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distr6

What is distr6?

distr6 is a unified and clean interface to organise the probability distributions implemented in R into one R6 object oriented package, as well as adding distributions yet to implemented in R, currently we have 42 probability distributions as well as 11 kernels. Building the package from the ground up and making use of tried and tested design patterns (as per Gamma et al. 1994), distr6 aims to make probability distributions easy to use, understand and analyse.

distr6 extends the work of Peter Ruckdeschel, Matthias Kohl et al. who created the first object-oriented (OO) interface for distributions using S4. Their distr package is currently the gold-standard in R for OO distribution handling. Using R6 we aim to take this even further and to create a scalable interface that can continue to grow with the community. Full details of the API and class structure can be seen in the distr6 website.

Main Features

distr6 is not intended to replace the base R distributions function but instead to give an alternative that focuses on distributions as objects that can be manipulated and accessed as required. The main features therefore centre on OOP practices, design patterns and API design. Of particular note:

All distributions in base R introduced as objects with methods for common statistical functions including pdf, cdf, inverse cdf, simulation, mean, variance, skewness and kurtosis

B <- Binomial$new(prob = 0.5, size = 10)
B$pdf(1:10)
#>  [1] 0.0097656250 0.0439453125 0.1171875000 0.2050781250 0.2460937500
#>  [6] 0.2050781250 0.1171875000 0.0439453125 0.0097656250 0.0009765625
B$kurtosis()
#> [1] -0.2
B$rand(5)
#> [1] 7 7 4 7 6
summary(B)
#> Binomial Probability Distribution. Parameterised with:
#>   prob = 0.5, qprob = 0.5, size = 10
#> 
#>   Quick Statistics 
#>  Mean:       5
#>  Variance:   2.5
#>  Skewness:   0
#>  Ex. Kurtosis:   -0.2
#> 
#>  Support: {0, 1,...,9, 10}   Scientific Type: ℕ0 
#> 
#>  Traits: discrete; univariate
#>  Properties: symmetric; platykurtic; no skew

Flexible construction of distributions for common parameterisations

Exponential$new(rate = 2)
#> Exp(rate = 2, scale = 0.5)
Exponential$new(scale = 2)
#> Exp(rate = 0.5, scale = 2)
Normal$new(mean = 0, prec = 2)
#> Norm(mean = 0, var = 0.5, sd = 0.707106781186548, prec = 2)
Normal$new(mean = 0, sd = 3)$parameters()
#>      id     value support                                 description
#> 1: mean         0       ℝ                   Mean - Location Parameter
#> 2:  var         9      ℝ+          Variance - Squared Scale Parameter
#> 3:   sd         3      ℝ+        Standard Deviation - Scale Parameter
#> 4: prec 0.1111111      ℝ+ Precision - Inverse Squared Scale Parameter

Decorators for extending functionality of distributions to more complex modelling methods

B <- Binomial$new()
decorate(B, "ExoticStatistics")
#> Binomial is now decorated with ExoticStatistics
#> Binom(prob = 0.5, qprob = 0.5, size = 10)
B$survival(2)
#> [1] 0.9453125
decorate(B, "CoreStatistics")
#> Binomial is now decorated with CoreStatistics
#> Binom(prob = 0.5, qprob = 0.5, size = 10)
B$kthmoment(6)
#> Results from numeric calculations are approximate only. Better results may be available.
#> [1] 190

S3 compatibility to make the interface more flexible for users who are less familiar with OOP

B <- Binomial$new()
mean(B) # B$mean()
#> [1] 5
variance(B) # B$variance()
#> [1] 2.5
cdf(B, 2:5) # B$cdf(2:5)
#> [1] 0.0546875 0.1718750 0.3769531 0.6230469

Wrappers including truncation, huberization and product distributions for manipulation and composition of distributions.

