Some special functions are particularly relevant in Applied Probability and Statistics.
For example, the incomplete gamma and beta functions are (up to normalization
factors) the cumulative central gamma and beta distribution functions, respectively.
The corresponding noncentral distributions (the Marcum-Q function and the cumulative
noncentral beta distribution function) play also a signi_x001C_cant role in several
applications. The inversion of cumulative distribution functions (CDFs) is also an
important problem, in particular for computing percentage points or values of some
relevant parameters when the distribution function is involved in hypothesis testing.
In this talk, methods for computing and inverting the gamma and beta CDFs are discussed.
The performance of the methods will be illustrated with numerical examples.
As we will see, we may contemplate CDFs as a branch of the large family of special
functions yet probably not so well known as other classical functions.