On the intersection of homoclinic classes in intransitive sectional-Anosov flows

Abstract: We show that if X is a Venice mask (i.e. nontransitive sectional-Anosov flow with dense periodic orbits, [9], [25], [24], [18]) supported on a compact 3-manifold, then the omega-limit set of every non-recurrent point in the unstable manifold of some singularity is a closed orbit. In addition, we prove that the intersection of two different homoclinic classes in the maximal invariant set of a sectional-Anosov flow can be decomposed as the disjoint union of, singular points, a non-singular hyperbolic set, and re… Show more