Higher-dimensional attractors with absolutely continuous invariant probability

Abstract

Consider a dynamical system T:T× Rd → T× Rd given by T(x,y) = (E(x), C(y) + f(x)), where E is a linear expanding map of T, C is a linear contracting map of Rd and f is in C2(T,Rd). We prove that if T is volume expanding and u≥ d, then for every E there exists an open set U of pairs (C,f) for which the corresponding dynamic T admits an absolutely continuous invariant probability. A geometrical characteristic of transversality between self-intersections of images of T×\ 0 \ is present in the dynamic of the maps in U. In addition, we give a condition between E and C under which it is possible to perturb f to obtain a pair (C,f) in U.