UniformKernel: Uniform Kernel

UniformKernelR Documentation

Uniform Kernel

Description

Mathematical and statistical functions for the Uniform kernel defined by the pdf,

f(x) = 1/2

over the support x ε (-1,1).

Super classes

distr6::Distribution -> distr6::Kernel -> UniformKernel

Public fields

name

Full name of distribution.

short_name

Short name of distribution for printing.

description

Brief description of the distribution.

Methods

Public methods

Inherited methods

Method pdfSquared2Norm()

The squared 2-norm of the pdf is defined by

\int_a^b (f_X(u))^2 du

where X is the Distribution, f_X is its pdf and a, b are the distribution support limits.

Usage
UniformKernel$pdfSquared2Norm(x = 0, upper = Inf)
Arguments
x

(numeric(1))
Amount to shift the result.

upper

(numeric(1))
Upper limit of the integral.


Method cdfSquared2Norm()

The squared 2-norm of the cdf is defined by

\int_a^b (F_X(u))^2 du

where X is the Distribution, F_X is its pdf and a, b are the distribution support limits.

Usage
UniformKernel$cdfSquared2Norm(x = 0, upper = 0)
Arguments
x

(numeric(1))
Amount to shift the result.

upper

(numeric(1))
Upper limit of the integral.


Method variance()

The variance of a distribution is defined by the formula

var_X = E[X^2] - E[X]^2

where E_X is the expectation of distribution X. If the distribution is multivariate the covariance matrix is returned.

Usage
UniformKernel$variance(...)
Arguments
...

Unused.


Method clone()

The objects of this class are cloneable with this method.

Usage
UniformKernel$clone(deep = FALSE)
Arguments
deep

Whether to make a deep clone.

See Also

Other kernels: Cosine, Epanechnikov, LogisticKernel, NormalKernel, Quartic, Sigmoid, Silverman, TriangularKernel, Tricube, Triweight


distr6 documentation built on March 28, 2022, 1:05 a.m.