Iterated limits for aggregation of randomized INAR(1) processes with Poisson innovations

Abstract

We discuss 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 x 1(x) = 1 ∈(0,∞), different limits of appropriately centered and scaled aggregated partial sums are shown to exist for β∈(-1,0), β = 0, β∈(0,1) or β∈(1,∞), when taking first the limit as N∞ and then the time scale n∞, or vice versa. In fact, we give a partial solution to an open problem of Pilipauskaite and Surgailis (2014) by replacing the random-coefficient AR(1) process with a certain randomized INAR(1) process.