Logarithmic Sobolev Inequalities, Gaussian Upper Bounds for the Heat Kernel, and the $$\textrm{G}_{2}$$ -Laplacian Flow

The Journal of Geometric Analysis Pub Date : 2024-07-02 DOI:10.1007/s12220-024-01697-4
Masashi Ishida
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引用次数: 0

Abstract

We prove a logarithmic Sobolev inequality along the \(\textrm{G}_{2}\)-Laplacian flow. A uniform Sololev inequality along the \(\textrm{G}_{2}\)-Laplacian flow with uniformly bounded scalar curvature is derived from the logarithmic Sobolev inequality. The uniform Sololev inequality implies a \(\kappa \)-noncollapsing estimate for the \(\textrm{G}_{2}\)-Laplacian flow with uniformly bounded scalar curvature. Furthermore, by using the logarithmic Sobolev inequality, we prove Gaussian-type upper bounds for the heat kernel along the \(\textrm{G}_{2}\)-Laplacian flow with uniformly bounded scalar curvature.

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对数索波列夫不等式、热核的高斯上界以及 $$textrm{G}_{2}$ - 拉普拉卡流
我们证明了沿\(\textrm{G}_{2}\)-拉普拉卡流的对数索波列夫不等式。从对数索波列夫不等式推导出了沿(textrm{G}_{2}\)-拉普拉卡流的均匀有界标量曲率的均匀索波列夫不等式。均匀索洛列夫不等式意味着具有均匀有界标量曲率的拉普拉卡流的(\textrm{G}_{2}\)非碰撞估计。此外,通过使用对数索波列夫不等式,我们证明了具有均匀有界标量曲率的 \(\textrm{G}_{2}\)- 拉普拉卡流的热核的高斯型上界。
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The Journal of Geometric Analysis
The Journal of Geometric Analysis
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