Hyperorthogonal well-folded Hilbert curves

IF 0.4 Q4 MATHEMATICS

Journal of Computational Geometry Pub Date : 2015-08-11 DOI:10.20382/jocg.v7i2a7

A. Bos, H. Haverkort

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引用次数: 5

Abstract

R-trees can be used to store and query sets of point data in two or more dimensions. An easy way to construct and maintain R-trees for two-dimensional points, due to Kamel and Faloutsos, is to keep the points in the order in which they appear along the Hilbert curve. The R-tree will then store bounding boxes of points along contiguous sections of the curve, and the efficiency of the R-tree depends on the size of the bounding boxes - smaller is better. Since there are many different ways to generalize the Hilbert curve to higher dimensions, this raises the question which generalization results in the smallest bounding boxes. Familiar methods, such as the one by Butz, can result in curve sections whose bounding boxes are a factor Omega(2^{d/2}) larger than the volume traversed by that section of the curve. Most of the volume bounded by such bounding boxes would not contain any data points. In this paper we present a new way of generalizing Hilbert's curve to higher dimensions, which results in much tighter bounding boxes: they have at most 4 times the volume of the part of the curve covered, independent of the number of dimensions. Moreover, we prove that a factor 4 is asymptotically optimal.

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超正交良好折叠的希尔伯特曲线

r树可用于存储和查询二维或多维的点数据集。Kamel和Faloutsos提出了一种构造和维护二维点的r树的简单方法，即保持点在希尔伯特曲线上出现的顺序。然后，r树将沿着曲线的连续部分存储点的边界框，r树的效率取决于边界框的大小——越小越好。由于有许多不同的方法将希尔伯特曲线推广到更高的维度，这就提出了一个问题，即哪种推广会产生最小的边界框。熟悉的方法，如Butz的方法，可能导致曲线截面的边界框比该曲线截面所经过的体积大一个因子(2^{d/2})。这种边界框所包围的大部分体积都不包含任何数据点。在本文中，我们提出了一种将希尔伯特曲线推广到高维的新方法，它产生了更紧密的边界框:它们最多有4倍于曲线所覆盖部分的体积，与维数无关。此外，我们证明了因子4是渐近最优的。

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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来源期刊

Journal of Computational Geometry MATHEMATICS-

CiteScore

0.70

自引率

33.30%

发文量

审稿时长

52 weeks