will be taken into account only if boundingOption is set to either 1 or 3. If the algorithm is applied to a sample with a minimum value less than the user-defined lower bound and the automaticLowerBound is set to False, then an exception it raised.

setVisibility(visible)

Accessor to the object’s visibility state.

Parameters
visiblebool

Visibility flag.