Does P(ω) / fin know its right hand from its left?

Abstract

Let σ denote the shift automorphism on P(ω) / fin, defined by setting σ([A]) = [A+1] for all A ⊂eq ω. We show that the Continuum Hypothesis implies the shift automorphism σ and its inverse σ-1 are conjugate in the automorphism group of P(ω) / fin. Due to work of van Douwen and Shelah, it has been known since the 1980's that it is consistent with ZFC that σ and σ-1 are not conjugate. Our result shows that the question of whether σ and σ-1 are conjugate is independent of ZFC. As a corollary to the main theorem, we deduce that the structures P(ω) / fin,σ and P(ω) / fin,σ-1 are elementarily equivalent in the language of algebraic dynamical systems (Boolean algebras together with an automorphism). This corollary does not depend on the Continuum Hypothesis.