Stable minimal hypersurfaces with weighted Poincar'{e} inequality in a Riemannian manifold

Nguyen Dinh Sang; Nguyen Thi Thanh

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Stable minimal hypersurfaces with weighted Poincar'{e} inequality in a Riemannian manifold

机译：黎曼流形中具有加权Poincar'{e}不等式的稳定最小超曲面

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In this note, we investigate stable minimal hypersurfaces with weighted Poincar'{e} inequality. We show that we still get the vanishing property without assuming that the hypersurfaces is non-totally geodesic. This generalizes a result in cite{D-S}.

机译：在本说明中，我们研究了带有加权Poincar'{e}不等式的稳定最小超曲面。我们表明，在不假设超曲面非完全测地的情况下，我们仍然可以获得消失的属性。这样可以将结果概括为 cite {D-S}。

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《Communications of the Korean Mathematical Society》 |2014年第1期|共8页
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Nguyen Dinh Sang; Nguyen Thi Thanh;
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4. Heat Kernel Estimates, Sobolev-Type Inequalities and Riesz Transform on Noncompact Riemannian Manifolds [C] . Thierry Coulhon SMS 2011 . 2013

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5. A Minkowski-type inequality for hypersurfaces in the Reissner-Nordström-anti-deSitter manifold [D] . Wang, Zhuhai 2015

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6. Chen’s Ricci inequalities and topological obstructions on null hypersurfaces of a Lorentzian manifold [O] . Karimumuryango Ménédore -1

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7. STABLE MINIMAL HYPERSURFACES WITH WEIGHTED POINCARÉ INEQUALITY IN A RIEMANNIAN MANIFOLD [O] . Dinh Sang Nguyen, Thi Thanh Nguyen 2014

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8. Spherical-Type Hypersurfaces in a Riemannian Manifold. [R] . Ezin, J. P., Rigoli, M. 1988

机译：黎曼流形中的球形超曲面。

Stable minimal hypersurfaces with weighted Poincar'{e} inequality in a Riemannian manifold

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