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引用次数: 0
摘要
温特根不等式是微分几何领域的一个重要结果,特别是与黎曼流形中子流形的研究有关。它是由皮埃尔-温特根发现的。在本文中,我们将讨论黎曼流形之间的黎曼映射,它是比较源流形和目标流形几何结构的绝佳方法。本文首次针对黎曼映射探讨了一个著名的猜想,即 DDVV 不等式(由 P.J. De Smet、F. Dillen、L. Verstraelen 和 L. Vrancken 证明的实空间形式中黎曼子流形的温特根不等式猜想),我们将不同的空间形式视为目标流形。在各种环境流形中,与此类不等式相关的研究问题不胜枚举。这些问题都可以在具有显著几何结构的各种黎曼流形之间的黎曼映射的一般框架内进行探讨。
The Wintgen inequality is a significant result in the field of differential geometry, specifically related to the study of submanifolds in Riemannian manifolds. It was discovered by Pierre Wintgen. In the present work, we deal with the Riemannian maps between Riemannian manifolds that serve as a superb method for comparing the geometric structures of the source and target manifolds. This article is the first to explore a well-known conjecture, called DDVV inequality (a conjecture for Wintgen inequality on Riemannian submanifolds in real space forms proven by P.J. De Smet, F. Dillen, L. Verstraelen and L. Vrancken), for Riemannian maps, where we consider different space forms as target manifolds. There are numerous research problems related to such inequality in various ambient manifolds. These problems can all be explored within the general framework of Riemannian maps between various Riemannian manifolds equipped with notable geometric structures.