The limit law of certain discrete multivariate distributions

Abstract

Let X1,\,X2,\,…,\,XN, N∈N be independent but not necessarily identically distributed discrete and integer-valued random variables. Assume that X1≥slant m1, X2≥slant m2, …, XN≥slant mN almost surely, where m1,\,m2,…,\,mN are some integer numbers such that m1+m2+…+mN<0, and Xk is identically distributed as Xk+N, for all k∈N in the sequence X1,\,X2,\,… In this communication, we make use of some of the known results to provide the closed-form expression of the limit multivariate distribution function P(X1≤slant x,\,X1+X2≤slant x,\,…), x∈Z via: (1) inclusion-exclusion principle based product of the roots of GN(s)=1, where GN(s) is the probability generating function of SN=X1+X2+…+XN, (2) the probability mass function of SN, and (3) the expectation ESN.