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Introduction: Spatial Statistics Read chapter Read first chapter

2011 | OriginalPaper | Chapter

5. Understanding Correlations Among Spatial Processes

Authors : Prof. Daniel A. Griffith, Prof. Dr. Jean H.P. Paelinck

Published in: Non-standard Spatial Statistics and Spatial Econometrics

Publisher: Springer Berlin Heidelberg

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Abstract

The Pearson product-moment, Spearman’s rank, point biserial and phi correlation coefficients are calculated to quantify the nature and degree of linear correspondence between observation pairs of attributes. Bivand (1980) and Griffith (1980) were among the very first spatial analysts to address the impacts of spatial autocorrelation (SA) on conventional Pearson correlation coefficients. In the decades since their studies, an increasing understanding has been attained about correlation coefficients computed with georeferenced data. This understanding includes how: SA alters conventional degrees of freedom and sample size, the nature and degree of SA affects correlation coefficients, and SA can simultaneously inflate and deflate correlation coefficients. The primary objective of this chapter is to review each of these topics, adding some extensions when possible.

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previous chapter Frequency Distributions for Simulated Spatially Autocorrelated Random Variables
next chapter Spatially Structured Random Effects: A Comparison of Three Popular Specifications
Footnotes
1
1See Cressie (1991) for the specific equations for many of the semivariogram models.
 
2
See Cressie (1991) for the specific equations for many of the semivariogram models.
 
Literature
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Metadata
Title
Understanding Correlations Among Spatial Processes
Authors
Prof. Daniel A. Griffith
Prof. Dr. Jean H.P. Paelinck
Copyright Year
2011
Publisher
Springer Berlin Heidelberg
Book
Non-standard Spatial Statistics and Spatial Econometrics

Print ISBN: 978-3-642-16042-4

Electronic ISBN: 978-3-642-16043-1

Copyright Year: 2011

DOI
https://doi.org/10.1007/978-3-642-16043-1_5