Stability of weighted minimal hypersurfaces under a lower 1-weighted Ricci curvature bound
Abstract
We will study the 1-weighted Ricci curvature in view of the extrinsic geometric analysis. We derive several geometric consequences concerning stable weighted minimal hypersurfaces in weighted manifolds under a lower 1-weighted Ricci curvature bound. We prove a Schoen-Yau type criterion, and conclude a structure theorem for three-dimensional weighted manifolds of non-negative 1-weighted Ricci curvature. We also show non-existence results under volume growth conditions, and conclude smooth compactness theorems.
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