B <- Binomial$new()
TruncatedDistribution$new(B, lower = 2, upper = 5) #Or: truncate(B,2,5)
#> TruncBinom(Binom__prob = 0.5, Binom__qprob = 0.5,...,trunc__lower = 2, trunc__upper = 5)
N <- Normal$new()
MixtureDistribution$new(list(B,N), weights = c(0.1, 0.9))
#> Binom wX Norm
ProductDistribution$new(list(B,N))
#> Binom X Norm

Additionally set6 is used for symbolic representation of sets for Distribution typing

Binomial$new()$traits$type
#> ℕ0
Binomial$new()$properties$support
#> {0, 1,...,9, 10}

Usage

distr6 has three primary use-cases:

  1. Upgrading base Extend the R distributions functions to classes so that each distribution additionally has basic statistical methods including expectation and variance and properties/traits including discrete/continuous, univariate/multivariate, etc.
  2. Statistics Implementing decorators and adaptors to manipulate distributions including distribution composition. Additionally functionality for numeric calculations based on any arbitrary distribution.
  3. Modelling Probabilistic modelling using distr6 objects as the modelling targets. Objects as targets is an understood ML paradigm and introducing distributions as classes is the first step to implementing probabilistic modelling.

Installation

For the latest release on CRAN, install with

install.packages("distr6")

Otherwise for the latest stable build

remotes::install_github("alan-turing-institute/distr6")

Future Plans

Our plans for the next update include

  • A generalised qqplot for comparing any distributions
  • A finalised FunctionImputation decorator with different imputation strategies
  • Discrete distribution subtraction (negative convolution)
  • A wrapper for scaling distributions to a given mean and variance
  • More probability distributions
  • Any other good suggestions made between now and then!

Package Development and Contributing

distr6 is released under the MIT licence with acknowledgements to the LGPL-3 licence of distr. Therefore any contributions to distr6 will also be accepted under the MIT licence. We welcome all bug reports, issues, questions and suggestions which can be raised here but please read through our contributing guidelines for details including our code of conduct.

Acknowledgements

distr6 is the result of a collaboration between many people, universities and institutions across the world, without whom the speed and performance of the package would not be up to the standard it is. Firstly we acknowledge all the work of Prof. Dr. Peter Ruckdeschel and Prof. Dr. Matthias Kohl in developing the original distr family of packages. Secondly their significant contributions to the planning and design of distr6 including the distribution and probability family class structures. A team of undergraduates at University College London implemented many of the probability distributions and designed the plotting interface. The team consists of Shen Chen (@ShenSeanChen), Jordan Deenichin (@jdeenichin), Chengyang Gao (@garoc371), Chloe Zhaoyuan Gu (@gzy823), Yunjie He (@RoyaHe), Xiaowen Huang (@w090613), Shuhan Liu (@shliu99), Runlong Yu (@Edwinyrl), Chijing Zeng (@britneyzeng) and Qian Zhou (@yumizhou47). We also want to thank Prof. Dr. Bernd Bischl for discussions about design choices and useful features, particularly advice on the ParameterSet class. Finally University College London and The Alan Turing Institute for hosting workshops, meetings and providing coffee whenever needed.

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Version

Install

install.packages('distr6')

Monthly Downloads

385

Version

1.5.6

License

MIT + file LICENSE

Issues

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Stars

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Last Published

July 17th, 2021

Functions in distr6 (1.5.6)

