The Limit of the Inverse Mean Curvature Flow on a Torus
Abstract
For an H>0 rotationally symmetric embedded torus N0 ⊂ R3, evolved by Inverse Mean Curvature Flow, we show that the total curvature |A| remains bounded up to the singular time T. We then show convergence of the Nt to a C1 rotationally symmetric embedded torus NT as t → T without rescaling. Later, we observe a scale-invariant L2 energy estimate on any embedded solution of the flow in R3 that may be useful in ruling out curvature blowup near singularities in general.
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