| 关于Finsler子流形的平均曲率 |
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| 引用本文: | 贺群,沈一兵. 关于Finsler子流形的平均曲率[J]. 数学年刊A辑(中文版), 2006, 0(5) |
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| 作者姓名: | 贺群 沈一兵 |
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| 作者单位: | 同济大学应用数学系,浙江大学数学系 上海 200092,杭州 310028 |
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| 基金项目: | 国家自然科学基金(No.10471105,No.10571154),上海市教委曙光计划(No.04SG21)资助的项目 |
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| 摘 要: | 通过使用由射影球丛诱导的体积元来研究Finsler子流形几何,推导了体积泛函的第一变分公式。给出了Finsler子流形的平均曲率形式和第二基本形式的定义,该定义在Riemannian情形下与通常的概念一致.此外,通过推导射影球丛纤维上的散度公式。给出了平均曲率形式的一种非常简洁的等价表示,并得到一些关于Minkowski空间中Finsler子流形的有趣的结果.
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| 关 键 词: | Finsler度量 体积变分 平均曲率 |
On the Mean Curvature of Finsler Submanifolds |
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| HE Qun SHEN Yibing. On the Mean Curvature of Finsler Submanifolds[J]. Chinese Annals of Mathematics, 2006, 0(5) |
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| Authors: | HE Qun SHEN Yibing |
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| Abstract: | By using the volume form induced from the projective sphere bundle of the Fiusler manifold,the Finsler geometry of submanifolds is studied.The first variation formula of the volume functional for Fiusler submanifolds is derived.The second fundamental form and the mean curvature form for Finsler submanifolds are defined,which coincide with the usual notions for the Riemannian case.By deriving the divergence formula on the fiber of the projective sphere bundle,a simple equivalence expression of the mean curvature form is given.Some interesting results for Finsler submanifolds in the Minkowski space are established. |
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| Keywords: | Finsler metric Volume variation Mean curvature |
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