Strongly continuous orbit equivalence of one-sided topological Markov shifts

Abstract

We will introduce a notion of strongly continuous orbit equivalence in one-sided topological Markov shifts. Strongly continuous orbit equivalence yields a topological conjugacy between their two-sided topological Markov shifts (XA, σA) and (XB, σB). We prove that one-sided topological Markov shifts (XA, σA) and (XB, σB) are strongly continuous orbit equivalent if and only if there exists an isomorphism bewteen the Cuntz-Krieger algebras OA and OB preserving their maximal commutative C*-subalgebras C(XA) and C(XB) and giving cocycle conjugate gauge actions. An example of one-sided topological Markov shifts which are strongly continuous orbit equivalent but not one-sided topologically conjugate is presented.