Modified mean curvature flow and CMC foliation conjecture in almost Fuchsian manifolds
Abstract
There has been a conjecture, often attributed to Thurston, which asserts that every almost Fuchsian manifold is foliated by closed incompressible constant mean curvature (CMC) surfaces. In this paper, for a certain class of almost Fuchsian manifolds, we prove the long-time existence and convergence of the modified mean curvature flow ∂ F∂ t=-(H-c), which was first introduced by Xiao and the second named author in LX12. As an application, we confirm Thurston's CMC foliation conjecture for such a subclass of almost Fuchsian manifolds.
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