Depth-one foliations, pseudo-Anosov flows and universal circles
Abstract
Given a taut depth-one foliation F in a closed atoroidal 3-manifold M transverse to a pseudo-Anosov flow φ without perfect fits, we show that the universal circle coming from leftmost sections Sleft associated to F, constructed by Thurston and Calegari-Dunfield, is isomorphic to the ideal boundary of the flow space associated to φ with natural structure maps. As a corollary, we use a theorem of Barthelm\'e-Frankel-Mann to show that there is at most one pseudo-Anosov flow without perfect fits transverse to F up to orbit equivalence.
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