On the Integrability of codimension-one invariant subbundles of partially hyperbolic skew-products

Abstract

We prove there is a class of maps γ:T2n→S1 such that a conservative dynamically coherent partially hyperbolic skew-product on T2n×S1 with fixed hyperbolic dynamics on the base and rotation by angle γ acting on the fibers have integrable hyperbolic structure which also implies in particular that they are not contact diffeomorphisms. In dimension 3, we prove the same result using a standard technique in Contact Geometry, namely, that of characteristic foliations, which gives a simple proof of the result but with more tight restrcitions to the map γ.