Extensions of two classical Poisson limit laws to non-stationary independent data

Abstract

In earlier stages in the introduction to asymptotic methods in probability theory, the weak convergence of sequences (Xn)n≥ 1 of Binomial of random variables (rv's) to a Poisson law is classical and easy-to prove. A version of such a result concerning sequences (Yn)n≥ 1 of negative binomial rv's also exists. In both cases, Xn and Yn-n are by-row sums Sn[X] and Sn[Y] of arrays of Bernoulli rv's and corrected geometric rv's respectively. When considered in the general frame of asymptotic theorems of by-row sums of rv's of arrays, these two simple results in the independent and identically distributed scheme can be generalized to non-stationary data and beyond to non-stationary and dependent data. Further generalizations give interesting results that would not be found by direct methods. In this paper, we focus on generalizations to the non-stationary independent data. Extensions to dependent data will addressed later.