Relationships among some of univariate probability distributions

probability theory Probability theory or probability calculus is the branch of mathematics concerned with probability. Although there are several different probability interpretations, probability theory treats the concept in a rigorous mathematical manner by expre ...

and

statistics Statistics (from German language, German: ', "description of a State (polity), state, a country") is the discipline that concerns the collection, organization, analysis, interpretation, and presentation of data. In applying statistics to a s ...

, there are several relationships among

probability distributions In probability theory and statistics, a probability distribution is a function that gives the probabilities of occurrence of possible events for an experiment. It is a mathematical description of a random phenomenon in terms of its sample spac ...

. These relations can be categorized in the following groups: *One distribution is a special case of another with a broader parameter space *Transforms (function of a random variable); *Combinations (function of several variables); *Approximation (limit) relationships; *Compound relationships (useful for Bayesian inference); * Duality; *

Conjugate prior In Bayesian probability theory, if, given a likelihood function p(x \mid \theta), the posterior distribution p(\theta \mid x) is in the same probability distribution family as the prior probability distribution p(\theta), the prior and posteri ...

Special case of distribution parametrization

* A

binomial distribution In probability theory and statistics, the binomial distribution with parameters and is the discrete probability distribution of the number of successes in a sequence of statistical independence, independent experiment (probability theory) ...

with parameters ''n'' = 1 and ''p'' is a

Bernoulli distribution In probability theory and statistics, the Bernoulli distribution, named after Swiss mathematician Jacob Bernoulli, is the discrete probability distribution of a random variable which takes the value 1 with probability p and the value 0 with pro ...

with parameter ''p''. * A

negative binomial distribution In probability theory and statistics, the negative binomial distribution, also called a Pascal distribution, is a discrete probability distribution that models the number of failures in a sequence of independent and identically distributed Berno ...

with parameters ''n'' = 1 and ''p'' is a

geometric distribution In probability theory and statistics, the geometric distribution is either one of two discrete probability distributions: * The probability distribution of the number X of Bernoulli trials needed to get one success, supported on \mathbb = \; * T ...

with parameter ''p''. * A

gamma distribution In probability theory and statistics, the gamma distribution is a versatile two-parameter family of continuous probability distributions. The exponential distribution, Erlang distribution, and chi-squared distribution are special cases of the g ...

with shape parameter ''α'' = 1 and rate parameter ''β'' is an

exponential distribution In probability theory and statistics, the exponential distribution or negative exponential distribution is the probability distribution of the distance between events in a Poisson point process, i.e., a process in which events occur continuousl ...

with rate parameter ''β''. * A

with shape parameter ''α'' = ''v''/2 and rate parameter ''β'' = 1/2 is a

chi-squared distribution In probability theory and statistics, the \chi^2-distribution with k Degrees of freedom (statistics), degrees of freedom is the distribution of a sum of the squares of k Independence (probability theory), independent standard normal random vari ...

with ''ν'' degrees of freedom. * A

with 2 degrees of freedom (''k'' = 2) is an

with a mean value of 2 (rate ''λ'' = 1/2 .) * A

Weibull distribution In probability theory and statistics, the Weibull distribution is a continuous probability distribution. It models a broad range of random variables, largely in the nature of a time to failure or time between events. Examples are maximum on ...

with shape parameter ''k'' = 1 and rate parameter ''β'' is an

with rate parameter ''β''. * A

beta distribution In probability theory and statistics, the beta distribution is a family of continuous probability distributions defined on the interval

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or (0, 1) in terms of two positive Statistical parameter, parameters, denoted by ''alpha'' (''α'') an ...

with shape parameters ''α'' = ''β'' = 1 is a

continuous uniform distribution In probability theory and statistics, the continuous uniform distributions or rectangular distributions are a family of symmetric probability distributions. Such a distribution describes an experiment where there is an arbitrary outcome that li ...

over the real numbers 0 to 1. * A

beta-binomial distribution In probability theory and statistics, the beta-binomial distribution is a family of discrete probability distributions on a finite support of non-negative integers arising when the probability of success in each of a fixed or known number of Ber ...

with parameter ''n'' and shape parameters ''α'' = ''β'' = 1 is a

discrete uniform distribution In probability theory and statistics, the discrete uniform distribution is a symmetric probability distribution wherein each of some finite whole number ''n'' of outcome values are equally likely to be observed. Thus every one of the ''n'' out ...

over the integers 0 to ''n''. * A

Student's t-distribution In probability theory and statistics, Student's distribution (or simply the distribution) t_\nu is a continuous probability distribution that generalizes the Normal distribution#Standard normal distribution, standard normal distribu ...

