On the first stability eigenvalue of surfaces with constant weighted mean curvature
Abstract
Let be a compact immersed surface with constant weighted mean curvature Hf in a weighted manifold (M3,g,f). In this paper we obtain upper bounds for the first eigenvalue of the weighted Jacobi operator on in terms of Hf and the curvature of the ambient. As consequence we obtain that there is no stable self-shrinker of the mean curvature flow.
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