接触几何中的山叶孤子

Q4 Mathematics New Zealand Journal of Mathematics Pub Date : 2023-12-20 DOI:10.53733/286

Rahul Poddar, S. Balasubramanian, Ramesh Sharma

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引用次数: 0

摘要

研究表明，山边孤子作为笹子流形的标量曲率是常数，且孤子向量场是基林的。同样的结论也适用于作为 $K$-contact 流形 $M^{2n+1}$ 的山边孤子，如果以下任一条件成立：(i) 沿孤子向量场 $V$ 的标量曲率恒定；(ii) $V$ 是利玛窦算子的特征向量，特征值为 $2n$；(iii) $V$ 是梯度的。

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Yamabe solitons in contact geometry

It is shown that the scalar curvature of a Yamabe soliton as a Sasakian manifold is constant and the soliton vector field is Killing. The same conclusion is shown to hold for a Yamabe soliton as a $K$-contact manifold $M^{2n+1}$ if any one of the following conditions hold: (i) its scalar curvature is constant along the soliton vector field $V$, (ii) $V$ is an eigenvector of the Ricci operator with eigenvalue $2n$, (iii) $V$ is gradient.

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