The Conway–Maxwell–Poisson Distribution

While the Poisson distribution is a classical statistical model for count data, the distributional model hinges on the constraining property that its mean equal its variance. This text instead introduces the Conway-Maxwell-Poisson distribution and motivates its use in developing flexible statistical methods based on its distributional form. This two-parameter model not only contains the Poisson distribution as a special case but, in its ability to account for data over- or under-dispersion, encompasses both the geometric and Bernoulli distributions. The resulting statistical methods serve in a multitude of ways, from an exploratory data analysis tool, to a flexible modeling impetus for varied statistical methods involving count data. The first comprehensive reference on the subject, this text contains numerous illustrative examples demonstrating R code and output. It is essential reading for academics in statistics and data science, as well as quantitative researchers and data analysts in economics, biostatistics and other applied disciplines.

• The first comprehensive reference on the Conway-Maxwell-Poisson distribution
• Teaches readers how to write the relevant code and shows how the output will appear, with detailed discussion of R packages, and numerous illustrative examples
• Compares various potential models for analysis to demonstrate the appeal of the Conway-Maxwell-Poisson model in relevant scenarios