New Derived from Anosov Diffeomorphisms with pathological center foliation

Abstract

In this paper we focused our study on Derived From Anosov diffeomorphisms (DA diffeomorphisms ) of the torus T3, it is, an absolute partially hyperbolic diffeomorphism on T3 homotopic to an Anosov linear automorphism of the T3. We can prove that if f: T3 → T3 is a volume preserving DA diffeomorphism homotopic to linear Anosov A, such that the center Lyapunov exponent satisfies λcf(x) > λcA > 0, with x belongs to a positive volume set, then the center foliation of f is non absolutely continuous. We construct a new open class U of non Anosov and volume preserving DA diffeomorphisms, satisfying the property λcf(x) > λcA > 0 for m-almost everywhere x ∈ T3. Particularly for every f ∈ U, the center foliation of f is non absolutely continuous.