with one degree of freedom (''v'' = 1) is a

Cauchy distribution The Cauchy distribution, named after Augustin-Louis Cauchy, is a continuous probability distribution. It is also known, especially among physicists, as the Lorentz distribution (after Hendrik Lorentz), Cauchy–Lorentz distribution, Lorentz(ian) ...

with location parameter ''x'' = 0 and scale parameter ''γ'' = 1. * A

Burr distribution In probability theory, statistics and econometrics, the Burr Type XII distribution or simply the Burr distribution is a continuous probability distribution for a non-negative random variable. It is also known as the Singh–Maddala distribution a ...

with parameters ''c'' = 1 and ''k'' (and scale ''λ'') is a Lomax distribution with shape ''k'' (and scale ''λ''.)

Transform of a variable

Multiple of a random variable

Multiplying the variable by any positive real constant yields a scaling of the original distribution. Some are self-replicating, meaning that the scaling yields the same family of distributions, albeit with a different parameter:

normal distribution In probability theory and statistics, a normal distribution or Gaussian distribution is a type of continuous probability distribution for a real-valued random variable. The general form of its probability density function is f(x) = \frac ...

Erlang distribution The Erlang distribution is a two-parameter family of continuous probability distributions with Support (mathematics), support x \in [0, \infty). The two parameters are: * a positive integer k, the "shape", and * a positive real number \lambda, ...

, logistic distribution, error distribution, Power_law#Power-law_probability_distributions, power-law distribution,

Rayleigh distribution In probability theory and statistics, the Rayleigh distribution is a continuous probability distribution for nonnegative-valued random variables. Up to rescaling, it coincides with the chi distribution with two degrees of freedom. The distributi ...

. Example: * If ''X'' is a gamma random variable with shape and rate parameters (''α'', ''β''), then ''Y'' = ''aX'' is a gamma random variable with parameters (''α'',''β''/''a''). * If ''X'' is a gamma random variable with shape and scale parameters (''α'', ''θ''), then ''Y'' = ''aX'' is a gamma random variable with parameters (''α'',''aθ'').

Linear function of a random variable

The affine transform ''ax'' + ''b'' yields a relocation and scaling of the original distribution. The following are self-replicating:

Normal distribution In probability theory and statistics, a normal distribution or Gaussian distribution is a type of continuous probability distribution for a real-valued random variable. The general form of its probability density function is f(x) = \frac ...

Logistic distribution In probability theory and statistics, the logistic distribution is a continuous probability distribution. Its cumulative distribution function is the logistic function, which appears in logistic regression and feedforward neural networks. It rese ...

, Error distribution,

Power distribution Electric power distribution is the final stage in the delivery of electricity. Electricity is carried from the transmission system to individual consumers. Distribution substations connect to the transmission system and lower the transmission v ...

. Example: * If ''Z'' is a normal random variable with parameters (''μ'' = ''m'', ''σ''² = ''s''²), then ''X'' = ''aZ'' + ''b'' is a normal random variable with parameters (''μ'' = ''am'' + ''b'', ''σ''² = ''a''²''s''²).

Reciprocal of a random variable

The reciprocal 1/''X'' of a random variable ''X'', is a member of the same family of distribution as ''X'', in the following cases:

F distribution In probability theory and statistics, the ''F''-distribution or ''F''-ratio, also known as Snedecor's ''F'' distribution or the Fisher–Snedecor distribution (after Ronald Fisher and George W. Snedecor), is a continuous probability distribut ...

, log logistic distribution. Examples: * If X is a Cauchy (''μ'', ''σ'') random variable, then 1/''X'' is a Cauchy (''μ''/''C'', ''σ''/''C'') random variable where ''C'' = ''μ''² + ''σ''². * If ''X'' is an ''F''(''ν''₁, ''ν''₂) random variable then 1/''X'' is an ''F''(''ν''₂, ''ν''₁) random variable.

