9  Global Measures of Spatial Autocorrelation

Published

January 25, 2023

Modified

January 30, 2024

9.1 Overview

In this hands-on exercise, you will learn how to compute Global Measures of Spatial Autocorrelation (GMSA) by using spdep package. By the end to this hands-on exercise, you will be able to:

  • import geospatial data using appropriate function(s) of sf package,
  • import csv file using appropriate function of readr package,
  • perform relational join using appropriate join function of dplyr package,
  • compute Global Spatial Autocorrelation (GSA) statistics by using appropriate functions of spdep package,
    • plot Moran scatterplot,
    • compute and plot spatial correlogram using appropriate function of spdep package.
  • provide statistically correct interpretation of GSA statistics.

9.2 Getting Started

9.2.1 The analytical question

In spatial policy, one of the main development objective of the local government and planners is to ensure equal distribution of development in the province. Our task in this study, hence, is to apply appropriate spatial statistical methods to discover if development are even distributed geographically. If the answer is No. Then, our next question will be “is there sign of spatial clustering?”. And, if the answer for this question is yes, then our next question will be “where are these clusters?”

In this case study, we are interested to examine the spatial pattern of a selected development indicator (i.e. GDP per capita) of Hunan Provice, People Republic of China.

9.2.2 The Study Area and Data

Two data sets will be used in this hands-on exercise, they are:

  • Hunan province administrative boundary layer at county level. This is a geospatial data set in ESRI shapefile format.
  • Hunan_2012.csv: This csv file contains selected Hunan’s local development indicators in 2012.

9.2.3 Setting the Analytical Toolls

Before we get started, we need to ensure that spdep, sf, tmap and tidyverse packages of R are currently installed in your R.

  • sf is use for importing and handling geospatial data in R,
  • tidyverse is mainly use for wrangling attribute data in R,
  • spdep will be used to compute spatial weights, global and local spatial autocorrelation statistics, and
  • tmap will be used to prepare cartographic quality chropleth map.

The code chunk below is used to perform the following tasks:

  • creating a package list containing the necessary R packages,
  • checking if the R packages in the package list have been installed in R,
    • if they have yet to be installed, RStudio will installed the missing packages,
  • launching the packages into R environment.
pacman::p_load(sf, spdep, tmap, tidyverse)

9.3 Getting the Data Into R Environment

In this section, you will learn how to bring a geospatial data and its associated attribute table into R environment. The geospatial data is in ESRI shapefile format and the attribute table is in csv fomat.

9.3.1 Import shapefile into r environment

The code chunk below uses st_read() of sf package to import Hunan shapefile into R. The imported shapefile will be simple features Object of sf.

hunan <- st_read(dsn = "chap09/data/geospatial", 
                 layer = "Hunan")
Reading layer `Hunan' from data source `D:\tskam\r4gdsa\chap09\data\geospatial' using driver `ESRI Shapefile'
Simple feature collection with 88 features and 7 fields
Geometry type: POLYGON
Dimension:     XY
Bounding box:  xmin: 108.7831 ymin: 24.6342 xmax: 114.2544 ymax: 30.12812
Geodetic CRS:  WGS 84

9.3.2 Import csv file into r environment

Next, we will import Hunan_2012.csv into R by using read_csv() of readr package. The output is R data frame class.

hunan2012 <- read_csv("chap09/data/aspatial/Hunan_2012.csv")

9.3.3 Performing relational join

The code chunk below will be used to update the attribute table of hunan’s SpatialPolygonsDataFrame with the attribute fields of hunan2012 dataframe. This is performed by using left_join() of dplyr package.

hunan <- left_join(hunan,hunan2012) %>%
  select(1:4, 7, 15)

9.3.4 Visualising Regional Development Indicator

Now, we are going to prepare a basemap and a choropleth map showing the distribution of GDPPC 2012 by using qtm() of tmap package.

equal <- tm_shape(hunan) +
  tm_fill("GDPPC",
          n = 5,
          style = "equal") +
  tm_borders(alpha = 0.5) +
  tm_layout(main.title = "Equal interval classification")

quantile <- tm_shape(hunan) +
  tm_fill("GDPPC",
          n = 5,
          style = "quantile") +
  tm_borders(alpha = 0.5) +
  tm_layout(main.title = "Equal quantile classification")

tmap_arrange(equal, 
             quantile, 
             asp=1, 
             ncol=2)

9.4 Global Measures of Spatial Autocorrelation

In this section, you will learn how to compute global spatial autocorrelation statistics and to perform spatial complete randomness test for global spatial autocorrelation.

9.4.1 Computing Contiguity Spatial Weights

Before we can compute the global spatial autocorrelation statistics, we need to construct a spatial weights of the study area. The spatial weights is used to define the neighbourhood relationships between the geographical units (i.e. county) in the study area.

In the code chunk below, poly2nb() of spdep package is used to compute contiguity weight matrices for the study area. This function builds a neighbours list based on regions with contiguous boundaries. If you look at the documentation you will see that you can pass a “queen” argument that takes TRUE or FALSE as options. If you do not specify this argument the default is set to TRUE, that is, if you don’t specify queen = FALSE this function will return a list of first order neighbours using the Queen criteria.

