Homeomorphisms of the annulus with a transitive lift

Abstract

Let f be a homeomorphism of the closed annulus A that preserves orientation, boundary components and that has a lift f to the infinite strip A which is transitive. We show that, if the rotation number of both boundary components of A is strictly positive, then there exists a closed nonempty connected set ⊂ A such that ⊂]-∞,0]×[0,1], is unlimited, the projection of to A is dense, -(1,0)⊂ and f()⊂ . Also, if p1 is the projection in the first coordinate in A, then there exists d>0 such that, for any z∈, n∞p1( fn( z))-p1( z)n<-d. In particular, using a result of Franks, we show that the rotation set of any homeomorphism of the annulus that preserves orientation, boundary components, which has a transitive lift without fixed points in the boundary is an interval with 0 in its interior.