A Compound Poisson Convergence Theorem for Sums of m-Dependent Variables

Abstract

We prove the Simons-Johnson theorem for the sums Sn of m-dependent random variables, with exponential weights and limiting compound Poisson distribution (s,λ). More precisely, we give sufficient conditions for Σk=0∞hkP(Sn=k)-(s,λ)\k\ 0 and provide an estimate on the rate of convergence. It is shown that the Simons-Johnson theorem holds for weighted Wasserstein norm as well. %limiting sum of two Poisson variables defined on %different lattices. The results are then illustrated for N(n;k1,k2) and k-runs statistics.