A STABILITY RESULT FOR TRANSLATING SPACELIKE GRAPHS IN LORENTZ MANIFOLDS

doi:10.1007/s10473-024-0206-z

Acta mathematica scientia,Series B ›› 2024, Vol. 44 ›› Issue (2): 474-483.doi: 10.1007/s10473-024-0206-z

Previous Articles Next Articles

A STABILITY RESULT FOR TRANSLATING SPACELIKE GRAPHS IN LORENTZ MANIFOLDS

Ya GAO, Jing MAO^*, Chuanxi WU

Faculty of Mathematics and Statistics, Key Laboratory of Applied Mathematics of Hubei Province, Hubei University, Wuhan 430062, China

Received:2022-11-20 Revised:2023-01-08 Online:2024-04-25 Published:2024-04-16
Contact: *Jing MAO, E-mail: jiner120@163.com
About author:Ya GAO, E-mail: Echo-gaoya@outlook.com; Chuanxi WU, E-mail: cxwu@hubu.edu.cn
Supported by:
NSFC (11801496, 11926352), the Fok Ying-Tung Education Foundation (China), and the Hubei Key Laboratory of Applied Mathematics (Hubei University).

Abstract

Abstract: In this paper, we investigate spacelike graphs defined over a domain $\Omega\subset M^{n}$ in the Lorentz manifold $M^{n}\times\mathbb{R}$ with the metric $-{\rm d}s^{2}+\sigma$, where $M^{n}$ is a complete Riemannian $n$-manifold with the metric $\sigma$, $\Omega$ has piecewise smooth boundary, and $\mathbb{R}$ denotes the Euclidean $1$-space. We prove an interesting stability result for translating spacelike graphs in $M^{n}\times\mathbb{R}$ under a conformal transformation.

Key words: mean curvature flow, spacelike graphs, translating spacelike graphs, maximal spacelike graphs, constant mean curvature, Lorentz manifolds.

CLC Number:

53C20

Ya GAO, Jing MAO, Chuanxi WU. A STABILITY RESULT FOR TRANSLATING SPACELIKE GRAPHS IN LORENTZ MANIFOLDS[J].Acta mathematica scientia,Series B, 2024, 44(2): 474-483.

Trendmd

References

[1] Abresch U, Rosenberg H. A Hopf differential for constant mean curvature surfaces in $\mathbb{S}^{2}\times\mathbb{R}$ and $\mathbb{H}^{2}\times\mathbb{R}$. Acta Math, 2004, 193: 141-174
[2] Meeks W H III, Rosenberg H. Stable minimal surfaces in $M\times\mathbb{R}$. J Differential Geom, 2004, 68: 515-534
[3] Mazet L, Rodríguez M M, Rosenberg H. Periodic constant mean curvature surfaces in $\mathbb{H}^{2}\times\mathbb{R}$. Asian J Math, 2014, 18: 829-858
[4] Rosenberg H, Schulze F, Spruck J. The half-space property and entire positive minimal graphs in $M\times\mathbb{R}$. J Differential Geom, 2013, 95: 321-336
[5] Gao Y, Mao J, Song C L. Existence and uniqueness of solutions to the constant mean curvature equation with nonzero Neumann boundary data in product manifold $M^{n}\times\mathbb{R}$. Acta Mathematica Scientia, 2020, 40A: 1525-1536
[6] Shahriyari L. Translating graphs by mean curvature flow. Geom Dedicata, 2015, 175: 57-64
[7] Zhou H Y. The boundary behavior of domains with complete translating, minimal and CMC graphs in $N^{2}\times\mathbb{R}$. Sci China Math, 2019, 62: 585-596
[8] Colding T H, Minicozzi W P II. Estimates for parametric elliptic integrands. Int Math Res Not, 2002, 6: 291-297
[9] Colding T H, Minicozzi W P II. A Course in Minimal Surfaces. Providence, RI: Amer Math Soc, 2011
[10] Schoen R.Estimates for stable minimal surfaces in three-dimensional manifolds//Bombieri E. Seminar on Minimal Submanifolds. Princeton: Princeton Univ Press, 1983: 111-126
[11] Zhang S R. Curvature estimates for CMC surfaces in three dimensional manifolds. Math Z, 2015, 249: 613-624
[12] Schoen R, Simon L, Yau S T. Curvature estimates for minimal hypersurfaces. Acta Math, 1975, 134: 275-288
[13] Calabi E. Examples of Bernstein problems for some nonlinear equations. Proc Symp Pure Appl Math, 1970, 15: 223-230
[14] Cheng S Y, Yau S T. Maximal spacelike hypersurfacs in the Lorentz-Minkowski space. Ann of Math, 1976, 104: 407-419
[15] Chen L, Hu D D, Mao J, et al. Translating surfaces of the non-parametric mean curvature flow in Lorentz manifold $M^{2}\times\mathbb{R}$. Chinese Ann Math, Series B, 2021, 42: 297-310
[16] Angenent S B, Velázquez J J L. Asymptotic shape of cusp singularities in curve shortening. Duke Math J, 1995, 77: 71-110
[17] Angenent S B, Velázquez J J L. Degenerate neckpinches in mean curvature flow. J Reine Angew Math, 1997, 482: 15-66
[18] Li H Z. On complete maximal spacelike hypersurfaces in a Lorentzian manifold. Soochow J Math, 1997, 23: 79-89

