Limit theorems for functionals of long memory linear processes with infinite variance

Abstract

Let X=\Xn: n∈N\ be a long memory linear process in which the coefficients are regularly varying and innovations are independent and identically distributed and belong to the domain of attraction of an α-stable law with α∈ (0, 2). Then, for any integrable and square integrable function K on R, under certain mild conditions, we establish the asymptotic behavior of the partial sum process \[ \Σn=1[Nt][K(Xn)- K(Xn)]:\; t≥ 0\ \] as N tends to infinity, where [Nt] is the integer part of Nt for t≥ 0.