具有多面体障碍物的框架空间中若干优化问题的离散化结果

Q2 Mathematics

Electronic Notes in Discrete Mathematics Pub Date : 2018-07-01 DOI:10.1016/j.endm.2018.06.028

Justo Puerto , Moisés Rodríguez-Madrena

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引用次数: 0

摘要

在本研究中，我们考虑在任何有限维的真实空间中存在不同类型多面体障碍物或禁区的最短路径问题和单个设施韦伯定位问题。这些区域是多面体集合，空间中考虑的度规是曼哈顿度规。我们给出了一个结果，将这些连续问题简化为“add hoc”图中的问题，其中原始问题可以使用图论的基本技术来解决。我们证明，当空间维数固定时，降维和分辨率都可以在多项式时间内完成。

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A discretization result for some optimization problems in framework spaces with polyhedral obstacles and the Manhattan metric

In this work we consider the shortest path problem and the single facility Weber location problem in any real space of finite dimension where there exist different types of polyhedral obstacles or forbidden regions. These regions are polyhedral sets and the metric considered in the space is the Manhattan metric. We present a result that reduce these continuous problems into problems in a “add hoc” graph, where the original problems can be solved using elementary techniques of Graph Theory. We show that, fixed the dimension of the space, both the reduction and the resolution can be done in polynomial time.

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来源期刊

Electronic Notes in Discrete Mathematics Mathematics-Discrete Mathematics and Combinatorics

CiteScore

1.30

自引率

0.00%

发文量

期刊介绍： Electronic Notes in Discrete Mathematics is a venue for the rapid electronic publication of the proceedings of conferences, of lecture notes, monographs and other similar material for which quick publication is appropriate. Organizers of conferences whose proceedings appear in Electronic Notes in Discrete Mathematics, and authors of other material appearing as a volume in the series are allowed to make hard copies of the relevant volume for limited distribution. For example, conference proceedings may be distributed to participants at the meeting, and lecture notes can be distributed to those taking a course based on the material in the volume.