Version 9 (modified by juaco, 6 years ago) (diff)


Forecast verification: a worked example

In this example we obtain data from the NCEP's CFSv2 seasonal forecasting system (dataset = "CFSv2_seasonal"). In particular, in this example we will retrieve maximum daily surface temperature (var = "tasmax") for boreal summer (JJA, season = 6:8) for a rectangular domain centered on the Iberian Peninsula and France (lonLim = c(-10,15) and latLim = c(35,50)), for the period 1981-2000 (years = 1981:2000), and considering the first 9 ensemble members (members = 1:9) and a lead-month 2 forecast 2 (leadMonth = 2).

We will illustrate the verification of these predictions data against the observational gridded datasets WATCH Forcing Dataset-ERA-Interim (WFDEI, dataset = "WFDEI"), also available via the ECOMS-UDG. To this aim, we will use the tools developed within the projects SPECS and EUPORIAS. In particular, we will use the verification routines available in the R package SpecsVerification (available on CRAN). However, instead of using them directly, we will use the user-friendly interface implemented in package easyVerification, via the wrapper function veriApply (To find out more on the functionality in the easyVerification package, please read the vignette with the R instruction vignette("easyVerification"))

Package loading/install

We first load (and install if necessary) the required libraries. loadeR.ECOMS and downscaleR are loaded for data loading and manipulation respectively (see the installation instructions for loadeR.ECOMS and downscaleR):


The two packages related with verification are next installed if not already present. The installation of easyVerification will also install the dependency SpecsVerification if not present. Both packages are available on CRAN:

# Attempting the installation of easyVerification
if (!require("easyVerification")) {

Data loading from the ECOMS-UDG

tx.forecast <- loadECOMS(dataset = "CFSv2_seasonal",
                         var = "tasmax",
                         members = 1:4,
                         lonLim = c(-10 ,15),
                         latLim = c(35, 50),
                         season = 6:8,
                         years = 1991:2000,
                         leadMonth = 2)

## [2016-05-12 12:56:18] Defining homogeneization parameters for variable "tasmax"
## [2016-05-12 12:56:18] Opening dataset...
## [2016-05-12 12:56:48] The dataset was successfuly opened
## [2016-05-12 12:56:48] Defining geo-location parameters
## [2016-05-12 12:56:49] Defining initialization time parameters
## [2016-05-12 12:56:51] Retrieving data subset ...
## [2016-05-12 13:07:02] Done

plotMeanGrid(tx.forecast, multi.member = TRUE)

tx.obs <- loadECOMS(dataset = "WFDEI",
                    var = "tasmax",
                    lonLim = c(-10 ,15),
                    latLim = c(35, 50),
                    season = 6:8,
                    years = 1991:2000)
## [2016-05-12 14:03:40] Defining homogeneization parameters for variable "tasmax"
## [2016-05-12 14:03:40] Opening dataset...
## [2016-05-12 14:03:42] The dataset was successfuly opened
## [2016-05-12 14:03:42] Defining geo-location parameters
## [2016-05-12 14:03:42] Defining time selection parameters
## [2016-05-12 14:03:42] Retrieving data subset ...
## [2016-05-12 14:03:52] Done


Data preprocessing: interpolation and aggregation using downscaleR

Data interpolation

To be able to validate the forecasts, we first have to interpolate either the forecasts or the observations to have the data on a common grid. We interpolate the observations to the grid of the forecasts using the nearest neighbour algorithm:

tx.obsintp <- interpGrid(tx.obs, new.coordinates = getGrid(tx.forecast), method = "nearest")
## [2016-05-12 14:12:10] Calculating nearest neighbors...
## [2016-05-12 14:12:11] Performing nearest interpolation... may take a while
## [2016-05-12 14:12:11] Interpolating member 1 out of 4
## [2016-05-12 14:12:11] Interpolating member 2 out of 4
## [2016-05-12 14:12:11] Interpolating member 3 out of 4
## [2016-05-12 14:12:11] Interpolating member 4 out of 4
## [2016-05-12 14:12:13] Done

Temporal aggregation

Now that the predictions are in the same grid than the observations, we can proceed with the verification. However, before we go on, we compute seasonal averages of the forecasts and observations for validation of seasonal average daily maximum temperature. This is easily undertaken using downscaleR's function aggregateGrid (in Linux and MacOS it is possible to speed-up the aggregation by using the parallelization option):

mn.tx.forecast <- aggregateGrid(tx.forecast, aggr.y = list(FUN = "mean"), parallel = TRUE)
## Parallel computing enabled
## Number of workers: 3
## [2016-05-12 14:30:17] Performing annual aggregation in parallel...
## [2016-05-12 14:30:18] Done.

mn.tx.obsintp <- aggregateGrid(tx.obsintp, aggr.y = list(FUN = "mean"), parallel = TRUE)
##  Parallel computing enabled
##  Number of workers: 3
##  [2016-05-12 14:30:28] Performing annual aggregation in parallel...
##  [2016-05-12 14:30:30] Done.

