Let ϕ1,…,ϕn:[0,1]→(0,1) be Lipschitz contractions. Let
I=[0,1), x0=0 and xn=1. We prove that for Lebesgue almost every
(x1,...,xn−1) satisfying 0<x1<⋯<xn−1<1, the piecewise
contraction f:I→I defined by x∈[xi−1,xi)↦ϕi(x) is
asymptotically periodic. More precisely, f has at least one and at most n
periodic orbits and the ω-limit set ωf(x) is a periodic orbit of
f for every x∈I.Comment: 16 pages, two figure