Dynamics of the Universal Area-Preserving Map Associated with Period Doubling: Hyperbolic Sets

Abstract

It is known that the famous Feigenbaum-Coullet-Tresser period doubling universality has a counterpart for area-preserving maps of 2. A renormalization approach has been used in EKW1 and EKW2 in a computer-assisted proof of existence of a "universal" area-preserving map F* -- a map with orbits of all binary periods 2k, k ∈ . In this paper, we consider maps in some neighbourhood of F* and study their dynamics. We first demonstrate that the map F* admits a "bi-infinite heteroclinic tangle": a sequence of periodic points \zk\, k ∈ , |zk| k ∞ 0, |zk| k -∞ ∞, whose stable and unstable manifolds intersect transversally; and, for any N ∈ , a compact invariant set on which F* is homeomorphic to a topological Markov chain on the space of all two-sided sequences composed of N symbols. A corollary of these results is the existence of unbounded and oscillating orbits. We also show that the third iterate for all maps close to F* admits a horseshoe. We use distortion tools to provide rigorous bounds on the Hausdorff dimension of the associated locally maximal invariant hyperbolic set: 0.7673 dimH(F) ≈ 0.00044 e-1797.