Dynamics of 2-interval piecewise affine maps and Hecke-Mahler series

Abstract

Let f : [0,1)→ [0,1) be a 2-interval piecewise affine increasing map which is injective but not surjective. Such a map f has a rotation number and can be parametrized by three real numbers. We make fully explicit the dynamics of f thanks to two specific functions δ and φ depending on these parameters whose definitions involve Hecke-Mahler series. As an application, we show that the rotation number of f is rational, when the three parameters are algebraic numbers.