On the mixing properties of piecewise expanding maps under composition with permutations, II: Maps of non-constant orientation

Abstract

For an integer m ≥ 2, let Pm be the partition of the unit interval I into m equal subintervals, and let Fm be the class of piecewise linear maps on I with constant slope m on each element of Pm. We investigate the effect on mixing properties when f ∈ Fm is composed with the interval exchange map given by a permutation σ ∈ SN interchanging the N subintervals of PN. This extends the work in a previous paper [N.P. Byott, M. Holland and Y. Zhang, DCDS, 33, (2013) 3365--3390], where we considered only the "stretch-and-fold" map fsf(x)=mx 1.