AR(1) sequence with random coefficients: Regenerative properties and its application

Abstract

Let \Xn\n0 be a sequence of real valued random variables such that Xn=n Xn-1+εn,~n=1,2,…, where \(n,εn)\n1 are i.i.d. and independent of initial value (possibly random) X0. In this paper it is shown that, under some natural conditions on the distribution of (1,ε1), the sequence \Xn\n0 is regenerative in the sense that it could be broken up into i.i.d. components. Further, when 1 and ε1 are independent, we construct a non-parametric strongly consistent estimator of the characteristic functions of 1 and ε1.