Dynamics of quasi-isometric foliations (Q2895577)

Let \(f:M \to M\) be a diffeomorphism on a compact Riemannian manifold. If the stable, center, and unstable foliations of a partially hyperbolic diffeomorphism are quasi-isometric, and the diffeomorphism has a global product structure, then for any \(x, y\in M\), (1) \(W^u(x)\) and \(W^{cs}(y)\) intersect exactly once, (2) \(W^s(x)\) and \(W^{cu}(y)\) intersect exactly once, (3) if \(x\in W^{cs}(y)\), then \(W^c(x)\) and \(W^{s}(y)\) intersect exactly once, and (4) if \(x\in W^{cu}(y)\), then \(W^c(x)\) and \(W^{u}(y)\) intersect exactly once. Moreover, let \(M\) be a compact manifold with be an abelian fundamental group. If \(f:M\to M\) is partially hyperbolic with a global product structure, and \(W^s\) and \(W^u\) are quasi-isometric on the universal cover, then any two leaves of \(W^c\) are homeomorphic. The results also applies to Anosov systems and to other invariant splittings.