Difference between revisions of "GLUE analysis"

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   library(Hmisc)
 
   library(Hmisc)
 
   library(topmodel)
 
   library(topmodel)
   data(Huagrahuma)
+
   data(huagrahuma)
  
 
===Procedure===
 
===Procedure===
Line 29: Line 29:
 
   vr    <- runif(1, min = 100, max = 2500)
 
   vr    <- runif(1, min = 100, max = 2500)
 
   k0    <- runif(1, min = 0, max = 10)
 
   k0    <- runif(1, min = 0, max = 10)
   psi  <- 1
+
   CD   <- runif(1, min = 0, max = 5)
   dtheta<- runif(1, min = 0, max = 5)
 
 
   dt    <- 0.25
 
   dt    <- 0.25
 
    
 
    
   parameters<-c(qs0,lnTe,m,Sr0,Srmax,td,vch,vr,k0,psi,dtheta,dt)
+
   parameters <- c(qs0,lnTe,m,Sr0,Srmax,td,vch,vr,k0,psi,dtheta,dt)
  
 
Run the model for the calibration period with the generated parameter set to obtain the simulated discharge
 
Run the model for the calibration period with the generated parameter set to obtain the simulated discharge
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Calculate the likelihood of this parameter set using the simulated and observed discharge. The choice of the likelihood function is up to the user, but the Nash - Sutcliffe efficiency is given here as an example:
 
Calculate the likelihood of this parameter set using the simulated and observed discharge. The choice of the likelihood function is up to the user, but the Nash - Sutcliffe efficiency is given here as an example:
  
   eff <- 1 - sum((Qobs - Qsim)^2) / sum((Qobs-mean(Qobs))^2)
+
   eff <- NSeff(Qobs,Qsim)
 
 
NOTE: calculation of the Nash-Sutcliffe efficiency is also implimented in NSeff() of the [[topmodel]]-package.
 
  
 
Decide whether the parameter set is behavioural or not and retain the parameter set if behavioural
 
Decide whether the parameter set is behavioural or not and retain the parameter set if behavioural
Line 72: Line 69:
 
   eff <- eff/sum(eff)
 
   eff <- eff/sum(eff)
  
Define a quantile for the prediction bounds. Here we take the 0.05 and 0.95 quantiles resulting in 90% prediction limits.
+
Calculate the quantiles for each timestep. Here we take the 0.05 and 0.95 quantiles, resulting in 90% prediction limits.  
 
 
  lower <- 0.05
 
  upper <- 0.95
 
 
 
Create the objects in which we will store the prediction limits:
 
 
 
  Ulimit <- 0
 
  Llimit <- 0
 
 
 
Now we calculate the quantiles for each timestep (this can also be done with the function apply())
 
 
 
  for(i in 1:dim(predicted.qsim)[1]) {
 
      Llimit[i] <- wtd.quantile(predicted.qsim[i,],weights = eff, probs = lower, normwt=T)
 
      Ulimit[i] <- wtd.quantile(predicted.qsim[i,],weights = eff, probs = upper, normwt=T)
 
  }
 
  
The final prediciton limits are stored in Llimit and Ulimit.
+
  limits <- apply(Qsim,1,"wtd.quantile", weights = Eff, probs = c(0.05,0.95), normwt=T)
  
 
===Final notes===
 
===Final notes===
  
* If topmodel is used, some loops can be avoided because topmodel() can work on entire parameter set matrices, which makes things faster. It can also return the Nash-Sutcliffe efficiency directly (see the topmodel page)
+
* If topmodel is used, some loops can be avoided. topmodel() can work on entire parameter set matrices, which makes things faster. It can also return the Nash-Sutcliffe efficiency directly (see the topmodel page)
 
* The procedure can be very memory intensive because all simulated discharges for all parameter sets are stored in memory (the matrix predicted.qsim). If the model can give output per timestep, the above procedure can be repeated for each timestep separately to reduce memory usage
 
* The procedure can be very memory intensive because all simulated discharges for all parameter sets are stored in memory (the matrix predicted.qsim). If the model can give output per timestep, the above procedure can be repeated for each timestep separately to reduce memory usage
  

Revision as of 01:04, 12 January 2009


Introduction

This is an example of R code to perform a Generalised Likelihood Uncertainty Estimation (GLUE) on a hydrological model. In the example we use topmodel (implemented as topmodel()) on a catchment in the Ecuadorian Andes (Huagrahuma). Other models can be used as long as they are implemented as an R function.

