Limit theorems for functionals of linear processes in critical regions
Abstract
Let X=\Xn: n∈N\ be the linear process defined by Xn=Σ∞j=1 ajn-j, where the coefficients aj=j-β(j) are constants with β>0 and a slowly varying function, and the innovations \n\n∈Z are i.i.d. random variables belonging to the domain of attraction of an α-stable law with α∈(0,2]. Limit theorems for the partial sum S[Nt]=Σ[Nt]n=1[K(Xn)-EK(Xn)] with proper measurable functions K have been extensively studied, except for two critical regions: I. α∈(1,2),β=1 and II. αβ=2,β≥1. In this paper, we address these open scenarios and identify the asymptotic distributions of S[Nt] under mild conditions.
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