Measured foliations at infinity of quasi-Fuchsian manifolds
Abstract
Let (λ+(M),λ-(M)) denote the pair of measured foliations at the boundary at infinity ∂∞ of a quasi-Fuchsian manifold M. We prove that (λ+(M),λ-(M)) is filling if M is close to being Fuchsian. We also show that given any filling pair (α1,α2) of measured foliations, and every small enough t>0, the pair (tα1,tα2) is realised as the pair of measured foliations at infinity of some quasi-Fuchsian manifold M. This answers questions of Schlenker near the Fuchsian locus.
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