Clusters in irregular areas and lattices
Version of Record online: 12 OCT 2011
Copyright © 2011 John Wiley & Sons, Inc.
Wiley Interdisciplinary Reviews: Computational Statistics
Volume 4, Issue 1, pages 67–74, January/February 2012
How to Cite
Wieczorek, W. F., Delmerico, A. M., Rogerson, P. A. and Wong, D. W.S. (2012), Clusters in irregular areas and lattices. WIREs Comp Stat, 4: 67–74. doi: 10.1002/wics.196
- Issue online: 14 DEC 2011
- Version of Record online: 12 OCT 2011
- cluster analysis;
- geographic information systems;
Geographic areas of different sizes and shapes of polygons that represent counts or rate data are often encountered in social, economic, health, and other information. Often political or census boundaries are used to define these areas because the information is available only for those geographies. Therefore, these types of boundaries are frequently used to define neighborhoods in spatial analyses using geographic information systems and related approaches such as multilevel models. When point data can be geocoded, it is possible to examine the impact of polygon shape on spatial statistical properties, such as clustering. We utilized point data (alcohol outlets) to examine the issue of polygon shape and size on visualization and statistical properties. The point data were allocated to regular lattices (hexagons and squares) and census areas for zip-code tabulation areas and tracts. The number of units in the lattices was set to be similar to the number of tract and zip-code areas. A spatial clustering statistic and visualization were used to assess the impact of polygon shape for zip- and tract-sized units. Results showed substantial similarities and notable differences across shape and size. The specific circumstances of a spatial analysis that aggregates points to polygons will determine the size and shape of the areal units to be used. The irregular polygons of census units may reflect underlying characteristics that could be missed by large regular lattices. Future research to examine the potential for using a combination of irregular polygons and regular lattices would be useful. WIREs Comp Stat 2012, 4:67–74. doi: 10.1002/wics.196
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