Geary’s c and Spectral Graph Theory
This paper provides a new perspective on Geary's c using concepts from spectral graph theory/linear algebraic graph theory and provides three types of representations for it: graph Laplacian representation, graph Fourier transform representation, and Pearson’s correlation coefficient representation.
Abstract
Spatial autocorrelation, of which Geary’s c has traditionally been a popular measure, is fundamental to spatial science. This paper provides a new perspective on Geary’s c. We discuss this using concepts from spectral graph theory/linear algebraic graph theory. More precisely, we provide three types of representations for it: (a) graph Laplacian representation, (b) graph Fourier transform representation, and (c) Pearson’s correlation coefficient representation. Subsequently, we illustrate that the spatial autocorrelation measured by Geary’s c is positive (resp. negative) if spatially smoother (resp. less smooth) graph Laplacian eigenvectors are dominant. Finally, based on our analysis, we provide a recommendation for applied studies.