More specifically, the code chunk below is used to compute Queen contiguity weight matrix.

wm_q <- poly2nb(hunan, 
                queen=TRUE)
summary(wm_q)
Neighbour list object:
Number of regions: 88 
Number of nonzero links: 448 
Percentage nonzero weights: 5.785124 
Average number of links: 5.090909 
Link number distribution:

 1  2  3  4  5  6  7  8  9 11 
 2  2 12 16 24 14 11  4  2  1 
2 least connected regions:
30 65 with 1 link
1 most connected region:
85 with 11 links

The summary report above shows that there are 88 area units in Hunan. The most connected area unit has 11 neighbours. There are two area units with only one neighbours.

9.4.2 Row-standardised weights matrix

Next, we need to assign weights to each neighboring polygon. In our case, each neighboring polygon will be assigned equal weight (style=“W”). This is accomplished by assigning the fraction 1/(#ofneighbors) to each neighboring county then summing the weighted income values. While this is the most intuitive way to summaries the neighbors’ values it has one drawback in that polygons along the edges of the study area will base their lagged values on fewer polygons thus potentially over- or under-estimating the true nature of the spatial autocorrelation in the data. For this example, we’ll stick with the style=“W” option for simplicity’s sake but note that other more robust options are available, notably style=“B”.

rswm_q <- nb2listw(wm_q, 
                   style="W", 
                   zero.policy = TRUE)
rswm_q
Characteristics of weights list object:
Neighbour list object:
Number of regions: 88 
Number of nonzero links: 448 
Percentage nonzero weights: 5.785124 
Average number of links: 5.090909 

Weights style: W 
Weights constants summary:
   n   nn S0       S1       S2
W 88 7744 88 37.86334 365.9147
What can we learn from the code chunk above?
  • The input of nb2listw() must be an object of class nb. The syntax of the function has two major arguments, namely style and zero.poly.
  • style can take values “W”, “B”, “C”, “U”, “minmax” and “S”. B is the basic binary coding, W is row standardised (sums over all links to n), C is globally standardised (sums over all links to n), U is equal to C divided by the number of neighbours (sums over all links to unity), while S is the variance-stabilizing coding scheme proposed by Tiefelsdorf et al. 1999, p. 167-168 (sums over all links to n).
  • If zero policy is set to TRUE, weights vectors of zero length are inserted for regions without neighbour in the neighbours list. These will in turn generate lag values of zero, equivalent to the sum of products of the zero row t(rep(0, length=length(neighbours))) %*% x, for arbitrary numerical vector x of length length(neighbours). The spatially lagged value of x for the zero-neighbour region will then be zero, which may (or may not) be a sensible choice.

9.5 Global Measures of Spatial Autocorrelation: Moran’s I

In this section, you will learn how to perform Moran’s I statistics testing by using moran.test() of spdep.

9.5.1 Maron’s I test

The code chunk below performs Moran’s I statistical testing using moran.test() of spdep.

moran.test(hunan$GDPPC, 
           listw=rswm_q, 
           zero.policy = TRUE, 
           na.action=na.omit)

    Moran I test under randomisation

data:  hunan$GDPPC  
weights: rswm_q    

Moran I statistic standard deviate = 4.7351, p-value = 1.095e-06
alternative hypothesis: greater
sample estimates:
Moran I statistic       Expectation          Variance 
      0.300749970      -0.011494253       0.004348351

Question: What statistical conclusion can you draw from the output above?

9.5.2 Computing Monte Carlo Moran’s I

The code chunk below performs permutation test for Moran’s I statistic by using moran.mc() of spdep. A total of 1000 simulation will be performed.

set.seed(1234)
bperm= moran.mc(hunan$GDPPC, 
                listw=rswm_q, 
                nsim=999, 
                zero.policy = TRUE, 
                na.action=na.omit)
bperm

    Monte-Carlo simulation of Moran I

data:  hunan$GDPPC 
weights: rswm_q  
number of simulations + 1: 1000 

statistic = 0.30075, observed rank = 1000, p-value = 0.001
alternative hypothesis: greater

Question: What statistical conclustion can you draw fro mthe output above?

9.5.3 Visualising Monte Carlo Moran’s I

It is always a good practice for us the examine the simulated Moran’s I test statistics in greater detail. This can be achieved by plotting the distribution of the statistical values as a histogram by using the code chunk below.

In the code chunk below hist() and abline() of R Graphics are used.

mean(bperm$res[1:999])
[1] -0.01504572
var(bperm$res[1:999])
[1] 0.004371574
summary(bperm$res[1:999])
    Min.  1st Qu.   Median     Mean  3rd Qu.     Max. 
-0.18339 -0.06168 -0.02125 -0.01505  0.02611  0.27593 
hist(bperm$res, 
     freq=TRUE, 
     breaks=20, 
     xlab="Simulated Moran's I")
abline(v=0, 
       col="red")

Question: What statistical observation can you draw fro mthe output above?

Challenge: Instead of using Base Graph to plot the values, plot the values by using ggplot2 package.

