The Shift Operator Calculus for Stationary Time Series Analysis

Abstract

The article establishes a rigorous shift operator calculus for stationary time series modeling, addressing a certain gap in the literature. It provides proofs of existence and isometry for the transfer function operators f(B) and f(T) where B is the bilateral shift operator and T is the unilateral shift operator for different families of functions f. The article establishes convergence of the power series of f(B) and f(T) under the operator norm for the Wiener algebra W+, and convergence under strong operator topology for f in H∞, based on the use of Abel sums. Based on this calculus, it unifies the notion of stationary process invertibility with the operator invertibility of the transfer function f(T).