A Bivariate Discrete Charlier Series Distribution

A discrete distribution involving CHABLIER polynomial is considered. This distribution can be regarded 88 the counterpart of the non-central negative binomial distribution ON^ and LEE, 1979). Application to data-fitting is illustrated.

Problems of specifying bivariate discrete distributions by a conditional distribution and a regression function are investigated. A review of the known results, together with new characterizations involving conditional power series laws, is given. Also some remarks on a method making use of marginal

Bivariate failure rates and mean residual lives for nonnegative integer valued discrete variables are defined and examined for the unique determination of the underlying frequency function. As an application, a bivariate geometric distribution is obtained through a characterization approach based on

We introduce bivariate quantiles which are defined through the bivariate distribution function. This approach ensures that, unlike most multivariate medians or the multivariate M-quartiles, the bivariate quantiles satisfy an analogous property to that of the univariate quantiles in that they partiti