Other cases

Some distributions are invariant under a specific transformation. Example: * If ''X'' is a beta (''α'', ''β'') random variable then (1 − ''X'') is a beta (''β'', ''α'') random variable. * If ''X'' is a binomial (''n'', ''p'') random variable then (''n'' − ''X'') is a binomial (''n'', 1 − ''p'') random variable. * If X follows a continuous uniform distribution on ,1 and F_X(X) is its cumulative distribution function (CDF), then the random variable U=F_X(X) follows a standard uniform distribution on ,1 Some distributions are variant under a specific transformation. * If ''X'' is a normal (''μ'', ''σ''²) random variable then ''e''^''X'' is a lognormal (''μ'', ''σ''²) random variable. :Conversely, if ''X'' is a lognormal (''μ'', ''σ''²) random variable then log ''X'' is a normal (''μ'', ''σ''²) random variable. *If ''X'' is an exponential random variable with mean ''β'', then ''X''^1/''γ'' is a Weibull (''γ'', ''β'') random variable. * The square of a standard normal random variable has a chi-squared distribution with one degree of freedom. * If ''X'' is a Student’s t random variable with ''ν'' degree of freedom, then ''X''² is an ''F'' (1,''ν'') random variable. * If ''X'' is a double exponential random variable with mean 0 and scale ''λ'', then , ''X'', is an exponential random variable with mean ''λ''. * A geometric random variable is the

floor A floor is the bottom surface of a room or vehicle. Floors vary from wikt:hovel, simple dirt in a cave to many layered surfaces made with modern technology. Floors may be stone, wood, bamboo, metal or any other material that can support the ex ...

of an exponential random variable. * A

rectangular In Euclidean plane geometry, a rectangle is a rectilinear convex polygon or a quadrilateral with four right angles. It can also be defined as: an equiangular quadrilateral, since equiangular means that all of its angles are equal (360°/4 = 90 ...

random variable is the floor of a uniform random variable. * A reciprocal random variable is the exponential of a uniform random variable.

Functions of several variables

Sum of variables

The distribution of the sum of

independent random variables Independence is a fundamental notion in probability theory, as in statistics and the theory of stochastic processes. Two events are independent, statistically independent, or stochastically independent if, informally speaking, the occurrence of ...

is the

convolution In mathematics (in particular, functional analysis), convolution is a operation (mathematics), mathematical operation on two function (mathematics), functions f and g that produces a third function f*g, as the integral of the product of the two ...

of their distributions. Suppose

Z

is the sum of

n

independent random variables

X_1, \dots, X_n

each with probability mass functions

f_(x)

. Then

Z = \sum_^ .

If it has a distribution from the same family of distributions as the original variables, that family of distributions is said to be ''closed under convolution''. Often (always?) these distributions are also

stable distribution In probability theory, a distribution is said to be stable if a linear combination of two independent random variables with this distribution has the same distribution, up to location and scale parameters. A random variable is said to be st ...

s (see also

Discrete-stable distribution Discrete-stable distributions are a class of probability distributions with the property that the sum of several random variables from such a distribution under appropriate scaling is distributed according to the same family. They are the discrete ...

). Examples of such

univariate distribution In statistics, a univariate distribution is a probability distribution of only one random variable. This is in contrast to a multivariate distribution, the probability distribution of a random vector (consisting of multiple random variables). Exam ...

s are: normal distributions, Poisson distributions, binomial distributions (with common success probability), negative binomial distributions (with common success probability), gamma distributions (with common rate parameter), chi-squared distributions, Cauchy distributions, hyperexponential distributions. Examples: **If ''X''₁ and ''X''₂ are Poisson random variables with means ''μ''₁ and ''μ''₂ respectively, then ''X''₁ + ''X''₂ is a Poisson random variable with mean ''μ''₁ + ''μ''₂. ** The sum of gamma (''α''_''i'', ''β'') random variables has a gamma (Σ''α''_''i'', ''β'') distribution. **If ''X''₁ is a Cauchy (''μ''₁, ''σ''₁) random variable and ''X''₂ is a Cauchy (''μ''₂, ''σ''₂), then ''X''₁ + ''X''₂ is a Cauchy (''μ''₁ + ''μ''₂, ''σ''₁ + ''σ''₂) random variable. **If X₁ and X₂ are chi-squared random variables with ν₁ and ν₂ degrees of freedom respectively, then X₁ + X₂ is a chi-squared random variable with ν₁ + ν₂ degrees of freedom. **If ''X''₁ is a normal (''μ''₁, ''σ'') random variable and ''X''₂ is a normal (''μ''₂, ''σ'') random variable, then X₁ + ''X''₂ is a normal (''μ''₁ + ''μ''₂, ''σ'' + ''σ'') random variable. **The sum of ''N'' chi-squared (1) random variables has a chi-squared distribution with ''N'' degrees of freedom. Other distributions are not closed under convolution, but their sum has a known distribution: * The sum of ''n'' Bernoulli (p) random variables is a binomial (''n'', ''p'') random variable. * The sum of ''n'' geometric random variables with probability of success ''p'' is a negative binomial random variable with parameters ''n'' and ''p''. * The sum of ''n'' exponential (''β'') random variables is a gamma (''n'', ''β'') random variable. Since n is an integer, the gamma distribution is also a

. *The sum of the squares of ''N'' standard normal random variables has a chi-squared distribution with N degrees of freedom.

