The ''q''-exponential distribution is a

probability distribution In probability theory and statistics, a probability distribution is the mathematical function that gives the probabilities of occurrence of different possible outcomes for an experiment. It is a mathematical description of a random phenomeno ...

arising from the maximization of the

Tsallis entropy In physics, the Tsallis entropy is a generalization of the standard Boltzmann–Gibbs entropy. Overview The concept was introduced in 1988 by Constantino Tsallis as a basis for generalizing the standard statistical mechanics and is identical in ...

under appropriate constraints, including constraining the domain to be positive. It is one example of a

Tsallis distribution In statistics, a Tsallis distribution is a probability distribution derived from the maximization of the Tsallis entropy under appropriate constraints. There are several different families of Tsallis distributions, yet different sources may refere ...

. The ''q''-exponential is a generalization of the

exponential distribution In probability theory and statistics, the exponential distribution is the probability distribution of the time between events in a Poisson point process, i.e., a process in which events occur continuously and independently at a constant averag ...

in the same way that Tsallis entropy is a generalization of standard Boltzmann–Gibbs entropy or

Shannon entropy Shannon may refer to: People * Shannon (given name) * Shannon (surname) * Shannon (American singer), stage name of singer Shannon Brenda Greene (born 1958) * Shannon (South Korean singer), British-South Korean singer and actress Shannon Arrum Will ...

. The exponential distribution is recovered as

q \rightarrow 1.

Originally proposed by the statisticians

George Box George Edward Pelham Box (18 October 1919 – 28 March 2013) was a British statistician, who worked in the areas of quality control, time-series analysis, design of experiments, and Bayesian inference. He has been called "one of the g ...

and David Cox in 1964, and known as the reverse

Box–Cox transformation In statistics, a power transform is a family of functions applied to create a monotonic transformation of data using power functions. It is a data transformation technique used to stabilize variance, make the data more normal distribution-like ...

for

q=1-\lambda,

a particular case of

power transform In statistics, a power transform is a family of functions applied to create a monotonic transformation of data using power functions. It is a data transformation technique used to stabilize variance, make the data more normal distribution-like, ...

in statistics.

Characterization

Probability density function

The ''q''-exponential distribution has the probability density function :

(2-q) \lambda e_q(-\lambda x)

where :

e_q(x) = +(1-q)x

is the ''q''-exponential if . When , ''e''_''q''(x) is just exp(''x'').

Derivation

In a similar procedure to how the

can be derived (using the standard Boltzmann–Gibbs entropy or Shannon entropy and constraining the domain of the variable to be positive), the ''q''-exponential distribution can be derived from a maximization of the Tsallis Entropy subject to the appropriate constraints.

Relationship to other distributions

The ''q''-exponential is a special case of the generalized Pareto distribution where :

\mu = 0,\quad \xi = \frac ,\quad \sigma = \frac.

The ''q''-exponential is the generalization of the

Lomax distribution The Lomax distribution, conditionally also called the Pareto Type II distribution, is a heavy-tail probability distribution used in business, economics, actuarial science, queueing theory and Internet traffic modeling. It is named after K. ...

(Pareto Type II), as it extends this distribution to the cases of finite support. The Lomax parameters are: :

\alpha = \frac ,\quad \lambda_\mathrm = \frac.

As the Lomax distribution is a shifted version of the

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, actu ...

, the ''q''-exponential is a shifted reparameterized generalization of the Pareto. When , the ''q''-exponential is equivalent to the Pareto shifted to have support starting at zero. Specifically, if :

X \sim \operatorname(q,\lambda) \text
       Y \sim \left operatorname\left(x_m = \frac, \alpha = \frac\right) -x_m\right

then

X \sim Y.

Generating random deviates

Random deviates can be drawn using

inverse transform sampling Inverse transform sampling (also known as inversion sampling, the inverse probability integral transform, the inverse transformation method, Smirnov transform, or the golden ruleAalto University, N. Hyvönen, Computational methods in inverse probl ...

. Given a variable ''U'' that is uniformly distributed on the interval (0,1), then :

X = \frac \sim \operatorname(q,\lambda)

where

\ln_

is the ''q''-logarithm and

q' = \frac.

Applications

Being a

, it is a usual technique in statistics for stabilizing the variance, making the data more normal distribution-like and improving the validity of measures of association such as the Pearson correlation between variables. It has been found to be an accurate model for train delays. It is also found in atomic physics and quantum optics, for example processes of molecular condensate creation via transition through the Feshbach resonance.

Notes

External links

{{DEFAULTSORT:Q-Exponential Distribution Statistical mechanics Continuous distributions Probability distributions with non-finite variance