Limit theorems for Hilbert space-valued linear processes under long range dependence

Abstract

Let (Xk)k ∈ Z be a linear process with values in a separable Hilbert space H given by Xk =Σj=0∞ (j+1)-Nk-j for each k ∈ Z, where N:H H is a bounded, linear normal operator and (k) k ∈ Z is a sequence of independent, identically distributed H-valued random variables with E0=0 and E\| 0 \|2<∞. We investigate the central and the functional central limit theorem for (Xk)k ∈ Z when the series of operator norms Σj=0∞ \|(j+1)-N\|op diverges. Furthermore we show that the limit process in case of the functional central limit theorem generates an operator self-similar process.