Berry-Esseen's central limit theorem for non-causal linear processes in Hilbert space

Abstract

Let H be a real separable Hilbert space and (ak)k∈Z a sequence of bounded linear operators from H to H. We consider the linear process X defined for any k in Z by Xk=Σj∈Zaj(k-j) where (k)k∈Z is a sequence of i.i.d. centered H-valued random variables. We investigate the rate of convergence in the CLT for X and in particular we obtain the usual Berry-Esseen's bound provided that Σj∈Z j\|aj\|L(H)<+∞ and 0 belongs to LH∞.