Complete semi-conjugacies for psuedo-Anosov homeomorphisms

Abstract

Suppose S is a surface of genus 2 , f: S S is a surface homeomorphism isotopic to a pseudo-Anosov map α and suppose S is the universal cover of S and F and A are lifts of f and α respectively. We show there is a semiconjugacy : S s × u from F to A, where s ( u) is the completion of the R-tree of leaves of the stable (resp. unstable) foliation for A and A is the map induced by A. We also generalize a result of Markovich and show that for any g ∈ Homeo(S) which commutes with f and has identity lift G : S S and for any (c,w) in the image of each component of -1(c,w) is G-invariant.