Efficient Algorithm for Constructing Order K Voronoi Diagrams in Road Networks

ISPRS Int. J. Geo Inf. Pub Date : 2023-04-19 DOI:10.3390/ijgi12040172

B. Chen, H. Huang, Hui-Ping Chen, Wenxuan Liu, Xuan-Yan Chen, Tao Jia

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Abstract

The order k Voronoi diagram (OkVD) is an effective geometric construction to partition the geographical space into a set of Voronoi regions such that all locations within a Voronoi region share the same k nearest points of interest (POIs). Despite the broad applications of OkVD in various geographical analysis, few efficient algorithms have been proposed to construct OkVD in real road networks. This study proposes a novel algorithm consisting of two stages. In the first stage, a new one-to-all k shortest path finding procedure is proposed to efficiently determine the shortest paths to k nearest POIs for each node. In the second stage, a new recursive procedure is introduced to effectively divide boundary links within different Voronoi regions using the hierarchical tessellation property of the OkVD. To demonstrate the applicability of the proposed OkVD construction algorithm, a case study of place-based accessibility evaluation is carried out. Computational experiments are also conducted on five real road networks with different sizes, and results show that the proposed OkVD algorithm performed significantly better than state-of-the-art algorithms.

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道路网络中构造K阶Voronoi图的高效算法

k阶Voronoi图(OkVD)是一种有效的几何结构，将地理空间划分为一组Voronoi区域，使Voronoi区域内的所有位置共享相同的k个最近兴趣点(poi)。尽管OkVD在各种地理分析中得到了广泛的应用，但在实际道路网络中构建OkVD的有效算法却很少。本研究提出了一种由两个阶段组成的新算法。在第一阶段，提出了一种新的一对所有k最短路径查找过程，以有效地确定每个节点到k个最近点的最短路径。在第二阶段，引入了一种新的递归过程，利用OkVD的分层镶嵌特性有效地划分不同Voronoi区域内的边界链路。为了验证所提出的OkVD构建算法的适用性，以基于地点的可达性评价为例进行了研究。在5个不同规模的真实道路网络上进行了计算实验，结果表明，本文提出的OkVD算法明显优于现有算法。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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ISPRS Int. J. Geo Inf.

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