A STABILITY RESULT FOR TRANSLATING SPACELIKE GRAPHS IN LORENTZ MANIFOLDS

PDF (PC)

Abstract

Cite this article

share this article

References

Related Articles 8

Metrics

Comments

Recommended 10

[1]	Xingxiao LI, Ruina QIAO, Yangyang LIU. ON THE COMPLETE 2-DIMENSIONAL λ-TRANSLATORS WITH A SECOND FUNDAMENTAL FORM OF CONSTANT LENGTH [J]. Acta mathematica scientia,Series B, 2020, 40(6): 1897-1914.
[2]	Chunlei HE, Shoujun HUANG, Xiaomin XING. SELF-SIMILAR SOLUTIONS TO THE HYPERBOLIC MEAN CURVATURE FLOW [J]. Acta mathematica scientia,Series B, 2017, 37(3): 657-667.
[3]	Jing WANG, Yinshan ZHANG. RIGIDITY OF COMPACT SURFACES IN HOMOGENEOUS 3-MANIFOLDS WITH CONSTANT MEAN CURVATURE [J]. Acta mathematica scientia,Series B, 2016, 36(6): 1609-1618.
[4]	WU Jia-Yong. SOME EXTENSIONS OF THE MEAN CURVATURE FLOW IN RIEMANNIAN MANIFOLDS [J]. Acta mathematica scientia,Series B, 2013, 33(1): 171-186.
[5]	DENG Qin-Tao. COMPLETE HYPERSURFACES WITH CONSTANT MEAN CURVATURE AND FINITE INDEX IN HYPERBOLIC SPACES [J]. Acta mathematica scientia,Series B, 2011, 31(1): 353-360.
[6]	JIAN Huai-Yu, JU Hong-Jie, LIU Yan-Nan, SUN Wei. SYMMETRY OF TRANSLATING SOLUTIONS TO MEAN CURVATURE FLOWS [J]. Acta mathematica scientia,Series B, 2010, 30(6): 2006-2016.
[7]	CHEN Xu-Zhong, SHEN Yi-Bing. A NOTE ON THE MEAN CURVATURE FLOW IN RIEMANNIAN MANIFOLDS [J]. Acta mathematica scientia,Series B, 2010, 30(4): 1053-1064.
[8]	KONG De-Xin, LIU Ke-Feng, WANG Ceng-Gui. HYPERBOLIC MEAN CURVATURE FLOW: EVOLUTION OF PLANE CURVES [J]. Acta mathematica scientia,Series B, 2009, 29(3): 493-514.