Sufficient conditions for the filtration of a stationary processes to be standard

Abstract

Let X be a stationary process with values in some σ-finite measured state space (E,E,π), indexed by Z. Call FX its natural filtration. In ceillierstationary, sufficient conditions were given for FX to be standard when E is finite. The proof of this result used a coupling of all probabilities on the finite set E. In this paper, we construct a coupling of all laws having a density with regard to π, which is much more involved. Then, we provide sufficient conditions for FX to be standard, generalizing those in ceillierstationary.