| 完备Khler流形上Khler-Ricci流的局部Harnack估计 |
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| 引用本文: | 朱晓睿. 完备Khler流形上Khler-Ricci流的局部Harnack估计[J]. 中国科学:数学, 2010, 40(9): 873-879 |
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| 作者姓名: | 朱晓睿 |
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| 作者单位: | 1. 浙江大学数学科学中心, 杭州310027;
2. 公安海警学院, 宁波315801 |
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| 摘 要: | 本文首先给出非正规化Khler-Ricci流下曲率的发展方程,然后得到了关于曲率的Harnack量在满足曲率局部条件下所产生的一个特殊项CNS.通过对CNS的估计,得到了完备Khler流形上关于Khler-Ricci流的局部Harnack不等式.最后,作为主要定理的应用,我们将结果推广到数量曲率的情形.
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| 关 键 词: | 局部Harnack 估计Kähler-Ricci流 |
Local Harnack estimate for Kaihler-Ricci flow on complete Kaihler manifold |
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| ZHU XiaoRui. Local Harnack estimate for Kaihler-Ricci flow on complete Kaihler manifold[J]. Scientia Sinica Mathemation, 2010, 40(9): 873-879 |
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| Authors: | ZHU XiaoRui |
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| Affiliation: | ZHU XiaoRui |
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| Abstract: | In this paper, we firstly give the evolving equation of the curvature under the unnormalized Kaihler-Ricci flow. Then we get the extra term CNS which is determined by the Harnack quantity satisfying the local condition of the curvature. By using the estimate of CNS, we obtain the local Harnack estimate of Kaihler-Ricci flow on the complete Kahler manifold. As a corollary, we get a sharp derivative estimate of scalar curvature. |
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| Keywords: | local Harnack estimate Kaihler-Ricci |
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