Marshall–Olkin exponential distribution


In applied statistics, the Marshall–Olkin exponential distribution is any member of a certain family of continuous multivariate probability distributions with positive-valued components. It was introduced by Albert W. Marshall and Ingram Olkin.
One of its main uses is in reliability theory, where the Marshall–Olkin copula models the dependence between random variables subjected to external shocks.

Definition

Let be a set of independent, exponentially distributed random variables, where has mean. Let
The joint distribution of is called the Marshall–Olkin exponential distribution with parameters

Concrete example

Suppose b = 3. Then there are seven nonempty subsets of = ; hence seven different exponential random variables:
Then we have: