Matrix-exponential distribution

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In probability theory, the matrix-exponential distribution is an absolutely continuous distribution with rational Laplace–Stieltjes transform.^[1] They were first introduced by David Cox in 1955 as distributions with rational Laplace–Stieltjes transforms.^[2]

The probability density function is ${\displaystyle f(x)=\mathit{\alpha }{e}^{xT}𝐬\text{ for }x\ge 0}$ (and 0 when x < 0), and the cumulative distribution function is ${\displaystyle F(t)=1-\alpha e^{\mathbf{\text{A}}t}\mathbf{\text{1}}}$^[3] where 1 is a vector of 1s and

${\displaystyle \begin{array}{cc}\alpha & \in {ℝ}^{1\times n},\\ T& \in {ℝ}^{n\times n},\\ s& \in {ℝ}^{n\times 1}.\end{array}}$

There are no restrictions on the parameters α, T, s other than that they correspond to a probability distribution.^[4] There is no straightforward way to ascertain if a particular set of parameters form such a distribution.^[2] The dimension of the matrix T is the order of the matrix-exponential representation.^[1]

The distribution is a generalisation of the phase-type distribution.

If X has a matrix-exponential distribution then the kth moment is given by^[2]

${\displaystyle \mathrm{E}(X^k)=(-1{)}^{k+1}k!\mathit{\alpha }{T}^{-(k+1)}𝐬.}$

Matrix exponential distributions can be fitted using maximum likelihood estimation.^[5]

• BuTools a MATLAB and Mathematica script for fitting matrix-exponential distributions to three specified moments.

• Rational arrival process

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