论接触计量流形的计量交映化

Sannidhi Alape
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引用次数: 0

摘要

在这篇文章中,我们研究了接触元流形交映化上的元结构,并证明存在一个唯一的元结构,我们称之为元交映化,对于它,交映化的每个切片都有一个自然的诱导接触元结构。然后,我们研究了这个度量结构的曲率性质,并用它建立了度量交映化的$(\kappa, \mu)$空性条件的等价形式。我们还证明了$(\kappa, \mu)$-manifolds的度量交映化的同构决定了$(\kappa, \mu)$-manifolds的D-同调变换。这些分类结果表明,度量交映化提供了一个统一的框架,可以根据它们的交映化对萨萨流形、K接触流形和$(\kappa, \mu)$-manifolds进行分类。
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On a metric symplectization of a contact metric manifold
In this article, we investigate metric structures on the symplectization of a contact metric manifold and prove that there is a unique metric structure, which we call the metric symplectization, for which each slice of the symplectization has a natural induced contact metric structure. We then study the curvature properties of this metric structure and use it to establish equivalent formulations of the $(\kappa, \mu)$-nullity condition in terms of the metric symplectization. We also prove that isomorphisms of the metric symplectizations of $(\kappa, \mu)$-manifolds determine $(\kappa, \mu)$-manifolds up to D-homothetic transformations. These classification results show that the metric symplectization provides a unified framework to classify Sasakian manifolds, K-contact manifolds and $(\kappa, \mu)$-manifolds in terms of their symplectizations.
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