The Effect of Data Aggregation on a Poisson Regression Model of Canadian Migration

A Statistics Canada data set for Canadian migration data at the census division level incorporating information on income tax for 1986 has already been presented. This matrix of 260 × 260 flows was used to calibrate a set of Poisson regression models by utilizing flows for the aggregate population. In this paper, the relatively high spatial resolution is used to test for aggregation effects as the original 260 units are combined to form fewer, synthetic regions with larger areas. A series of simulation experiments are performed with three different aggregation algorithms to create 130, 65, and ultimately 10 (corresponding to the provinces) synthetic regions. Average results from the experiments are compared with the original model. Results are obtained that suggest that, in this case, obvious aggregation effects similar to those observed elsewhere (by Openshaw) are not observed.

[1]  A S Fotheringham,et al.  The Modifiable Areal Unit Problem in Multivariate Statistical Analysis , 1991 .

[2]  C. E. Gehlke,et al.  Certain Effects of Grouping upon the Size of the Correlation Coefficient in Census Tract Material , 1934 .

[3]  Giuseppe Arbia,et al.  Spatial Data Configuration in Statistical Analysis of Regional Economic and Related Problems , 1989 .

[4]  S. Openshaw A million or so correlation coefficients : three experiments on the modifiable areal unit problem , 1979 .

[5]  Hubert M. Blalock,et al.  Aggregation and Measurement Error , 1971 .

[6]  Fionn Murtagh,et al.  A Survey of Algorithms for Contiguity-Constrained Clustering and Related Problems , 1985, Comput. J..

[7]  M Batty,et al.  Spatial Aggregation in Gravity Models: 3. Two-Dimensional Trip Distribution and Location Models , 1982, Environment & planning A.

[8]  M Batty,et al.  Spatial Aggregation in Gravity Models. 1. An Information-Theoretic Framework , 1982, Environment & planning A.

[9]  Robin Flowerdew,et al.  ANALYSIS OF COUNT DATA USING POISSON REGRESSION , 1989 .

[10]  Ian Masser,et al.  Hierarchical Aggregation Procedures for Interaction Data , 1975 .

[11]  S H Putman,et al.  Effects of Spatial System Design on Spatial Interaction Models. 1: The Spatial System Definition Problem , 1988 .

[12]  M Batty,et al.  Spatial Aggregation in Gravity Models: 2. One-Dimensional Population Density Models , 1982, Environment & planning A.

[13]  Stan Openshaw,et al.  Optimal Zoning Systems for Spatial Interaction Models , 1977 .

[14]  Carl Amrhein,et al.  Poisson regression models of Canadian census division migration flows , 1989 .

[15]  Stan Openshaw,et al.  A geographical solution to scale and aggregation problems in region-building, partitioning and spatial modelling , 1977 .

[16]  Stan Openshaw,et al.  Algorithm 3: A Procedure to Generate Pseudo-Random Aggregations of N Zones into M Zones, Where M is Less Than N , 1977 .

[17]  H. Theil,et al.  Alternative Approaches to the Aggregation Problem , 1966 .

[18]  Stan Openshaw,et al.  An Empirical Study of Some Zone-Design Criteria , 1978 .

[19]  Michael Batty,et al.  Proximate Aggregation-Estimation of Spatial Interaction Models , 1984 .

[20]  M Batty,et al.  Spatial Aggregation in Gravity Models: 4. Generalisations and Large-Scale Applications , 1982, Environment & planning A.

[21]  P. Slater Point-to-Point Migration Functions and Gravity Model Renormalization: Approaches to Aggregation in Spatial Interaction Modeling , 1985, Environment & planning A.

[22]  Z. Griliches,et al.  Is aggregation necessarily bad , 1960 .