Type Hierarchy
All samplers and distributions provided in this package are organized into a type hierarchy described as follows.
Sampleable
The root of this type hierarchy is Sampleable. The abstract type Sampleable subsumes any types of objects from which one can draw samples, which particularly includes samplers and distributions. Formally, Sampleable is defined as
abstract type Sampleable{F<:VariateForm,S<:ValueSupport} endIt has two type parameters that define the kind of samples that can be drawn therefrom.
Distributions.Sampleable
Base.rand(::Distributions.Sampleable)VariateForm
Distributions.VariateFormThe VariateForm sub-types defined in Distributions.jl are:
| Type | A single sample | Multiple samples |
|---|---|---|
Univariate | a scalar number | A numeric array of arbitrary shape, each element being a sample |
Multivariate | a numeric vector | A matrix, each column being a sample |
Matrixvariate | a numeric matrix | An array of matrices, each element being a sample matrix |
ValueSupport
Distributions.ValueSupportThe ValueSupport sub-types defined in Distributions.jl are:
| Type | Element type | Descriptions |
|---|---|---|
Discrete | Int | Samples take discrete values |
Continuous | Float64 | Samples take continuous real values |
Multiple samples are often organized into an array, depending on the variate form.
The basic functionalities that a sampleable object provides is to retrieve information about the samples it generates and to draw samples. Particularly, the following functions are provided for sampleable objects:
Base.length — Methodlength(s::Sampleable)The length of each sample. Always returns 1 when s is univariate.
Base.size — Methodsize(s::Sampleable)The size (i.e. shape) of each sample. Always returns () when s is univariate, and (length(s),) when s is multivariate.
Distributions.nsamples — Methodnsamples(s::Sampleable)The number of values contained in one sample of s. Multiple samples are often organized into an array, depending on the variate form.
Base.eltype — Methodeltype(::Type{Sampleable})The default element type of a sample. This is the type of elements of the samples generated by the rand method. However, one can provide an array of different element types to store the samples using rand!.
Base.rand — Methodrand(::AbstractRNG, ::Sampleable)Samples from the sampler and returns the result.
Random.rand! — Methodrand!(::AbstractRNG, ::Sampleable, ::AbstractArray)Samples in-place from the sampler and stores the result in the provided array.
Distributions
We use Distribution, a subtype of Sampleable as defined below, to capture probabilistic distributions. In addition to being sampleable, a distribution typically comes with an explicit way to combine its domain, probability density functions, among many other quantities.
abstract type Distribution{F<:VariateForm,S<:ValueSupport} <: Sampleable{F,S} endDistributions.DistributionTo simplify the use in practice, we introduce a series of type alias as follows:
const UnivariateDistribution{S<:ValueSupport} = Distribution{Univariate,S}
const MultivariateDistribution{S<:ValueSupport} = Distribution{Multivariate,S}
const MatrixDistribution{S<:ValueSupport} = Distribution{Matrixvariate,S}
const NonMatrixDistribution = Union{UnivariateDistribution, MultivariateDistribution}
const DiscreteDistribution{F<:VariateForm} = Distribution{F,Discrete}
const ContinuousDistribution{F<:VariateForm} = Distribution{F,Continuous}
const DiscreteUnivariateDistribution = Distribution{Univariate, Discrete}
const ContinuousUnivariateDistribution = Distribution{Univariate, Continuous}
const DiscreteMultivariateDistribution = Distribution{Multivariate, Discrete}
const ContinuousMultivariateDistribution = Distribution{Multivariate, Continuous}
const DiscreteMatrixDistribution = Distribution{Matrixvariate, Discrete}
const ContinuousMatrixDistribution = Distribution{Matrixvariate, Continuous}All methods applicable to Sampleable also applies to Distribution. The API for distributions of different variate forms are different (refer to univariates, multivariates, and matrix for details).