Now we are ready to compute validation scores on the 3-monthly mean daily maximum temperature forecasts. We next compute several typical verification measures:

Verification measures using SpecsVerification? and easyVerification


Mean bias

bias <- veriApply("EnsMe",
                  fcst = mn.tx.forecast$Data,
                  obs = mn.tx.obsintp$Data,
                  ensdim = 1,
                  tdim = 2)

The object bias is a matrix with longitudes in columns and latitudes in rows. To do the plotting, we can use the coordinates of the reference grid of the CFS forecast. For convenience, we will use the function image.plot from package fields (this should be already installed because it is a dependency of downscaleR). In order to add a coastline map, we do a trick and call an internal function of downscaleR using the triple ::: notation:

                   asp = 1, xlab = "", ylab = "", main = "Mean tmax bias - JJA")

The results reveal a significant cold bias of the CFSv2 model predictions.


We follow a similar approach to compute the ensemble mean forecast correlation against the verifying observations:

corr <- veriApply("EnsCorr",
                  fcst = mn.tx.forecast$Data,
                  obs = mn.tx.obsintp$Data,
                  ensdim = 1, tdim = 2)

                   asp = 1, xlab = "", ylab = "",
                   main = "Mean tmax correlation - JJA")

We find that the ensemble mean summer forecasts for 1991-2000 correlate well with the verifying observations over the north-western sector of the analysis area, but the forecasts do not skilfully represent year-to-year variability over the Iberian Peninsula and the Mediterranean area.

Ranked probability skill score (RPSS)

We next illustrate the ranked probability skill score (RPSS). Here we use the RPSS for tercile forecasts, that is probability forecasts for the three categories colder than average, average, and warmer than average. In order to convert observations and forecast in probabilities for the three categories, we have to add an additional argument prob to the veriApply function with the quantile boundaries for the categories chosen. In this case, to indicate that validation is performed on the terciles, we use the value prob=c(1/3,2/3), as indicated next:

rpss <- veriApply("EnsRpss",
                  fcst = mn.tx.forecast$Data,
                  obs = mn.tx.obsintp$Data,
                  prob = c(1/3,2/3),
                  ensdim = 1, tdim = 2)

In this case, the output is a list consisting of two components: The first one is the RPSS lon-lat matrix, as in the previous examples. The second one, provides the standard error, useful to calculate the significance of the score at each particular grid point (at the 95% c.i. in this example):

# RPSS map
                   asp = 1, xlab = "", ylab = "", main = "tmax RPSS - JJA")

# Compute significant points and collocate spatially:
sig.i <- rpss$rpss > rpss$rpss.sigma*qnorm(0.95)
lons <- rep(mn.tx.obsintp$xyCoords$x, each = length(mn.tx.obsintp$xyCoords$y))
lats <- rep(mn.tx.obsintp$xyCoords$y, length(mn.tx.obsintp$xyCoords$x))
points(lons[sig.i], lats[sig.i], pch = 19)

In this case, we only get significant RPSS values in four points in the northern part of the domain.


These examples have been prepared by Jonas Bhend (MeteoSwiss?), in collaboration with the Santander MetGroup?.

Package versions and session info

print(sessionInfo(), locale = FALSE)

## R version 3.3.0 (2016-05-03)
## Platform: x86_64-pc-linux-gnu (64-bit)
## Running under: Ubuntu 14.04.4 LTS

## attached base packages:
## [1] stats     graphics  grDevices utils     datasets  methods   base     

## other attached packages:
## [1] downscaleR_1.0-1        easyVerification_0.2.0  loadeR.ECOMS_1.0-0      loadeR_1.0-0            loadeR.java_1.1-0      
## [6] rJava_0.9-8             SpecsVerification_0.4-1

## loaded via a namespace (and not attached):
##  [1] Rcpp_0.12.4       devtools_1.10.0   maps_3.1.0        MASS_7.3-44       evd_2.3-2         munsell_0.4.3     colorspace_1.2-6 
##  [8] lattice_0.20-33   pbapply_1.1-3     plyr_1.8.3        fields_8.4-1      tools_3.3.0       CircStats_0.2-4   parallel_3.3.0   
## [15] grid_3.3.0        spam_1.3-0        dtw_1.18-1        digest_0.6.9      abind_1.4-3       akima_0.5-12      bitops_1.0-6     
## [22] RCurl_1.95-4.8    memoise_1.0.0     sp_1.2-3          proxy_0.4-15      scales_0.4.0      boot_1.3-17       verification_1.42

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