Accessibility and central integrability in the absence of periodic points
Abstract
We consider a partially hyperbolic diffeomorphism f: M M without periodic points on a closed manifold M. We prove that f is accessible when M is a 3-manifold with non-virtually-solvable fundamental group π1(M). In the case where Ec = 1, we demonstrate that the center bundle Ec is uniquely integrable if f lacks accessibility. Furthermore, we provide a complete characterization of accessibility classes for such systems with one-dimensional center bundles.
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