Invariant distributions of partially hyperbolic systems: fractal graphs, excessive regularity, and rigidity

Abstract

We introduce a novel approach linking fractal geometry to partially hyperbolic dynamics, revealing several new phenomena related to regularity jumps and rigidity. One key result demonstrates a sharp phase transition for partially hyperbolic diffeomorphisms f ∈ Diff∞vol(T3) with a contracting center direction: f is C∞-rigid if and only if both Es and Ec exhibit H\"older exponents exceeding the expected threshold. Specifically, we prove: If the H\"older exponent of Es exceeds the expected value, then Es is C1+ and Eu Es is jointly integrable. If the H\"older exponent of Ec exceeds the expected value, then Wc forms a C1+ foliation. If Es (or Ec) does not exhibit excessive H\"older regularity, it must have a fractal graph. These and related results originate from a general non-fractal invariance principle: for a skew product F over a partially hyperbolic system f, if F expands fibers more weakly than f along Wuf in the base, then for any F-invariant section, if has no a fractal graph, then it is smooth along Wuf and holonomy-invariant. Motivated by these findings, we propose a new conjecture on the stable fractal or stable smooth behavior of invariant distributions in typical partially hyperbolic diffeomorphisms.

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