Spectral properties and rigidity for self-expanding solutions of the mean curvature flows
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Publication:1751028
DOI10.1007/s00208-018-1662-3zbMath1391.53076arXiv1709.04086OpenAlexW2962742536WikidataQ130168190 ScholiaQ130168190MaRDI QIDQ1751028
Publication date: 23 May 2018
Published in: Mathematische Annalen (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1709.04086
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Related Items (6)
Volume properties and rigidity on self-expanders of mean curvature flow ⋮ Complete self-similar hypersurfaces to the mean curvature flow with nonnegative constant scalar curvature ⋮ Complete Lagrangian self-expanders in \(\mathbb{C}^2\) ⋮ Some rigidity properties for \(\lambda\)-self-expanders ⋮ Parabolicity criteria and characterization results for submanifolds of bounded mean curvature in model manifolds with weights ⋮ Self-expanders of the mean curvature flow
Cites Work
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- Simons-type equation for \(f\)-minimal hypersurfaces and applications
- Volume growth eigenvalue and compactness for self-shrinkers
- Generic mean curvature flow. I: Generic singularities
- Smooth compactness of self-shrinkers
- Eigenvalue estimate and compactness for closed \(f\)-minimal surfaces
- Mean curvature evolution of entire graphs
- Rotational symmetry of asymptotically conical mean curvature flow self-expanders
- Uniqueness of grim hyperplanes for mean curvature flows
- Eigenvalues of the drifted Laplacian on complete metric measure spaces
- Weighted Poincaré inequality and rigidity of complete manifolds
- The structure of complete stable minimal surfaces in 3-manifolds of non-negative scalar curvature
- Selfsimilar solutions to the mean curvature flow
- Volume estimate about shrinkers
- Stability and compactness for complete 𝑓-minimal surfaces
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