Convolution

Distribution Convolution Wrapper
Bernoulli

Bernoulli Distribution Class
ChiSquared

Chi-Squared Distribution Class
BetaNoncentral

Noncentral Beta Distribution Class
Beta

Beta Distribution Class
Cauchy

Cauchy Distribution Class
Arcsine

Arcsine Distribution Class
ChiSquaredNoncentral

Noncentral Chi-Squared Distribution Class
Binomial

Binomial Distribution Class
Categorical

Categorical Distribution Class
CoreStatistics

Core Statistical Methods Decorator
DistributionWrapper

Abstract DistributionWrapper Class
DistributionDecorator

Abstract DistributionDecorator Class
Empirical

Empirical Distribution Class
EmpiricalMV

EmpiricalMV Distribution Class
Cosine

Cosine Kernel
Dirichlet

Dirichlet Distribution Class
Degenerate

Degenerate Distribution Class
DiscreteUniform

Discrete Uniform Distribution Class
Distribution

Generalised Distribution Object
Epanechnikov

Epanechnikov Kernel
FunctionImputation

Imputed Pdf/Cdf/Quantile/Rand Functions Decorator
ExoticStatistics

Exotic Statistical Methods Decorator
Frechet

Frechet Distribution Class
FDistribution

'F' Distribution Class
Erlang

Erlang Distribution Class
Exponential

Exponential Distribution Class
FDistributionNoncentral

Noncentral F Distribution Class
Geometric

Geometric Distribution Class
Gamma

Gamma Distribution Class
HuberizedDistribution

Distribution Huberization Wrapper
Laplace

Laplace Distribution Class
Gompertz

Gompertz Distribution Class
LogisticKernel

Logistic Kernel
Logistic

Logistic Distribution Class
Gumbel

Gumbel Distribution Class
Hypergeometric

Hypergeometric Distribution Class
Logarithmic

Logarithmic Distribution Class
Kernel

Abstract Kernel Class
InverseGamma

Inverse Gamma Distribution Class
MixtureDistribution

Mixture Distribution Wrapper
Multinomial

Multinomial Distribution Class
ParameterSet

Parameter Sets for Distributions
Lognormal

Log-Normal Distribution Class
Loglogistic

Log-Logistic Distribution Class
Normal

Normal Distribution Class
MultivariateNormal

Multivariate Normal Distribution Class
NegativeBinomial

Negative Binomial Distribution Class
NormalKernel

Normal Kernel
ParameterSetCollection

Parameter Set Collections for Wrapped Distributions
Rayleigh

Rayleigh Distribution Class
ShiftedLoglogistic

Shifted Log-Logistic Distribution Class
Poisson

Poisson Distribution Class
Pareto

Pareto Distribution Class
ProductDistribution

Product Distribution Wrapper
SDistribution

Abstract Special Distribution Class
Quartic

Quartic Kernel
Sigmoid

Sigmoid Kernel
Silverman

Silverman Kernel
StudentT

Student's T Distribution Class
Tricube

Tricube Kernel
TriangularKernel

Triangular Kernel
Triweight

Triweight Kernel
TruncatedDistribution

Distribution Truncation Wrapper
UniformKernel

Uniform Kernel
Uniform

Uniform Distribution Class
StudentTNoncentral

Noncentral Student's T Distribution Class
Triangular

Triangular Distribution Class
cumHazard

Cumulative Hazard Function
distr6-package

distr6: Object Oriented Distributions in R
as.data.table.ParameterSet

Coerce ParameterSet to data.table
correlation

Distribution Correlation
distr6-deprecated

Deprecated distr6 Functions and Classes
as.VectorDistribution

Coercion to Vector Distribution
as.ParameterSet

Coerce to a ParameterSet
as.ProductDistribution

Coercion to Product Distribution
as.Distribution

Coerce matrix to vector of WeightedDiscrete
dstr

Helper Functionality for Constructing Distributions
entropy

Distribution Entropy
Wald

Wald Distribution Class
VectorDistribution

Vectorise Distributions
kurtosis

Distribution Kurtosis
median.Distribution

Median of a Distribution
merge.ParameterSet

Combine ParameterSets
kurtosisType

Type of Kurtosis Accessor - Deprecated
decorate

Decorate Distributions
c.Distribution

Combine Distributions into a VectorDistribution
cdf

Cumulative Distribution Function
decorators

Decorators Accessor
length.VectorDistribution

Get Number of Distributions in Vector Distribution
as.MixtureDistribution

Coercion to Mixture Distribution
Weibull

Weibull Distribution Class
