Derivation of Correlation Dimension from Spatial Autocorrelation Functions
Yanguang Chen

TL;DR
This paper develops a mathematical framework linking spatial autocorrelation functions to correlation dimension, enabling analysis of complex, scale-free spatial processes in geographical systems.
Contribution
It introduces a novel approach to measure spatial autocorrelation in scale-free systems using correlation dimension derived from autocorrelation functions.
Findings
Derived mathematical relation between correlation dimension and autocorrelation functions.
Constructed models for simple and complex spatial autocorrelation analysis.
Revealed connection between fractal patterns and spatial autocorrelation in nature and society.
Abstract
Spatial autocorrelation coefficients such as Moran's index proved to be an eigenvalue of the spatial correlation matrixes. An eigenvalue represents a kind of characteristic length for quantitative analysis. However, if a spatial correlation is based on self-organized evolution, complex structure, and the distributions without characteristic scale, the eigenvalue will be ineffective. In this case, the single Moran index cannot lead to reliable statistic inferences. This paper is devoted to finding advisable approach to measure spatial autocorrelation for the scale-free processes of complex systems by means of mathematical reasoning and empirical analysis. Based on relative step function as spatial contiguity function, a series of ordered spatial autocorrelation coefficients are converted into the corresponding spatial autocorrelation functions. Then the mathematical relation between…
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Taxonomy
TopicsSpatial and Panel Data Analysis · Land Use and Ecosystem Services · Regional Economics and Spatial Analysis
