On mean curvature flow solitons in the sphere
Abstract
In this paper, we consider soliton solutions of the mean curvature flow in the unit sphere S2n+1 moving along the integral curves of the Hopf unit vector field. While such solitons must necessarily be minimal if compact, we produce a non-minimal, complete example with topology S2n-1 × R. The example wraps around a Clifford torus S2n-1 × S1 along each end, it has reflection and rotational symmetry and its mean curvature changes sign on each end. Indeed, we prove that a complete 2-dimensional soliton with non-negative mean curvature outside a compact set must be a covering of a Clifford torus. Concluding, we obtain a pinching theorem under suitable conditions on the second fundamental form.
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