Lesson 4: Geograpgically Weighted Regression
Overview
In this lesson, you will learn the basic concepts and methods of geographically weighted regression.
Content
- Basic concepts and principles of linear regression
- Simple linear regression
- Multiple linear regression
- The spatial stationarity assumption of multiple linear regression.
- Introducing Geographically Weighted Regression
- Weighting functions (kernel)
- Weighting schemes
- Bandwidth
- Interpreting and Visualising
Hands-on Exercise
Self-reading Before Meet-up
To read before class:
- Brunsdon, C., Fotheringham, A.S., and Charlton, M. (2002) “Geographically weighted regression: A method for exploring spatial nonstationarity”. Geographical Analysis, 28: 281-289.
- Brunsdon, C., Fotheringham, A.S. and Charlton, M., (1999) “Some Notes on Parametric Significance Tests for Geographically Weighted Regression”. Journal of Regional Science, 39(3), 497-524.
References
- Mennis, Jeremy (2006) “Mapping the Results of Geographically Weighted Regression”, The Cartographic Journal, Vol.43 (2), p.171-179.
- Stephen A. Matthews ; Tse-Chuan Yang (2012) “Mapping the results of local statistics: Using geographically weighted regression”, Demographic Research, Vol.26, p.151-166.
All About R
- GWmodel package, especially
- Gollini, I et. al. (2015) “GWmodel: An R Package for Exploring Spatial Heterogeneity Using Geographically Weighted Models”, Journal of Statistical Software, Volume 63, Issue 17 and
- Binbin Lu, Paul Harris, Martin Charlton & Chris Brunsdon (2014) “The GWmodel R package: further topics for exploring spatial heterogeneity using geographically weighted models”, Geo-spatial Information Science, 17:2, 85-101, DOI: 10.1080/10095020.2014.917453.
- lctools package especially gw() and gwr() related functions.
- spgwr implements of geographically weighted regression methods for exploring possible non-stationarity.
- gwrr: its geographically weighted regression (GWR) models and has tools to diagnose and remediate collinearity in the GWR models. Also fits geographically weighted ridge regression (GWRR) and geographically weighted lasso (GWL) models.