Universal circles for Anosov foliations
Abstract
Thurston introduced the notion of a universal circle associated to a taut foliation of a 3-manifold as a way of organizing the ideal circle boundaries of its leaves into a single circle action. Calegari--Dunfield proved that every taut foliation of an atoroidal 3-manifold M has a universal circle, but the uniqueness (or lack-thereof) of this structure remains rather mysterious. In this paper, we consider the foliations associated to an Anosov flow on M, showing that several constructions of a universal circle in the literature are typically distinct. Moreover, the underlying action of the Calegari--Dunfield leftmost universal circle is generally not even conjugate to the universal circle arising from the boundary of the flow space of . Our primary tool is a way to use the flow space of to parameterize the circle bundle at infinity of 's invariant foliations.
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