goal-probability: Optimization on manifolds of probability distributions with Goal

[ bsd3, library, math ] [ Propose Tags ] [ Report a vulnerability ]

goal-probability provides tools for implementing and applying basic statistical models. The core concept of goal-probability are statistical manifolds, i.e. manifold of probability distributions, with a focus on exponential family distributions.


[Skip to Readme]

Downloads

Maintainer's Corner

Package maintainers

For package maintainers and hackage trustees

Candidates

  • No Candidates
Versions [RSS] 0.1, 0.20
Dependencies base (>=4.13 && <4.15), containers, ghc-typelits-knownnat, ghc-typelits-natnormalise, goal-core, goal-geometry, hmatrix, hmatrix-special, mwc-random, parallel, statistics, vector [details]
License BSD-3-Clause
Author Sacha Sokoloski
Maintainer sacha.sokoloski@mailbox.org
Category Math
Home page https://gitlab.com/sacha-sokoloski/goal
Uploaded by alex404 at 2021-08-31T16:06:46Z
Distributions
Reverse Dependencies 2 direct, 0 indirect [details]
Downloads 1000 total (1 in the last 30 days)
Rating (no votes yet) [estimated by Bayesian average]
Your Rating
  • λ
  • λ
  • λ
Status Docs uploaded by user [build log]
All reported builds failed as of 2021-08-31 [all 2 reports]

Readme for goal-probability-0.20

[back to package description]

This library provides tools for implementing and applying statistical and machine learning algorithms. The core concept of goal-probability is that of a statistical manifold, i.e. manifold of probability distributions, with a focus on exponential family distributions. What follows is brief introduction to how we define and work with statistical manifolds in Goal.

The core definition of this library is that of a Statistical Manifold.

class Manifold x => Statistical x where
    type SamplePoint x :: Type

A Statistical Manifold is a Manifold of probability distributions, such that each point on the manifold is a probability distribution over the specified space of SamplePoints. We may evaluate the probability mass/density of a SamplePoint under a given distribution as long as the distribution is AbsolutelyContinous.

class Statistical x => AbsolutelyContinuous c x where
    density :: Point c x -> SamplePoint x -> Double
    densities :: Point c x -> Sample x -> [Double]

Similarly, we may generate a Sample from a given distribution as long as it is Generative.

type Sample x = [SamplePoint x]

class Statistical x => Generative c x where
    samplePoint :: Point c x -> Random r (SamplePoint x)
    sample :: Int -> Point c x -> Random r (Sample x)

In both these cases, class methods are defined both both single and bulk evaluation, to potentially take advantage of bulk linear algebra operations.

Let us now look at some example distributions that we may define; for the sake of brevity, I will not introduce every bit of necessary code. In Goal we create a normal distribution by writing

nrm :: Source # Normal
nrm = fromTuple (0,1)

where 0 is the mean and 1 is the variance. For each Statistical Manifold, the Source coordinate system represents some standard parameterization, e.g. as one typically finds on Wikipedia. Similarly, we can create a binomial distribution with

bnm :: Source # Binomial 5
bnm = Point $ S.singleton 0.5

which is a binomial distribution over 5 fair coin tosses.

Exponential families are also a core part of this library. An ExponentiaFamily is a kind of Statistical Manifold defined in terms of a sufficientStatistic and a baseMeasure.

class Statistical x => ExponentialFamily x where
    sufficientStatistic :: SamplePoint x -> Mean # x
    baseMeasure :: Proxy x -> SamplePoint x -> Double

Exponential families may always be parameterized in terms of the so-called Natural and Mean parameters. Mean coordinates are equal to the average value of the sufficientStatistic under the given distribution. The Natural coordinates are arguably less intuitive, but they are critical for implementing evaluating exponential family distributions numerically. For example, the unnormalized density function of an ExponentialFamily distribution is given by

unnormalizedDensity :: forall x . ExponentialFamily x => Natural # x -> SamplePoint x -> Double
unnormalizedDensity p x =
    exp (p <.> sufficientStatistic x) * baseMeasure (Proxy @ x) x

For in-depth tutorials visit my blog.