9.6 Global Measures of Spatial Autocorrelation: Geary’s C

In this section, you will learn how to perform Geary’s C statistics testing by using appropriate functions of spdep package.

9.6.1 Geary’s C test

The code chunk below performs Geary’s C test for spatial autocorrelation by using geary.test() of spdep.

geary.test(hunan$GDPPC, listw=rswm_q)

    Geary C test under randomisation

data:  hunan$GDPPC 
weights: rswm_q 

Geary C statistic standard deviate = 3.6108, p-value = 0.0001526
alternative hypothesis: Expectation greater than statistic
sample estimates:
Geary C statistic       Expectation          Variance 
        0.6907223         1.0000000         0.0073364

Question: What statistical conclusion can you draw from the output above?

9.6.2 Computing Monte Carlo Geary’s C

The code chunk below performs permutation test for Geary’s C statistic by using geary.mc() of spdep.

set.seed(1234)
bperm=geary.mc(hunan$GDPPC, 
               listw=rswm_q, 
               nsim=999)
bperm

    Monte-Carlo simulation of Geary C

data:  hunan$GDPPC 
weights: rswm_q 
number of simulations + 1: 1000 

statistic = 0.69072, observed rank = 1, p-value = 0.001
alternative hypothesis: greater

Question: What statistical conclusion can you draw from the output above?

9.6.3 Visualising the Monte Carlo Geary’s C

Next, we will plot a histogram to reveal the distribution of the simulated values by using the code chunk below.

mean(bperm$res[1:999])
[1] 1.004402
var(bperm$res[1:999])
[1] 0.007436493
summary(bperm$res[1:999])
   Min. 1st Qu.  Median    Mean 3rd Qu.    Max. 
 0.7142  0.9502  1.0052  1.0044  1.0595  1.2722 
hist(bperm$res, freq=TRUE, breaks=20, xlab="Simulated Geary c")
abline(v=1, col="red")

Question: What statistical observation can you draw from the output?

9.7 Spatial Correlogram

Spatial correlograms are great to examine patterns of spatial autocorrelation in your data or model residuals. They show how correlated are pairs of spatial observations when you increase the distance (lag) between them - they are plots of some index of autocorrelation (Moran’s I or Geary’s c) against distance.Although correlograms are not as fundamental as variograms (a keystone concept of geostatistics), they are very useful as an exploratory and descriptive tool. For this purpose they actually provide richer information than variograms.

9.7.1 Compute Moran’s I correlogram

In the code chunk below, sp.correlogram() of spdep package is used to compute a 6-lag spatial correlogram of GDPPC. The global spatial autocorrelation used in Moran’s I. The plot() of base Graph is then used to plot the output.

MI_corr <- sp.correlogram(wm_q, 
                          hunan$GDPPC, 
                          order=6, 
                          method="I", 
                          style="W")
plot(MI_corr)

By plotting the output might not allow us to provide complete interpretation. This is because not all autocorrelation values are statistically significant. Hence, it is important for us to examine the full analysis report by printing out the analysis results as in the code chunk below.

print(MI_corr)
Spatial correlogram for hunan$GDPPC 
method: Moran's I
         estimate expectation   variance standard deviate Pr(I) two sided    
1 (88)  0.3007500  -0.0114943  0.0043484           4.7351       2.189e-06 ***
2 (88)  0.2060084  -0.0114943  0.0020962           4.7505       2.029e-06 ***
3 (88)  0.0668273  -0.0114943  0.0014602           2.0496        0.040400 *  
4 (88)  0.0299470  -0.0114943  0.0011717           1.2107        0.226015    
5 (88) -0.1530471  -0.0114943  0.0012440          -4.0134       5.984e-05 ***
6 (88) -0.1187070  -0.0114943  0.0016791          -2.6164        0.008886 ** 
---
Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1

Question: What statistical observation can you draw from the plot above?

9.7.2 Compute Geary’s C correlogram and plot

In the code chunk below, sp.correlogram() of spdep package is used to compute a 6-lag spatial correlogram of GDPPC. The global spatial autocorrelation used in Geary’s C. The plot() of base Graph is then used to plot the output.

GC_corr <- sp.correlogram(wm_q, 
                          hunan$GDPPC, 
                          order=6, 
                          method="C", 
                          style="W")
plot(GC_corr)

Similar to the previous step, we will print out the analysis report by using the code chunk below.

print(GC_corr)
Spatial correlogram for hunan$GDPPC 
method: Geary's C
        estimate expectation  variance standard deviate Pr(I) two sided    
1 (88) 0.6907223   1.0000000 0.0073364          -3.6108       0.0003052 ***
2 (88) 0.7630197   1.0000000 0.0049126          -3.3811       0.0007220 ***
3 (88) 0.9397299   1.0000000 0.0049005          -0.8610       0.3892612    
4 (88) 1.0098462   1.0000000 0.0039631           0.1564       0.8757128    
5 (88) 1.2008204   1.0000000 0.0035568           3.3673       0.0007592 ***
6 (88) 1.0773386   1.0000000 0.0058042           1.0151       0.3100407    
---
Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1