论芬斯勒几何中保留里奇张量的保角变换

IF 0.6 4区数学 Q3 MATHEMATICS

Differential Geometry and its Applications Pub Date : 2023-12-11 DOI:10.1016/j.difgeo.2023.102090

M.H. Shavakh , B. Bidabad

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引用次数: 0

摘要

在这里，我们获得了关于芬斯勒度量的共形变化的经典积分公式。作为应用，我们获得了平均兰茨贝格曲面的重要结果，这取决于里奇标量的符号，并证明除了两个里奇标量都同等于零的情况之外，在两个紧凑的平均兰茨贝格曲面（一个是非正里奇标量，另一个是非负里奇标量）之间不存在保角变换。保留利奇张量的共形变换被称为柳维尔变换。在这里，我们证明了两个各向同性 S曲率的紧凑平均兰茨贝格流形之间的 Liouville 变换是同调的。此外，两个具有有界均值 Cartan 张量的紧凑 Finsler n 流形之间的每个 Liouville 变换都是同调的。这些结果是 M. Obata 和 S. T. Yau 关于黎曼几何的结果的扩展，并对关于柳维尔定理的猜想给出了肯定的答案。

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On conformal transformations preserving the Ricci tensor in Finsler geometry

Here we obtain a classical integral formula on the conformal change of Finsler metrics. As an application, we obtain significant results depending on the sign of the Ricci scalars, for mean Landsberg surfaces and show there is no conformal transformation between two compact mean Landsberg surfaces, one of a non-positive Ricci scalar and another of a non-negative Ricci scalar, except for the case where both Ricci scalars are identically zero. Conformal transformations preserving the Ricci tensor are known as Liouville transformations. Here we show that a Liouville transformation between two compact mean Landsberg manifolds of isotropic S-curvature is homothetic. Moreover, every Liouville transformation between two compact Finsler n-manifolds of bounded mean value Cartan tensor is homothetic. These results are an extension of the results of M. Obata and S. T. Yau on Riemannian geometry and give a positive answer to a conjecture on Liouville's theorem.

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来源期刊

Differential Geometry and its Applications 数学-数学

CiteScore

1.00

自引率

20.00%

发文量

审稿时长

6-12 weeks

期刊介绍： Differential Geometry and its Applications publishes original research papers and survey papers in differential geometry and in all interdisciplinary areas in mathematics which use differential geometric methods and investigate geometrical structures. The following main areas are covered: differential equations on manifolds, global analysis, Lie groups, local and global differential geometry, the calculus of variations on manifolds, topology of manifolds, and mathematical physics.