Topological dynamics of piecewise λ-affine maps

Abstract

Let -1<λ<1 and f:[0,1) be a piecewise λ-affine map, that is, there exist points 0=c0<c1<·s <cn-1<cn=1 and real numbers b1,…,bn such that f(x)=λ x+bi for every x∈ [ci-1,ci). We prove that, for Lebesgue almost every δ∈R, the map fδ=f+δ\,( mod\,1) is asymptotically periodic. More precisely, fδ has at most 2n periodic orbits and the ω-limit set of every x∈ [0,1) is a periodic orbit.