The \(r\)-mean curvature and rigidity of compact hypersurfaces in the Euclidean space
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Publication:824400
DOI10.1007/s10455-021-09803-3zbMath1486.53014arXiv2012.09553OpenAlexW3203125535WikidataQ114227718 ScholiaQ114227718MaRDI QIDQ824400
Publication date: 15 December 2021
Published in: Annals of Global Analysis and Geometry (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2012.09553
isometric immersionshigher-order mean curvatureself-shrinkers\( \lambda \)-hypersurfacesMinkowski integral formulas
Higher-dimensional and -codimensional surfaces in Euclidean and related (n)-spaces (53A07) Differential geometry of immersions (minimal, prescribed curvature, tight, etc.) (53C42) Rigidity results (53C24) Flows related to mean curvature (53E10)
Cites Work
- A note on hypersurfaces of a Euclidean space
- Generic mean curvature flow. I: Generic singularities
- Compact constant mean curvature surfaces in Euclidean three-space
- New examples of constant mean curvature immersions of (2k-1)-spheres into euclidean 2k-space
- Counterexample to a conjecture of H. Hopf
- Compact hypersurfaces with constant higher order mean curvatures
- Differential geometry in the large. Seminar lectures New York University 1946 and Stanford University 1956. With a preface by S. S. Chern.
- Integral formulas for the \(r\)-mean curvature linearized operator of a hypersurface
- On the first eigenvalue of the linearized operator of the higher order mean curvature for closed hypersurfaces in space forms
- Complete \(\lambda \)-hypersurfaces of weighted volume-preserving mean curvature flow
- Constant mean curvature surfaces constructed by fusing Wente tori
- The stability of hypersurfaces revisited
- Scalar curvature of self-shrinker
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