Testing epidemic change in nearly nonstationary process with statistics based on residuals

Abstract

We study an epidemic type change in innovations of a first order autoregressive process yn,k = n yn,k-1 + εk + an,k, where φn is either a constant in (-1,1) or a sequence in (0,1), converging to 1. For k inside some unknown interval In=(k,k+], an,k=an while an,k=0 for k outside In. When an≠ 0, we have an epidemic deviation from the usual (zero) mean of innovations. Since innovations are not observed, we build uniform increments statistics on residuals (εk) of the process yn,k. We assume that innovations (εk) are regularly varying with index p 2 or satisfies integrability condition t ∞ tp P(|ε1| > t) = 0 for p > 2 and Eεk2 < ∞ for p=2. We find the limit distributions of the tests under no change and prove consistency under short epidemics that is =O(nβ) for some 0<β 1/2.