Constructing depth one laminations transverse to pseudo-Anosov flows

Abstract

Given a pseudo-Anosov flow ϕ on a closed atoroidal 3--manifold M and a closed surface S almost transverse to ϕ, we give a homological characterization of when S can be completed to an almost transverse depth one lamination or foliation whose set of compact leaves is S. As a consequence, we show that the cone of classes in H1(M \!\! S) that are positive on the closed orbits of ϕ, when nonempty, is an entire foliation cone of M \!\! S.

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