Suppose I have yearly precipitation data for 100 stations from 1951 to 1980. In some papers, I find people apply PCA to the time series and then plot the spatial loadings map (with values from -1 to 1), and also plot the time series of the PCs. For example, figure 6 in https://publicaciones.unirioja.es/ojs/index.php/cig/article/view/2931/2696 is the spatial distribution of the PCs.

I am using function prcomp in R and I wonder how I can do the same thing. In other words, how can I extract the "spatial pattern" and "temporal pattern" from the results of prcomp function? Thanks.

rainfall = sample(x=100:1000,size = 100*30,replace = T)
PCA = prcomp(rainfall,retx=T)

Or, there are real data at https://1drv.ms/u/s!AnVl_zW00EHegxAprS4s7PDaYQVr

  • 1
    I don't think your example data can be used to demonstrate this, because it does not have any spatially dependent parameters. The way to do get spatial maps of the principal components is, for each grid cell in a spatial raster, multiply the parameter values for that location by the pca loadings. If you can provide a better example data set, it shouldn't be too hard to show how to map out the principal components. – dww Dec 18 '16 at 4:54
  • @dww Hi, thank you for your reply. Yes, I have real gridded data which indludes latitude, longitude and values. Could you give me an example using the real data? Thanks. I have added the link in the post, thanks. – Yang Yang Dec 18 '16 at 20:31

"Temporal pattern" explains the dominant temporal variation of time series in all grids, and it is represented by principal components (PCs, a number of time series) of PCA. In R, it is prcomp(data)$x[,'PC1'] for the most important PC, PC1.

"Spatial pattern" explains how strong the PCs depend on some variables (geography in your case), and it is represented by the loadings of each principal components. For example, for PC1, it is prcomp(data)$rotation[,'PC1'].

Here is an example of constructing a PCA for spatiotemporal data in R and showing the temporal variation and spatial heterogeneity, using your data.

First of all, the data has to be transformed into a data.frame with variables (spatial grid) and observations (yyyy-mm).

Loading and transforming the data:

str(spei03_df) # the time dimension is saved as names (in yyyy-mm format) in the list
lat <- spei03_df$lat # latitude of each values of data
lon <- spei03_df$lon # longitude
rainfall <- spei03_df 
rainfall$lat <- NULL
rainfall$lon <- NULL
date <- names(rainfall)
rainfall <- t(as.data.frame(rainfall)) # columns are where the values belong, rows are the times

To understand the data, drawing on map the data for Jan 1950:

library(ggplot2) # for map drawing

drawing <- function(data, map, lonlim = c(-180,180), latlim = c(-90,90)) {
  major.label.x = c("180", "150W", "120W", "90W", "60W", "30W", "0", 
                    "30E", "60E", "90E", "120E", "150E", "180")
  major.breaks.x <- seq(-180,180,by = 30)
  minor.breaks.x <- seq(-180,180,by = 10)

  major.label.y = c("90S","60S","30S","0","30N","60N","90N")
  major.breaks.y <- seq(-90,90,by = 30)
  minor.breaks.y <- seq(-90,90,by = 10)
  panel.expand <- c(0,0)

  drawing <- ggplot() + 
    geom_path(aes(x = long, y = lat, group = group), data = map) + 
    geom_tile(data = data, aes(x = lon, y = lat, fill = val), alpha = 0.3, height = 2) + 
    scale_fill_gradient(low = 'white', high = 'red') + 
    scale_x_continuous(breaks = major.breaks.x, minor_breaks = minor.breaks.x, labels = major.label.x, 
                       expand = panel.expand,limits = lonlim) +
    scale_y_continuous(breaks = major.breaks.y, minor_breaks = minor.breaks.y, labels = major.label.y,
                       expand = panel.expand, limits = latlim) +
    theme(panel.grid = element_blank(), panel.background = element_blank(),
          panel.border = element_rect(fill = NA, color = 'black'),
          axis.ticks.length = unit(3,"mm"),
          axis.title = element_text(size = 0),
          legend.key.height = unit(1.5,"cm"))


