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I'm using the vars package and want to predict some values from the calculated models:

# Get the model
x1 <- rnorm(15)
y1 <- x1 + rnorm(15)
model=VAR(trainFrame, p=3);
pr1=predict(model, trainFrame);
# Forecast values with new data
x2 <- rnorm(15)
y2 <- x2 + rnorm(15)
pr2=predict(model, newFrame);

Comparing the two prediction vectors pr1 and pr2 shows that they are the same. How can I get the actual forecast values and not again the forecasts from the training data?

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up vote 1 down vote accepted

Here you call the predict method for objects with class attribute varest.

predict(object, ..., n.ahead = 10, ci = 0.95, dumvar = NULL)

n.ahead forecasts are computed recursively for the estimated VAR.

No need to give the training Frame to predict.

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This doe not answer the question: why are pr1 and pr2 the same, although they have definitely a different data base generated by the rnorm calls? – Juergen Dec 26 '12 at 10:30
@Juergen they are the same becausesimply we don't use the generated data to predict. Only the model.predict(model) – agstudy Dec 26 '12 at 10:32
How can I use the generated data newFrame? Forecasting in-sample does not make much sense. – Juergen Dec 26 '12 at 10:38
Generated newframe?? generated how?I think you are a little bit confusing about Var model. What do you try to do have no sense. Here the prediction is a forecast of futures values not a fitting. did you read this – agstudy Dec 26 '12 at 11:06

The reason that they are not the same is that the rnorm function is generating two different sets of random data i.e the data being used in parts 1 and 2 is simply not the same.

To check see:

y1 <- rnorm(15)
 [1] -0.05346192  0.34168852 -0.18398645  0.84534239 -0.97027620  0.39889488
 [7] -0.44039372  0.03008880  0.47940826 -0.73258837  1.06715936 -0.93316881
[13] -1.38306019 -0.42179145 -0.84193860

y2 <- rnorm(15) 
 [1] -1.5849866  1.0203186  0.6242200 -0.5064240 -0.9497568 -0.2460866
 [7] -0.8262738  0.3100040  0.1352368  0.4030656 -0.7095272 -0.2856932
[13] -0.9061068  1.5968001  1.0259594

You will find that y1 and y2 are not the same.

To make sure the rnorm function generates the same set of data, you can use the function "set.seed()", which ensure that your work is reproducible.

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I had the same problem (I think), so I wrote this function to calculate the n-step ahead forecast. It doesn't give the error band or the CI though.

VAR.pred <- function(x, varest, n.ahead = 10)
 k <- ncol(varest$y)
 p <- varest$p
 Atemp <- matrix(NA, k, k*p + 1)

 for(i in 1:k) Atemp[i, ] <- (coef(varest)[[i]])[, 1]

 Const <- as.matrix(Atemp[, ncol(Atemp)])
 A <- Atemp[, -ncol(Atemp)]

 fcast <- matrix(NA, n.ahead, k)
 spoint <- as.matrix(x[nrow(x):(nrow(x)- p + 1), ])

 for(l in 1:n.ahead)
  ftemp <- A[, 1:k]%*%t(spoint)[, 1]
  for(j in 2:p)   ftemp <- ftemp + A[, (1 + k*(j-1)):(k*j)]%*%t(spoint)[, j]
  ftemp <- ftemp + Const

  fcast[l, ] <- t(ftemp) 

  spoint <- rbind(t(ftemp), spoint)[1:p, ]

 fframe <- data.frame(fcast)
 names(fframe) <- dimnames(x)[[2]]


Gives pr1

VAR.pred(x = model$y, varest = model)

Gives pr2

VAR.pred(x = newFrame, varest = model)

Hope I helped.

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