Product of variables

The product of independent random variables ''X'' and ''Y'' may belong to the same family of distribution as ''X'' and ''Y'':

and log-normal distribution. Example: * If ''X''₁ and ''X''₂ are independent log-normal random variables with parameters (''μ''₁, ''σ'') and (''μ''₂, ''σ'') respectively, then ''X''₁ ''X''₂ is a log-normal random variable with parameters (''μ''₁ + ''μ''₂, ''σ'' + ''σ'').

Minimum and maximum of independent random variables

For some distributions, the minimum value of several independent random variables is a member of the same family, with different parameters:

Geometric distribution In probability theory and statistics, the geometric distribution is either one of two discrete probability distributions: * The probability distribution of the number X of Bernoulli trials needed to get one success, supported on \mathbb = \; * T ...

Exponential distribution In probability theory and statistics, the exponential distribution or negative exponential distribution is the probability distribution of the distance between events in a Poisson point process, i.e., a process in which events occur continuousl ...

, Extreme value distribution,

Pareto distribution The Pareto distribution, named after the Italian civil engineer, economist, and sociologist Vilfredo Pareto, is a power-law probability distribution that is used in description of social, quality control, scientific, geophysical, actuarial scien ...

. Examples: * If ''X''₁ and ''X''₂ are independent geometric random variables with probability of success ''p''₁ and ''p''₂ respectively, then min(''X''₁, ''X''₂) is a geometric random variable with probability of success ''p'' = ''p''₁ + ''p''₂ − ''p''₁ ''p''₂. The relationship is simpler if expressed in terms probability of failure: ''q'' = ''q''₁ ''q''₂. * If ''X''₁ and ''X''₂ are independent exponential random variables with rate ''μ''₁ and ''μ''₂ respectively, then min(''X''₁, ''X''₂) is an exponential random variable with rate ''μ'' = ''μ''₁ + ''μ''₂. Similarly, distributions for which the maximum value of several independent random variables is a member of the same family of distribution include:

Power law In statistics, a power law is a Function (mathematics), functional relationship between two quantities, where a Relative change and difference, relative change in one quantity results in a relative change in the other quantity proportional to the ...

distribution.

Other

* If ''X'' and ''Y'' are independent standard normal random variables, ''X''/''Y'' is a Cauchy (0,1) random variable. * If ''X''₁ and ''X''₂ are independent chi-squared random variables with ''ν''₁ and ''ν''₂ degrees of freedom respectively, then (''X''₁/''ν''₁)/(''X''₂/''ν''₂) is an ''F''(''ν''₁, ''ν''₂) random variable. * If ''X'' is a standard normal random variable and U is an independent chi-squared random variable with ''ν'' degrees of freedom, then

\frac

is a Student's ''t''(''ν'') random variable. * If ''X''₁ is a gamma (''α''₁, 1) random variable and ''X''₂ is an independent gamma (α₂, 1) random variable then ''X''₁/(''X''₁ + ''X''₂) is a beta(''α''₁, ''α''₂) random variable. More generally, if ''X''₁ is a gamma(''α''₁, ''β''₁) random variable and ''X''₂ is an independent gamma(''α''₂, ''β''₂) random variable then β₂ X₁/(''β''₂ ''X''₁ + ''β''₁ ''X''₂) is a beta(''α''₁, ''α''₂) random variable. * If ''X'' and ''Y'' are independent exponential random variables with mean μ, then ''X'' − ''Y'' is a

double exponential Double exponential may refer to: * A double exponential function ** Double exponential time, a task with time complexity roughly proportional to such a function ** 2-EXPTIME, the complexity class of decision problems solvable in double-exponentia ...

random variable with mean 0 and scale μ. *If X_i are independent Bernoulli random variables then their parity (XOR) is a Bernoulli variable described by the piling-up lemma.

Approximate (limit) relationships

Approximate or limit relationship means *either that the combination of an infinite number of ''iid'' random variables tends to some distribution, *or that the limit when a parameter tends to some value approaches to a different distribution. Combination of ''iid'' random variables: * Given certain conditions, the sum (hence the average) of a sufficiently large number of iid random variables, each with finite mean and variance, will be approximately normally distributed. This is the

central limit theorem In probability theory, the central limit theorem (CLT) states that, under appropriate conditions, the Probability distribution, distribution of a normalized version of the sample mean converges to a Normal distribution#Standard normal distributi ...

