Asymptotic convergence of evolving hypersurfaces
Abstract
If :Mn Rn+1 is a smooth immersed closed hypersurface, we consider the functional Fm() = ∫M 1 + |∇m |2 \, dμ, where is a local unit normal vector along , ∇ is the Levi-Civita connection of the Riemannian manifold (M,g), with g the pull-back metric induced by the immersion and μ the associated volume measure. We prove that if m> n/2 then the unique globally defined smooth solution to the L2-gradient flow of Fm, for every initial hypersurface, smoothly converges asymptotically to a critical point of Fm, up to diffeomorphisms. The proof is based on the application of a Lojasiewicz-Simon gradient inequality for the functional Fm.
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