Limit theorems for linear processes with tapered innovations and filters

Abstract

In the paper we consider the partial sum process Σk=1[nt]Xk(n), where \Xk(n)=Σj=0∞ aj(n)k-j(b(n)), \ k∈ \,\ n 1, is a series of linear processes with tapered filter aj(n)=aj∈d[0 j (n)] and heavy-tailed tapered innovations j(b(n), \ j∈ . Both tapering parameters b(n) and (n) grow to ∞ as n ∞. The limit behavior of the partial sum process depends on the growth of these two tapering parameters and dependence properties of a linear process with non-tapered filter ai, \ i 0 and non-tapered innovations. We consider the case where b(n) grows relatively slow (soft tapering), and all three cases of growth of (n) (strong, weak, and moderate tapering). In these cases the limit processes (in the sense of convergence of finite dimensional distributions) are Gaussian.