Please use this identifier to cite or link to this item: https://hdl.handle.net/20.500.14279/8668
Title: Reconstructing population density surfaces from areal data: A comparison of Tobler’s pycnophylactic interpolation method and area-to-point Kriging
Authors: Yoo, Eun-Hye 
Kyriakidis, Phaedon 
Tobler, Waldo 
Major Field of Science: Engineering and Technology
Field Category: Environmental Engineering
Keywords: Population distribution;Census;Areal interpolation
Issue Date: 25-Jan-2010
Source: Geographical Analysis, 2010, vol. 42, no. 1, pp. 78–98
Volume: 42
Issue: 1
Start page: 78
End page: 98
Journal: Geographical Analysis 
Abstract: e compare Tobler's pycnophylactic interpolation method with the geostatistical approach of area-to-point kriging for distributing population data collected by areal unit in 18 census tracts in Ann Arbor for 1970 to reconstruct a population density surface. In both methods, (1) the areal data are reproduced when the predicted population density is upscaled; (2) physical boundary conditions are accounted for, if they exist; and (3) inequality constraints, such as the requirement of non-negative point predictions, are satisfied. The results show that when a certain variogram model, that is, the de Wijsian model corresponding to the free-space Green's function of Laplace's equation, is used in the geostatistical approach under the same boundary condition and constraints with Tobler's approach, the predicted population density surfaces are almost identical (up to numerical errors and discretization discrepancies). The implications of these findings are twofold: (1) multiple attribute surfaces can be constructed from areal data using the geostatistical approach, depending on the particular point variogram model adopted—that variogram model need not be the one associated with Tobler's solution and (2) it is the analyst's responsibility to justify whether the smoothness criterion employed in Tobler's approach is relevant to the particular application at hand. A notable advantage of the geostatistical approach over Tobler's is that it allows reporting the uncertainty or reliability of the interpolated values, with critical implications for uncertainty propagation in spatial analysis operations.
URI: https://hdl.handle.net/20.500.14279/8668
ISSN: 15384632
DOI: 10.1111/j.1538-4632.2009.00783.x
Rights: © The Ohio State University
Type: Article
Affiliation : University at Buffalo 
University of California 
Cyprus University of Technology 
Publication Type: Peer Reviewed
Appears in Collections:Άρθρα/Articles

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