Reconstruction of Anosov flows from infinity
Abstract
Every pseudo-Anosov flow φ in a closed 3-manifold M gives rise to an action of π1(M) on a circle S1∞(φ) from infinity Fen12, with a pair of invariant almost laminations. From certain actions on S1 with invariant almost laminations, we reconstruct flows and manifolds realizing these actions, including all orientable transitive pseudo-Anosov flows in closed 3-manifolds. Our construction provides a geometry model for such flows and manifolds induced from D × D, where D is the Poincar\'e disk with ∂ D identified with S1∞(φ). In addition, our result applies to Cannon conjecture under the assumption that certain group-equivariant sphere-filling Peano curve exists, which offers a description of orientable quasigeodesic pseudo-Anosov flows in hyperbolic 3-manifolds in terms of group actions on ∂ H3 × ∂ H3 × ∂ H3.
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