里奇流在四球上的一些方面

Q4 Mathematics New Zealand Journal of Mathematics Pub Date : 2021-09-16 DOI:10.53733/152

S. Chang, Eric Chen

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引用次数: 1

摘要

本文在具有黎曼度量的4球上研究了一些积分共形不变量，它们的符号和大小在Ricci流下表征了标准4球。我们得到了一个共形隙定理，并且对于度量的Weyl张量的L^2范数适当小的正标量曲率的Yamabe度规，我们建立了对于某些p>2的简化曲率张量的L^p范数沿归一化Ricci流的单调衰减，并且度量指数收敛到标准4球。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Some aspects of Ricci flow on the 4-sphere

In this paper, on 4-spheres equipped with Riemannian metrics we study some integral conformal invariants, the sign and size of which under Ricci flow characterize the standard 4-sphere. We obtain a conformal gap theorem, and for Yamabe metrics of positive scalar curvature with L^2 norm of the Weyl tensor of the metric suitably small, we establish the monotonic decay of the L^p norm for certain p>2 of the reduced curvature tensor along the normalized Ricci flow, with the metric converging exponentially to the standard 4-sphere.

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