On the Dependence of the Component Counting Process of a Discrete Uniform Random Variable

Abstract

We are concerned with the general problem of proving the existence of joint distributions of two discrete random variables M and N subject to infinitely many constraints of the form P(M=i,N=j)=0. In particular, the variable M has a countably infinite range and the other variable N is uniformly distributed with finite range. The constraints placed on the joint distribution will require, for some j's in the range of N, p(i,j)=0 for infinitely many values of i in the range of M. To prove the existence of such a joint distribution, we provide a technique that furnishes the existence of an ∞× n matrix consisting of non-negative real numbers whose row and column sums are known, with zeros in infinitely many pre-specified locations.