More examples and scripts for doing uncertainty analysis in R can be found on Keith Beven's uncertainty pages.

Libraries

Library Hmisc (CRAN) is needed for the wgt.quantile() function. See ?wgt.quantile for details.

  library(Hmisc)
  library(topmodel)
  data(huagrahuma)

Procedure

Sample a parameter set from a prior parameter distribution. This example uses the uniform distribution, which can be sampled with "runif()". The parameters vch and psi are not used in this example but need to be initialised. For an explanation of the parameter values see the page on Running Topmodel.

  qs0   <- runif(1, min = 0.0001, max = 0.00025)
  lnTe  <- runif(1, min = -2, max = 3)
  m     <- runif(1, min = 0, max = 0.1)
  Sr0   <- runif(1, min = 0, max = 0.2)
  Srmax <- runif(1, min = 0, max = 0.1)
  td    <- runif(1, min = 0, max = 3)
  vch   <- 1000
  vr    <- runif(1, min = 100, max = 2500)
  k0    <- runif(1, min = 0, max = 10)
  CD    <- runif(1, min = 0, max = 5)
  dt    <- 0.25
  
  parameters <- c(qs0,lnTe,m,Sr0,Srmax,td,vch,vr,k0,psi,dtheta,dt)

Run the model for the calibration period with the generated parameter set to obtain the simulated discharge

  Qsim <- topmodel(parameters,topidx,delay,rain,ET0)

Calculate the likelihood of this parameter set using the simulated and observed discharge. The choice of the likelihood function is up to the user, but the Nash - Sutcliffe efficiency is given here as an example:

  eff <- NSeff(Qobs,Qsim)

Decide whether the parameter set is behavioural or not and retain the parameter set if behavioural

NOTE: this decision is again subjective. For a more scientifically sound determination of the behavioural limit, see Beven (2006). Here we will use an efficiency of 0.6 as a threshold. The efficiency, parameter set and simulated discharge of a behavioural run are stored in resp. the objects total.eff, total.param.set and total.qsim

  if(eff > 0.6) {
     total.eff <- c(total.eff,eff)
     behavioural.parameters <- cbind(behavioural.parameters,parameters)
  }

The above procedure should be repeated until enough behavioural runs are obtained (e.g. using a while()-loop)

If the above code is used, each column of the matrix behavioural.parameters contains a behavioural parameter set. The corresponding performance is found at the same location in the vector total.eff

Rerun the model for the prediction period, using each of the behavioural parameter sets. The simulated discharges are stored in the columns of a matrix called predicted.qsim

  predicted.qsim <- model(behavioural.parameters[,1], rain, ...)
  
  for(i in 2:dim(param.set)[2]) {
     qsim <- model(behavioural.parameters[,i], rain, ...)
     predicted.qsim <- cbind(predicted.obs,qobs)
  }

Normalise the efficiencies so that they sum up to 1:

  eff <- eff - 0.6
  eff <- eff/sum(eff)

Calculate the quantiles for each timestep. Here we take the 0.05 and 0.95 quantiles, resulting in 90% prediction limits.

  limits <- apply(Qsim,1,"wtd.quantile", weights = Eff, probs = c(0.05,0.95), normwt=T)

Final notes

  • If topmodel is used, some loops can be avoided. topmodel() can work on entire parameter set matrices, which makes things faster. It can also return the Nash-Sutcliffe efficiency directly (see the topmodel page)
  • The procedure can be very memory intensive because all simulated discharges for all parameter sets are stored in memory (the matrix predicted.qsim). If the model can give output per timestep, the above procedure can be repeated for each timestep separately to reduce memory usage

References

  • Beven, K., and Binley, A. The future of distributed models: Model calibration and uncertainty prediction. Hydrological Processes 6 (1992), 279-298.
  • Beven, K. A manifesto for the equifinality thesis. Journal of Hydrology 320 (2006), 18-36.