(CLT). Special case of distribution parametrization: * ''X'' is a hypergeometric (''m'', ''N'', ''n'') random variable. If ''n'' and ''m'' are large compared to ''N'', and ''p'' = ''m''/''N'' is not close to 0 or 1, then ''X'' approximately has a Binomial(''n'', ''p'') distribution. * ''X'' is a beta-binomial random variable with parameters (''n'', ''α'', ''β''). Let ''p'' = ''α''/(''α'' + ''β'') and suppose ''α'' + ''β'' is large, then ''X'' approximately has a binomial(''n'', ''p'') distribution. * If ''X'' is a binomial (''n'', ''p'') random variable and if ''n'' is large and ''np'' is small then ''X'' approximately has a Poisson(''np'') distribution. * If ''X'' is a negative binomial random variable with ''r'' large, ''P'' near 1, and ''r''(1 − ''P'') = ''λ'', then ''X'' approximately has a Poisson distribution with mean ''λ''. Consequences of the CLT: * If ''X'' is a Poisson random variable with large mean, then for integers ''j'' and ''k'', P(''j'' ≤ ''X'' ≤ ''k'') approximately equals to ''P''(''j'' − 1/2 ≤ ''Y'' ≤ ''k'' + 1/2) where ''Y'' is a normal distribution with the same mean and variance as ''X''. * If ''X'' is a binomial(''n'', ''p'') random variable with large ''np'' and ''n''(1 − ''p''), then for integers ''j'' and ''k'', P(''j'' ≤ ''X'' ≤ ''k'') approximately equals to P(''j'' − 1/2 ≤ ''Y'' ≤ ''k'' + 1/2) where ''Y'' is a normal random variable with the same mean and variance as ''X'', i.e. ''np'' and ''np''(1 − ''p''). * If ''X'' is a beta random variable with parameters ''α'' and ''β'' equal and large, then ''X'' approximately has a normal distribution with the same mean and variance, i. e. mean ''α''/(''α'' + ''β'') and variance ''αβ''/((''α'' + ''β'')²(''α'' + ''β'' + 1)). * If ''X'' is a gamma(''α'', ''β'') random variable and the shape parameter ''α'' is large relative to the scale parameter ''β'', then ''X'' approximately has a normal random variable with the same mean and variance. * If ''X'' is a Student's ''t'' random variable with a large number of degrees of freedom ''ν'' then ''X'' approximately has a standard normal distribution. * If ''X'' is an ''F''(''ν'', ''ω'') random variable with ''ω'' large, then ''νX'' is approximately distributed as a chi-squared random variable with ''ν'' degrees of freedom.

Compound (or Bayesian) relationships

When one or more parameter(s) of a distribution are random variables, the compound distribution is the marginal distribution of the variable. Examples: * If ''X'' , ''N'' is a binomial (''N'',''p'') random variable, where parameter ''N'' is a random variable with negative-binomial (''m'', ''r'') distribution, then ''X'' is distributed as a negative-binomial (''m'', ''r''/(''p'' + ''qr'')). * If ''X'' , ''N'' is a binomial (''N'',''p'') random variable, where parameter ''N'' is a random variable with Poisson(''μ'') distribution, then ''X'' is distributed as a Poisson (''μp''). * If ''X'' , ''μ'' is a Poisson(''μ'') random variable and parameter ''μ'' is random variable with gamma(''m'', ''θ'') distribution (where ''θ'' is the scale parameter), then ''X'' is distributed as a negative-binomial (''m'', ''θ''/(1 + ''θ'')), sometimes called gamma-Poisson distribution. Some distributions have been specially named as compounds:

Beta negative binomial distribution In probability theory, a beta negative binomial distribution is the probability distribution of a discrete probability distribution, discrete random variable X equal to the number of failures needed to get r successes in a sequence of indepe ...

, gamma-normal distribution. Examples: * If ''X'' is a Binomial(''n'',''p'') random variable, and parameter p is a random variable with beta(''α'', ''β'') distribution, then ''X'' is distributed as a Beta-Binomial(''α'',''β'',''n''). * If ''X'' is a negative-binomial(''r'',''p'') random variable, and parameter ''p'' is a random variable with beta(''α'',''β'') distribution, then ''X'' is distributed as a

(''r'',''α'',''β'').

References

{{Reflist

External links

* Interactive graphic
Univariate Distribution Relationships
* ProbOnto - Ontology and knowledge base of probability distributions
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