|
|
Pure Mathematics 2024
极小模原理的一类三阶全对称张量不等式应用
|
Abstract:
本文研究了共形形式Φ消失的三阶全对称张量Ai,j,k的极小模张量,我们利用极小模的非负性证明了不等式![\"\"](\"Edit_57189f81-d580-485f-a352-72f7cbd8137a.png\")
。
In this paper, we study the minimal norm tensors of the third order full symmetry tensors Ai,j,k, with vanishes from the conformal form Φ. We prove the inequality![\"\"](\"Edit_f3b5f8ac-22ee-4b3d-bfbb-053c5d629a45.png\")
by using the non-negativity of the minimal norm.
| [1] | Cheng, Q.M. and Ishikawa, S. (1999) A Characterization of the Clifford Torus. Proceedings of the American Mathe-matical Society, 127, 819-828. https://doi.org/10.1090/S0002-9939-99-05088-1 |
| [2] | Alexander, J.W. (1926) On the Decomposition of Tensors. Annals of Mathematics, 27, 421-423.
https://doi.org/10.2307/1967693 |
| [3] | Krupka, D. (1995) The Trace Decomposition Problem. Beitragezur Algebra und Geometrie, 36, 303-316. |
| [4] | Krupka, D. (2017) Decompositions of Covariant Tensor Spaces. Lepage Research Institute Library, 3, 1-20. |
| [5] | Krupka, D. (2003) The Weyl Tensors. Publicationes Mathematicae Debrecen, 62, 447-460.
https://doi.org/10.5486/PMD.2003.2884 |
| [6] | Krupka, D. (1995) The Trace Decomposition Problem. Beitragezur Algebra und Geometrie, 36, 303-316. |
| [7] | Krupka, D. (1996) The Trace Decomposition of Tensors of Type (1,2) and (1,3). In: Tamássy, L. and Szenthe, J., Eds., New Developments in Differential Geometry, Springer, Dordrecht, 243-253.
https://doi.org/10.1007/978-94-009-0149-0_19 |
| [8] | Mikes, J., Jukl, M. and Juklová, L. (2011) Some Results on Traceless Decomposition of Tensors. Journal of Mathematical Sciences, 174, 627-640. https://doi.org/10.1007/s10958-011-0321-y |
| [9] | Mikes, J. (1996) On the General Trace Decomposition Problem. Proceedings of Conference, 28 August-1 September 1995, 45-50. |
| [10] | Jukl, M. and Juklová, L. (2013) On Decompo-sition Problems on Manifolds with a Special Differential Operators. Miskolc Mathematical Notes, 14, 591-599. https://doi.org/10.18514/MMN.2013.920 |
| [11] | Lakomá, L. and Jukl, M. (2004) The Decomposition of Tensor Spaces with Almost Complex Structure. In: Slovák, J. and ?adek, M., Eds., Proceedings of the 23rd Winter School “Geometry and Physics”, Circolo Matematico di Palermo, Palermo, 145-150. |
| [12] | Toth, V.T. and Turyshev, S.G. (2022) Efficient Trace-Free Decomposition of Symmetric Tensors of Arbitrary Rank. International Journal of Geometric Methods in Modern Physics, 19, Article ID: 2250201.
https://doi.org/10.1142/S0219887822502012 |
| [13] | Guo, Z. and Guan, S.L. (2021) Minimal Norm Tensors Principle and its Applications.
arXiv preprint arXiv:2112.01222. |
| [14] | Wang, C. (1998) Moebius Geometry of submanifolds in Sn. manuscripta mathematica, 96, 517-534.
https://Doi.Org/10.1007/S002290050080 |
| [15] | Li, H.Z. and Wang, C.P. (2003) Surfaces with Vanishing M?bius form in Sn. Acta Mathematica Sinica, 19, 671-678.
https://doi.org/10.1007/s10114-003-0309-8 |
| [16] | Liu, H., Wang, C. and Zhao, G. (2001) M?bius Isotropic Submanifolds in Sn. Tohoku Mathematical Journal, 53, 553-569. https://doi.org/10.2748/tmj/1113247800 |
| [17] | Guom Z., Lim, T., Linm, L., et al. (2011) Classification of Hypersurfaces with Constant M?bius Curvature in Sm+1. Mathematische Zeitschrift, 271, 193-219. https://doi.org/10.1007/s00209-011-0860-4 |
| [18] | Li, H. and Wang, C. (2003) M?bius Geometry of Hypersurfaces with Constant Mean Curvature and Scalar Curvature. manuscripta mathematica, 112, 1-13. https://doi.org/10.1007/s00229-003-0383-3 |
| [19] | 钟定兴, 肖卫玲, 张和颜. 上具有两个Blaschke特征值的超曲面[J]. 赣南师范大学学报, 2017, 38(6): 37-42. |
| [20] | 李兴校, 宋虹儒. 单位球面中具有3个不同Blaschke特征值的Blaschke平行子流形[J]. 数学年刊A辑(中文版), 2018, 39(3): 249-272. |
| [21] | Guo, Z. and Li, H. (2018) Conformal Invariants of Submanifolds in a Riemannian Space and Conformal Rigidity Theorems on Willmore Hypersurfaces. The Journal of Geometric Analysis, 28, 2670-2691.
https://doi.org/10.1007/s12220-017-9928-7 |
