Skewed Anosov flows are orbit equivalent to Reeb-Anosov flows in dimension 3
Abstract
We prove that in dimension 3, Anosov flows which are R-covered and skewed are orbit equivalent to Reeb-Anosov flows. We characterize the existence of an invariant contact form or of a Birkhoff section with a given boundary, in terms of linking numbers between two invariant signed measures. Furthermore, we prove the existence of open book decompositions with one boundary component for Reeb-Anosov flows.
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