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Template:One source The Mittag-Leffler distributions are two families of probability distributions on the half-line [0,). They are parametrized by a real α(0,1] or α[0,1]. Both are defined with the Mittag-Leffler function.[1]

The Mittag-Leffler function

For any complex α whose real part is positive, the series

Eα(z):=n=0znΓ(1+αn)

defines an entire function. For α=0, the series converges only on a disc of radius one, but it can be analytically extended to {1}.

First family of Mittag-Leffler distributions

The first family of Mittag-Leffler distributions is defined by a relation between the Mittag-Leffler function and their cumulative distribution functions.

For all α(0,1], the function Eα is increasing on the real line, converges to 0 in , and Eα(0)=1. Hence, the function x1Eα(xα) is the cumulative distribution function of a probability measure on the non-negative real numbers. The distribution thus defined, and any of its multiples, is called a Mittag-Leffler distribution of order α.

All these probability distribution are Absolutely_continuous#Absolute_continuity_of_measures. Since E1 is the exponential function, the Mittag-Leffler distribution of order 1 is an exponential distribution. However, for α(0,1), the Mittag-Leffler distributions are Heavy-tailed_distribution. Their Laplace transform is given by:

𝔼(eλXα)=11+λα,

which implies that, for α(0,1), the expectation is infinite. In addition, these distributions are geometric stable distributions.

Second family of Mittag-Leffler distributions

The second family of Mittag-Leffler distributions is defined by a relation between the Mittag-Leffler function and their moment-generating functions.

For all α[0,1], a random variable Xα is said to follow a Mittag-Leffler distribution of order α if, for some constant C>0,

𝔼(ezXα)=Eα(Cz),

where the convergence stands for all z in the complex plane if α(0,1], and all z in a disc of radius 1/C if α=0.

A Mittag-Leffler distribution of order 0 is an exponential distribution. A Mittag-Leffler distribution of order 1/2 is the distribution of the absolute value of a normal distribution random variable. A Mittag-Leffler distribution of order 1 is a degenerate distribution. In opposition to the first family of Mittag-Leffler distribution, these distributions are not heavy-tailed.

These distributions are commonly found in relation with the local time of Markov processes.

References

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