map.global <- fortify(map(fill=TRUE, plot=FALSE))
dat <- data.frame(lon = lon, lat = lat, val = rainfall["1950-01",])
sample_plot <- drawing(dat, map.global, lonlim = c(-180,180), c(-90,90))
ggsave("sample_plot.png", sample_plot,width = 6,height=4,units = "in",dpi = 600)

the spatial distribution of Jan-1950 data

As shown above, the gridded data given by the link provided includes values that represent rainfall (some kinds of indexes?) in Canada.

Principal Component Analysis:

PCArainfall <- prcomp(rainfall, scale = TRUE)
summaryPCArainfall <- summary(PCArainfall)

It shows that the first two PCs explain 10.5% and 9.2% of variance in the rainfall data.

I extract the loadings of the first two PCs and the PC time series themselves: The "spatial pattern" (loadings), showing the spatial heterogeneity of the strengths of the trends (PC1 and PC2).

loading.PC1 <- data.frame(lon=lon,lat=lat,val=PCArainfall$rotation[,'PC1'])
loading.PC2 <- data.frame(lon=lon,lat=lat,val=PCArainfall$rotation[,'PC2'])

drawing.loadingPC1 <- drawing(loading.PC1,map.global, lonlim = c(-180,-30), latlim = c(40,90)) + ggtitle("PC1")
drawing.loadingPC2 <- drawing(loading.PC2,map.global, lonlim = c(-180,-30), latlim = c(40,90)) + ggtitle("PC2")

ggsave("loading_PC1.png",drawing.loadingPC1,width = 6,height=4,units = "in",dpi = 600)
ggsave("loading_PC2.png",drawing.loadingPC2,width = 6,height=4,units = "in",dpi = 600)

PC1 loadings PC2 loadings

The "temporal pattern", the first two PC time series, showing the dominant temporal trends of the data

PC1 <- ts(PCArainfall$x[,'PC1'],start=c(1950,1),end=c(2014,12),frequency = 12)
PC2 <- ts(PCArainfall$x[,'PC2'],start=c(1950,1),end=c(2014,12),frequency = 12)
png("PC-ts.png",width = 6,height = 4,res = 600,units = "in")
plot(as.xts(PC1),major.format = "%Y-%b", type = 'l', ylim = c(-100, 100), main = "PC") # the black one is PC1
lines(as.xts(PC2),col='blue',type="l") # the blue one is PC2

PC1 and PC2

This example is, however, by no means the best PCA for your data because there are serious seasonality and annual variations in the PC1 and PC2 (Of course, it rains more in summer, and look at the weak tails of the PCs).

You can improve the PCA probably by deseasonalizing the data or removing the annual trend by regression, as in the literature suggested. But this is already beyond our topic.

  • In your code, columns of the data are the values and rows are the times. Is there any reason for this? Thanks a lot. – Yang Yang Dec 23 '16 at 21:29
  • This is because climatological studies care about temporal modes (seasonal/annual/interannual variability) and the spatial pattern of the modes (e.g. the seriously affected region(s) by the precipitation variability). If you chose the spatial variables as rows, you would be looking into spatial modes of precipitation variation (the spatial precipitation pattern that occurs most frequently) and the loading of the modes (which year/month is the most affected by the spatial precipitation pattern). – raymkchow Dec 25 '16 at 19:30
  • Thanks a lot for your help. – Yang Yang Jan 3 '17 at 17:50
  • @raymkchow How would the drawing function change if we wanted to show the loadings as contours rather than with geom_tile? – DJV Jun 15 '17 at 20:13

Your Answer

By clicking “Post Your Answer”, you agree to our terms of service, privacy policy and cookie policy

Not the answer you're looking for? Browse other questions tagged or ask your own question.