Smooth deformations of piecewise expanding unimodal maps

Abstract

In the space of Ck piecewise expanding unimodal maps, k>=1, we characterize the C1 smooth families of maps where the topological dynamics does not change (the "smooth deformations") as the families tangent to a continuous distribution of codimension-one subspaces (the "horizontal" directions) in that space. Furthermore such codimension-one subspaces are defined as the kernels of an explicit class of linear functionals. As a consequence we show the existence of Ck-1+Lip deformations tangent to every given Ck horizontal direction, for k>=2.