generalPNorm

Generalised P-Norm
getParameterSupport

Parameter Support Accessor
huberize

Huberize a Distribution
cdfSquared2Norm

Squared Cumulative Distribution Function 2-Norm
dmax

Distribution Maximum Accessor
cf

Characteristic Function
dmin

Distribution Minimum Accessor
distrSimulate

Simulate from a Distribution
distr6News

Show distr6 NEWS.md File
iqr

Distribution Interquartile Range
liesInSupport

Test if Data Lies in Distribution Support
liesInType

Test if Data Lies in Distribution Type
lines.Distribution

Superimpose Distribution Functions Plots for a distr6 Object
getParameterValue

Parameter Value Accessor
makeUniqueDistributions

De-Duplicate Distribution Names
kthmoment

Kth Moment
inf

Infimum Accessor
listWrappers

Lists Implemented Distribution Wrappers
listKernels

Lists Implemented Kernels
simulateEmpiricalDistribution

Sample Empirical Distribution Without Replacement
skewType

Skewness Type
WeightedDiscrete

WeightedDiscrete Distribution Class
pdfSquared2Norm

Squared Probability Density Function 2-Norm
mean.Distribution

Distribution Mean
cdfAntiDeriv

Cumulative Distribution Function Anti-Derivative
pgf

Probability Generating Function
plot.Distribution

Plot Distribution Functions for a distr6 Object
listDecorators

Lists Implemented Distribution Decorators
pdf

Probability Density Function
hazard

Hazard Function
listDistributions

Lists Implemented Distributions
quantile.Distribution

Inverse Cumulative Distribution Function
plot.VectorDistribution

Plotting Distribution Functions for a VectorDistribution
rand

Random Simulation Function
pdfPNorm

Probability Density Function P-Norm
qqplot

Quantile-Quantile Plots for distr6 Objects
properties

Properties Accessor
prec

Precision of a Distribution
testDistribution

assert/check/test/Distribution
survival

Survival Function
support

Support Accessor - Deprecated
testDiscrete

assert/check/test/Discrete
testDistributionList

assert/check/test/DistributionList
[.VectorDistribution

Extract one or more Distributions from a VectorDistribution
testLeptokurtic

assert/check/test/Leptokurtic
[.ParameterSet

Extract one or more parameters from a ParameterSet
cdfPNorm

Cumulative Distribution Function P-Norm
testPlatykurtic

assert/check/test/Platykurtic
summary.Distribution

Distribution Summary
sup

Supremum Accessor
testPositiveSkew

assert/check/test/PositiveSkew
setParameterValue

Parameter Value Setter
mixturiseVector

Create Mixture Distribution From Multiple Vectors
genExp

Generalised Expectation of a Distribution
rep.Distribution

Replicate Distribution into Vector, Mixture, or Product
mgf

Moment Generating Function
exkurtosisType

Kurtosis Type
stdev

Standard Deviation of a Distribution
testMatrixvariate

assert/check/test/Matrixvariate
strprint

String Representation of Print
workingSupport

Approximate Finite Support
wrappedModels

Gets Internally Wrapped Models
testParameterSetCollectionList

assert/check/test/ParameterSetCollectionList
traits

Traits Accessor
truncate

Truncate a Distribution
testParameterSetList

assert/check/test/ParameterSetList
testMesokurtic

assert/check/test/Mesokurtic
variateForm

Variate Form Accessor - Deprecated
variance

Distribution Variance
survivalAntiDeriv

Survival Function Anti-Derivative
testMixture

assert/check/test/Mixture
survivalPNorm

Survival Function P-Norm
mode

Mode of a Distribution
parameters

Parameters Accessor
testMultivariate

assert/check/test/Multivariate
skewness

Distribution Skewness
skewnessType

Type of Skewness Accessor - Deprecated
print.ParameterSet

Print a ParameterSet
testUnivariate

assert/check/test/Univariate
testNoSkew

assert/check/test/NoSkew
testNegativeSkew

assert/check/test/NegativeSkew
testSymmetric

assert/check/test/Symmetric
type

Type Accessor - Deprecated
valueSupport

Value Support Accessor - Deprecated
symmetry

Symmetry Accessor - Deprecated
testContinuous

assert/check/test/Continuous
testParameterSet

assert/check/test/ParameterSet
testParameterSetCollection

assert/check/test/ParameterSetCollection