$L^2$-Harmonic 1-Forms on Complete Manifolds

Authors

  • Peng Zhu School of Mathematics and Physics, Jiangsu University of Technology, Changzhou, Jiangsu, 213001
  • Jiuru Zhou School of Mathematical Sciences, Yangzhou University, Yangzhou, Jiangsu, 225002

DOI:

https://doi.org/10.13447/j.1674-5647.2017.01.01

Keywords:

minimal hypersurface, end, quaternionic manifold, weighted Poincaré inequality

Abstract

We study the global behavior of complete minimal $\delta$-stable hypersurfaces in $\mathbf{R}^{n+1}$ by using $L^2$-harmonic 1-forms. We show that a complete minimal $\delta$-stable $\bigg(\delta>\dfrac{(n-1)^2}{n^2}\bigg)$ hypersurface in $\mathbf{R}^{n+1}$ has only one end. We also obtain two vanishing theorems of complete noncompact quaternionic manifolds satisfying the weighted Poincaré inequality. These results are improvements of the first author's theorems on hypersurfaces and quaternionic Kähler manifolds. 

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Published

2020-03-18

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Issue

Vol. 33 No. 1 (2017)

Section

Articles

How to Cite

$L^2$-Harmonic 1-Forms on Complete Manifolds. (2020). Communications in Mathematical Research, 33(1), 1-7. https://doi.org/10.13447/j.1674-5647.2017.01.01