Classification of the crossed product C(M)×θp for certain pairs (M,θ)

Abstract

Let M be a separable compact Hausdorff space with M 2 and θ M M be a homeomorphism with prime period p (p 2). Set Mθ=\x∈ M| θ(x)=x\= and M0=M Mθ. Suppose that M0 is dense in M and H2(M0/θ,) 0, H2((M0/θ),) 0. Let M' be another separable compact Hausdorff space with M' 2 and θ' be the self--homeomorphism of M' with prime period p. Suppose that M0'=M' Mθ'' is dense in M'. Then C(M)×θp C(M')×θ'p iff there is a homeomorphism F from M/θ onto M'/θ' such that F(Mθ)=M'θ'. Thus, if (M,θ) and (M',θ') are orbit equivalent, then C(M)×θp C(M')×θ'p.