同类图表

IF 0.4 Q4 MATHEMATICS
V. M. Nezhinskij
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引用次数: 0

摘要

摘要 我们所说的图是指一个拓扑空间,它是将有限个成对不相交的封闭矩形沿其侧边粘合到一个标准圆上而得到的,被粘合的矩形成对不相交。图并不是新事物;它们已被用于低维拓扑学的许多领域。我们的主要目标是将图的理论发展到足以应用于另一个分支:纠结理论的水平。我们为图提供了简单的附加结构:圆与矩形之间的光滑度、圆的方向和圆上的点。我们引入了一种新的等价关系(据作者所知,以前在科学文献中从未遇到过):同类关系。我们定义了同类图类集合到有边界的衍射光滑紧凑连通二维流形类集合的投射映射,并指出在最简单的情况下,这种投射也是双投射。将所构建的理论应用于纠结理论需要额外的准备,因此本文不包括在内;作者打算将这一应用单独出版。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Kindred Diagrams

Abstract

By a diagram we mean a topological space obtained by gluing to a standard circle a finite number of pairwise non-intersecting closed rectangles along their lateral sides, the glued rectangles being pairwise disjoint. Diagrams are not new objects; they have been used in many areas of low-dimensional topology. Our main goal is to develop the theory of diagrams to a level sufficient for application in yet another branch: the theory of tangles. We provide diagrams with simple additional structures: the smoothness of the circles and rectangles that are pairwise consistent with each other, the orientation of the circle, and a point on the circle. We introduce a new equivalence relation (as far as the author knows, not previously encountered in the scientific literature): kindred relation. We define a surjective mapping of the set of classes of kindred diagrams onto the set of classes of diffeomorphic smooth compact connected two-dimensional manifolds with a boundary and note that in the simplest cases this surjection is also a bijection. The application of the constructed theory to the tangle theory requires additional preparation and therefore is not included in this article; the author intends to devote a separate publication to this application.

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来源期刊
CiteScore
0.70
自引率
50.00%
发文量
44
期刊介绍: Vestnik St. Petersburg University, Mathematics  is a journal that publishes original contributions in all areas of fundamental and applied mathematics. It is the prime outlet for the findings of scientists from the Faculty of Mathematics and Mechanics of St. Petersburg State University. Articles of the journal cover the major areas of fundamental and applied mathematics. The following are the main subject headings: Mathematical Analysis; Higher Algebra and Numbers Theory; Higher Geometry; Differential Equations; Mathematical Physics; Computational Mathematics and Numerical Analysis; Statistical Simulation; Theoretical Cybernetics; Game Theory; Operations Research; Theory of Probability and Mathematical Statistics, and Mathematical Problems of Mechanics and Astronomy.
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