A note on linear processes with tapered innovations

Abstract

In the paper we consider the partial sum process Σk=1[nt]Xk(n), where \Xk(n), \ k∈ Z\,\ n 1, is a series of linear processes with innovations having heavy-tailed tapered distributions with tapering parameter bn depending on n. It is shown that, depending on the properties of a filter of a linear process under consideration and on the parameter bn defining if the tapering is hard or soft, the limit process for such partial sum process can be fractional Brownian motion or linear fractional stable motion.