Weak Mixing Transformation Which Is Shannon Orbit Equivalent to a Given Ergodic Transformation

Abstract

We prove that every ergodic transformation is Shannon orbit equivalent to a weak mixing transformation. The proof is based on the techniques introduced by Fieldsteel and Friedman to show that there is a mixing transformation for a given ergodic transformation T which is, for all a≥1, weak-a-equivalent to T and, for all b∈(0,1), strong-b-equivalent to T. In particular, we will adapt the construction of Fieldsteel and Friedman by which they permute the columns of each Rokhlin tower in a sequence of rapidly growing Rokhlin towers so that the corresponding cocycles converge to an orbit equivalence cocycle of T such that the resulting transformation and orbit equivalence have the desired properties. In addition to this, we will demonstrate a flexible method for obtaining actions of Z2 which are Shannon orbit equivalent to a given ergodic transformation.

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