几何结构的延长线、不变式和基本同素异形体

IF 0.6 4区 数学 Q3 MATHEMATICS
Jaehyun Hong , Tohru Morimoto
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引用次数: 0

摘要

通过给出高阶几何结构和通用框架束的新表述,我们重构了辛格-斯特恩伯格和田中的阶梯延长。然后,我们通过将适当几何结构的完整阶跃延长扩展为 γ=κ+τ+σ 的分量,研究了它的结构函数 γ,并建立了 κ、τ、σ 的基本等式。这使我们能够全面研究几何结构的等价性问题,并将应用扩展到不一定具有 Cartan 连接的几何结构。其中,我们给出了一种算法,通过利用与几何结构符号相关的广义斯宾塞同调群,为任何具有常数符号的高阶适当几何结构构建一个完整的不变式系统。我们还通过结构函数τ给出了卡坦连接的特征,并明确了卡坦连接在阶跃延长中的位置。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Prolongations, invariants, and fundamental identities of geometric structures

Working in the framework of nilpotent geometry, we give a unified scheme for the equivalence problem of geometric structures which extends and integrates the earlier works by Cartan, Singer-Sternberg, Tanaka, and Morimoto.

By giving a new formulation of the higher order geometric structures and the universal frame bundles, we reconstruct the step prolongation of Singer-Sternberg and Tanaka. We then investigate the structure function γ of the complete step prolongation of a proper geometric structure by expanding it into components γ=κ+τ+σ and establish the fundamental identities for κ, τ, σ. This then enables us to study the equivalence problem of geometric structures in full generality and to extend applications largely to the geometric structures which have not necessarily Cartan connections.

Among all we give an algorithm to construct a complete system of invariants for any higher order proper geometric structure of constant symbol by making use of generalized Spencer cohomology group associated to the symbol of the geometric structure. We then discuss thoroughly the equivalence problem for geometric structure in both cases of infinite and finite type.

We also give a characterization of the Cartan connections by means of the structure function τ and make clear where the Cartan connections are placed in the perspective of the step prolongations.

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来源期刊
CiteScore
1.00
自引率
20.00%
发文量
81
审稿时长
6-12 weeks
期刊介绍: Differential Geometry and its Applications publishes original research papers and survey papers in differential geometry and in all interdisciplinary areas in mathematics which use differential geometric methods and investigate geometrical structures. The following main areas are covered: differential equations on manifolds, global analysis, Lie groups, local and global differential geometry, the calculus of variations on manifolds, topology of manifolds, and mathematical physics.
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