| dc.description.abstract | In this work, we consider a class of mixture distributions generated by randomizing the success
parameter p of a Binomial distribution. We derive the density functions of the mixture
distributions, and in some cases, give their simple properties, such as the mean and variance.
We also derive the density functions of mixing distributions that may be new to the reader. This
is important because these densities are then used in the mixing procedure. The reader can
then follow through with the process and calculations therein.
We find that the Beta distribution is a most tractable mixer for the Binomial, and therefore
dedicate a whole Chapter to various Beta generalizations in the unit interval, and their derived
Binomial mixtures. Chapter three then looks at viable alternatives to the Beta in this regard.
The remaining Chapters are dedicated to various transformations that enable us to move
beyond the unit interval in which the parameter p is restricted. A summary of our findings and
further areas of research is given in Chapter eight. | en |
