BIVARIATE EXTENSIONS OF SKELLAM'S DISTRIBUTION

Skellam's name is traditionally attached to the distribution of the difference of two independent Poisson random variables. Many bivariate extensions of this distribution are possible, e.g., through copulas. In this paper, the authors focus on a probabilistic construction in which two Skellam random variables are affected by a common shock. Two different bivariate extensions of the Skellam distribution stem from this construction, depending on whether the shock follows a Poisson or a Skellam distribution. The models are nested, easy to interpret, and yield positive quadrant-dependent distributions, which share the convolution closure property of the univariate Skellam distribution. The models can also be adapted readily to account for negative dependence. Closed form expressions for Pearson's correlation between the components make it simple to estimate the para-meters via the method of moments. More complex formulas for Kendall's tau and Spearman's rho are also provided.

[1]  Christophe Chesneau,et al.  On the Bivariate Skellam Distribution , 2015 .

[2]  A. Alzaid,et al.  On the Poisson difference distribution inference and applications. , 2010 .

[3]  C. Genest,et al.  A Primer on Copulas for Count Data , 2007, ASTIN Bulletin.

[4]  Youngbae Hwang,et al.  Sensor noise modeling using the Skellam distribution: Application to the color edge detection , 2007, 2007 IEEE Conference on Computer Vision and Pattern Recognition.

[5]  Johanna Nešlehová,et al.  On rank correlation measures for non-continuous random variables , 2007 .

[6]  D. Karlis,et al.  Bayesian analysis of the differences of count data , 2006, Statistics in medicine.

[7]  D. Karlis,et al.  Analysis of sports data by using bivariate Poisson models , 2003 .

[8]  Bill Ravens,et al.  An Introduction to Copulas , 2000, Technometrics.

[9]  Samuel M. Giveen A Taxicab Problem with Time-Dependent Arrival Rates , 1963 .

[10]  J. Strackee,et al.  The frequency distribution of the difference between two Poisson variates , 1962 .

[11]  Distribucion de la suma algebraica de variables de Poisson , 1956 .

[12]  D. Kendall Some Problems in the Theory of Queues , 1951 .

[13]  J. G. Skellam The frequency distribution of the difference between two Poisson variates belonging to different populations. , 1946, Journal of the Royal Statistical Society. Series A.

[14]  J. O. Irwin,et al.  The Frequency Distribution of the Difference between Two Independent Variates Following the Same Poisson Distribution , 1937 .