关于PNDP-MANIFOLD

Poincare Journal of Analysis and Applications Pub Date : 2021-02-18 DOI:10.33786/pjaa.2021.v08i01(i).011

A. Pigazzini, C. Ozel, P. Linker, S. Jafari

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引用次数: 5

摘要

我们提供了一种构造新型流形的可能方法，我们称之为部分负维积流形（简称PNDP流形）。特别地，PNDP流形是一个特殊类型的爱因斯坦翘曲积流形，其中基流形$B$是一个Remanian（或伪黎曼）积流形$B=\Pi_｛i=1｝^｛q'｝B_i\times\Pi_｛i=（q'+1）｝^{\widetilder q}B_i$，其中$\Pi_{i=，纤维流形$F$是一个导出的微分流形（即$F$的形式是：光滑流形（$\mathbb｛R｝^d$）+阻塞丛，因此它可以容许负维数）。由于PNDP流形的维数与通常的几何维数概念无关，因此从思辨和应用的角度出发，我们试图用去耗散的概念来定义这种关系，以识别PNDP与另一种“对象”，引入一种新的隐藏维数。

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ON PNDP-MANIFOLD

We provide a possible way of constructing new kinds of manifolds which we will call Partially Negative Dimensional Product manifold (PNDP-manifold for short). In particular a PNDP-manifold is an Einstein warped product manifold of special kind, where the base-manifold $B$ is a Remannian (or pseudo-Riemannian) product-manifold $B=\Pi_{i=1}^{q'}B_i \times \Pi_{i=(q'+1)}^{\widetilde q} B_i$, with $\Pi_{i=(q'+1)}^{\widetilde q} B_i$ an Einstein-manifold, and the fiber-manifold $F$ is a derived-differential-manifold (i.e., $F$ is the form: smooth manifold ($\mathbb{R}^d$)+ obstruction bundle, so it can admit negative dimension). Since the dimension of a PNDP-manifold is not related with the usual geometric concept of dimension, from the speculative and applicative point of view, we try to define this relation using the concept of desuspension to identify the PNDP with another kind of"object", introducing a new kind of hidden dimensions.

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来源期刊

Poincare Journal of Analysis and Applications Mathematics-Applied Mathematics

CiteScore

0.60

自引率

0.00%

发文量