Dynamics of piecewise increasing contractions

Abstract

Let I1=[a0,a1),…,Ik= [ak-1,ak) be a partition of the interval I=[0,1) into k subintervals. Let f:I I be a map such that each restriction f|Ii is an increasing Lipschitz contraction. We prove that any f admits at most k periodic orbits, where the upper bound is sharp. We are also interested in the dynamics of piecewise linear λ-affine maps, where 0<λ<1. Let b1,…,bk be real numbers and let Fλ: I R be a function such that each restriction Fλ|Ii(x)=λ x +bi. Under a generic assumption on the parameters a1,…,ak-1,b1,…,bk, we prove that, up to a zero Hausdorff dimension set of slopes λ, the ω-limit set of the piecewise λ-affine maps fλ:x∈ I Fλ(x)1 at every point equals a periodic orbit and there exist at most k periodic orbits. Moreover, let E(k) be the exceptional set of parameters λ,a1,…,ak-1,b1,…,bk which define non-asymptotically periodic f, we prove that E(k) is a Lebesgue null measure set whose Hausdorff dimension is large or equal to k.