论可定向表面上施耐德木的结构

Q4 Mathematics

International Journal of Computational Geometry & Applications Pub Date : 2015-01-22 DOI:10.20382/JOCG.V10I1A5

K. Knauer, D. Gonçalves, Benjamin Lévêque

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引用次数: 4

摘要

我们提出了一种简单的将施耐德木从平面推广到高属可定向曲面上的映射。这是在角标记语言中完成的。推广De Fraysseix和Ossona De Mendez以及Felsner的结果，我们建立了这些标记和方向之间的对应关系，并表征了与此类施耐德标记对应的地图的方向集。此外，我们研究了给定映射的这些取向的集合，并根据表面同调提供了分配格的自然划分。这概括了Felsner和Ossona de Mendez早期的结果。在环面情况下，用这种方法得到了施耐德森林存在的一个新的证明。

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On the structure of Schnyder woods on orientable surfaces

We propose a simple generalization of Schnyder woods from the plane to maps on orientable surfaces of higher genus. This is done in the language of angle labelings. Generalizing results of De Fraysseix and Ossona de Mendez, and Felsner, we establish a correspondence between these labelings and orientations and characterize the set of orientations of a map that correspond to such a Schnyder labeling. Furthermore, we study the set of these orientations of a given map and provide a natural partition into distributive lattices depending on the surface homology. This generalizes earlier results of Felsner and Ossona de Mendez. In the toroidal case, a new proof for the existence of Schnyder woods is derived from this approach.

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来源期刊

International Journal of Computational Geometry & Applications 数学-计算机：理论方法

CiteScore

0.80

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： The International Journal of Computational Geometry & Applications (IJCGA) is a quarterly journal devoted to the field of computational geometry within the framework of design and analysis of algorithms. Emphasis is placed on the computational aspects of geometric problems that arise in various fields of science and engineering including computer-aided geometry design (CAGD), computer graphics, constructive solid geometry (CSG), operations research, pattern recognition, robotics, solid modelling, VLSI routing/layout, and others. Research contributions ranging from theoretical results in algorithm design — sequential or parallel, probabilistic or randomized algorithms — to applications in the above-mentioned areas are welcome. Research findings or experiences in the implementations of geometric algorithms, such as numerical stability, and papers with a geometric flavour related to algorithms or the application areas of computational geometry are also welcome.