高阶 Voronoi 图的边标注

IF 1.8 3区数学 Q1 Mathematics

Journal of Global Optimization Pub Date : 2024-05-21 DOI:10.1007/s10898-024-01386-0

Mercè Claverol, Andrea de las Heras Parrilla, Clemens Huemer, Alejandra Martínez-Moraian

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引用次数: 0

摘要

我们提出了平面中点集 S 的阶 k Voronoi 图（\(V_k(S)\)）的边标签，并研究了由它们定义的区域的性质。其中，我们证明了\(V_k(S)\)有一个小的可定向循环和路径双覆盖，我们还确定了在k的小值下不能出现在\(V_k(S)\)中的构型。本文还系统地研究了\(V_k(S)\)众所周知的和新的性质，所有这些性质的证明都只依赖于平面中的基本几何论证。也许对 \(V_k(S)\) 的结构性质最全面的研究是由 D.T. Lee 在 1982 年完成的（On k-nearest neighbor Voronoi diagrams in the plane）。我们的研究回顾并扩展了高阶 Voronoi 图的属性列表。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

The edge labeling of higher order Voronoi diagrams

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The edge labeling of higher order Voronoi diagrams

We present an edge labeling of order-k Voronoi diagrams, \(V_k(S)\), of point sets S in the plane, and study properties of the regions defined by them. Among them, we show that \(V_k(S)\) has a small orientable cycle and path double cover, and we identify configurations that cannot appear in \(V_k(S)\) for small values of k. This paper also contains a systematic study of well-known and new properties of \(V_k(S)\), all whose proofs only rely on elementary geometric arguments in the plane. The maybe most comprehensive study of structural properties of \(V_k(S)\) was done by D.T. Lee (On k-nearest neighbor Voronoi diagrams in the plane) in 1982. Our work reviews and extends the list of properties of higher order Voronoi diagrams.

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来源期刊

Journal of Global Optimization 数学-应用数学

CiteScore

0.10

自引率

5.60%

发文量

137

审稿时长

6 months

期刊介绍： The Journal of Global Optimization publishes carefully refereed papers that encompass theoretical, computational, and applied aspects of global optimization. While the focus is on original research contributions dealing with the search for global optima of non-convex, multi-extremal problems, the journal’s scope covers optimization in the widest sense, including nonlinear, mixed integer, combinatorial, stochastic, robust, multi-objective optimization, computational geometry, and equilibrium problems. Relevant works on data-driven methods and optimization-based data mining are of special interest. In addition to papers covering theory and algorithms of global optimization, the journal publishes significant papers on numerical experiments, new testbeds, and applications in engineering, management, and the sciences. Applications of particular interest include healthcare, computational biochemistry, energy systems, telecommunications, and finance. Apart from full-length articles, the journal features short communications on both open and solved global optimization problems. It also offers reviews of relevant books and publishes special issues.