Persistence of one-dimensional AR(1)-sequences

Abstract

For a class of one-dimensional autoregressive processes (Xn) we consider the tail behaviour of the stopping time T0= n≥ 1: Xn≤ 0 . We discuss existing general analytical approaches to this and related problems and propose a new one, which is based on a renewal-type decomposition for the moment generating function of T0 and on the analytical Fredholm alternative. Using this method, we show that Px(T0=n) V(x)R0n for some 0<R0<1 and a positive R-10-harmonic function V. Further we prove that our conditions on the tail behaviour of the innovations are sharp in the sense that fatter tails produce non-exponential decay factors.