Distribution Fitting
This package provides methods to fit a distribution to a given set of samples. Generally, one may write
d = fit(D, x)
This statement fits a distribution of type D
to a given dataset x
, where x
should be an array comprised of all samples. The fit function will choose a reasonable way to fit the distribution, which, in most cases, is maximum likelihood estimation.
One can use as first argument simply the distribution name, like Binomial
, or a concrete distribution with a type parameter, like Normal{Float64}
or Exponential{Float32}
. However, in the latter case the type parameter of the distribution will be ignored:
julia> fit(Cauchy{Float32}, collect(-4:4))
Cauchy{Float64}(μ=0.0, σ=2.0)
Maximum Likelihood Estimation
The function fit_mle
is for maximum likelihood estimation.
Synopsis
Distributions.fit_mle
— Methodfit_mle(D, x)
Fit a distribution of type D
to a given data set x
.
- For univariate distribution, x can be an array of arbitrary size.
- For multivariate distribution, x should be a matrix, where each column is a sample.
Distributions.fit_mle
— Methodfit_mle(D, x, w)
Fit a distribution of type D
to a weighted data set x
, with weights given by w
.
Here, w
should be an array with length n
, where n
is the number of samples contained in x
.
Applicable distributions
The fit_mle
method has been implemented for the following distributions:
Univariate:
Bernoulli
Beta
Binomial
Categorical
DiscreteUniform
Exponential
LogNormal
Normal
Gamma
Geometric
Laplace
Pareto
Poisson
Rayleigh
InverseGaussian
Uniform
Multivariate:
For most of these distributions, the usage is as described above. For a few special distributions that require additional information for estimation, we have to use modified interface:
fit_mle(Binomial, n, x) # n is the number of trials in each experiment
fit_mle(Binomial, n, x, w)
fit_mle(Categorical, k, x) # k is the space size (i.e. the number of distinct values)
fit_mle(Categorical, k, x, w)
fit_mle(Categorical, x) # equivalent to fit_mle(Categorical, max(x), x)
fit_mle(Categorical, x, w)
Sufficient Statistics
For many distributions, estimation can be based on (sum of) sufficient statistics computed from a dataset. To simplify implementation, for such distributions, we implement suffstats
method instead of fit_mle
directly:
ss = suffstats(D, x) # ss captures the sufficient statistics of x
ss = suffstats(D, x, w) # ss captures the sufficient statistics of a weighted dataset
d = fit_mle(D, ss) # maximum likelihood estimation based on sufficient stats
When fit_mle
on D
is invoked, a fallback fit_mle
method will first call suffstats
to compute the sufficient statistics, and then a fit_mle
method on sufficient statistics to get the result. For some distributions, this way is not the most efficient, and we specialize the fit_mle
method to implement more efficient estimation algorithms.
Maximum-a-Posteriori Estimation
Maximum-a-Posteriori (MAP) estimation is also supported by this package, which is implemented as part of the conjugate exponential family framework (see :ref:Conjugate Prior and Posterior <ref-conj>
).