Left orderability and taut foliations with orderable cataclysm
Abstract
Let M be a connected, closed, orientable, irreducible 3-manifold. We show that: if M admits a co-orientable taut foliation F with orderable cataclysm, then π1(M) is left orderable. This provides an elementary proof that π1(M) is left orderable if M admits an Anosov flow with a co-orientable stable foliation without using Thurston's universal circle action. Furthermore, for every closed orientable 3-manifold that admits a pseudo-Anosov flow X with a co-orientable stable foliation, our result applies to infinitely many of Dehn fillings along the union of singular orbits of X.
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