利玛窦流中的谐波旋光子

Julius Baldauf
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引用次数: 0

摘要

本文给出了容纳谐旋子的封闭流形上利玛窦流的新定义。研究表明,佩雷尔曼的利玛窦流熵在所有维度上都可以用谐波旋量的能量来表示,而在四维空间上,则可以用塞伯格-维滕单极的能量来表示。因此,利玛窦流就是这些能量的梯度流。证明依赖于这里引入的单极子方程的加权版本。此外,还证明了简单连接的自旋 4-manifolds 的尖锐抛物线 Hitchin-Thorpe 不等式。由此可知,任何奇异的 K3 曲面上的归一化利玛窦流都会变得奇异。
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Harmonic Spinors in the Ricci Flow

This paper provides a new definition of the Ricci flow on closed manifolds admitting harmonic spinors. It is shown that Perelman’s Ricci flow entropy can be expressed in terms of the energy of harmonic spinors in all dimensions, and in four dimensions, in terms of the energy of Seiberg–Witten monopoles. Consequently, Ricci flow is the gradient flow of these energies. The proof relies on a weighted version of the monopole equations, introduced here. Further, a sharp parabolic Hitchin–Thorpe inequality for simply-connected, spin 4-manifolds is proven. From this, it follows that the normalized Ricci flow on any exotic K3 surface must become singular.

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