Robust heterodimensional cycles of co-index two via split blending machines
Abstract
We consider diffeomorphisms f with heterodimensional cycles of co-index two, associated with saddles P and Q having unstable indices and +2, respectively. In a partially hyperbolic setting, where a two-dimensional center direction and strong invariant manifolds are defined, we introduce the class of non-escaping cycles, where the strong stable manifold of P and the strong unstable manifold of Q are involved in the cycle. This configuration guarantees the existence of orbits that remain in a neighbourhood of the cycle. We show that such diffeomorphisms f can be C1 approximated by diffeomorphisms exhibiting simultaneously C1 robust heterodimensional cycles of co-indices one and two, encompassing all possible combinations among hyperbolic sets of unstable indices , +1, and +2. The proof relies on the construction of split blending machines. This tool extends Asaoka's blending machines to a partially hyperbolic setting, providing a mechanisms to generate and control robust intersections within a two-dimensional central bundle. We also present simple dynamical settings where such cycles occur, namely skew product dynamics with surface fiber maps. Non-escaping cycles also appear in contexts such as Derived from Anosov diffeomorphisms and matrix cocycles on GL(3,R).
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