On simultaneous limits for aggregation of stationary randomized INAR(1) processes with Poisson innovations

Abstract

We investigate joint temporal and contemporaneous aggregation of N independent copies of strictly stationary INteger-valued AutoRegressive processes of order 1 (INAR(1)) with random coefficient α∈(0,1) and with idiosyncratic Poisson innovations. Assuming that α has a density function of the form (x) (1 - x)β, x ∈ (0,1), with β∈(-1,∞) and x 1 (x) = 1 ∈ (0,∞), different limits of appropriately centered and scaled aggregated partial sums are shown to exist for β∈(-1,0] in the so-called simultaneous case, i.e., when both N and the time scale n increase to infinity at a given rate. The case β∈(0,∞) remains open. We also give a new explicit formula for the joint characteristic functions of finite dimensional distributions of the appropriately centered aggregated process in question.