Replicating a function by bootstrapping the data in R

I am estimating a GMM model using `library(gmm)`.

``````n <- 200
x1 <- rnorm(n)
x2 <- rnorm(n)
x3 <- rnorm(n)
x4 <- rnorm(n)
x5 <- rnorm(n)
x6 <- rnorm(n)

xx <- cbind(x1, x2, x3, x4, x5, x6)
fun <- function(betastar, x) {
m1 <- (x[,1] - x[,2]*betastar - x[,3] - x[,4])*x[,5]
m2 <- (x[,1] - x[,2]*betastar - x[,3] - x[,4])*x[,6]
f <- cbind(m1,m2)
return(f)
}

library(gmm)
k <-  gmm(fun, x=xx, 0, optfct="optim", lower = 0, upper = 2, method="Brent")
``````

I want to replicate it `B` times by bootstrapping my sample `xx` (with replacement). My scope is to save the standard errors of betastar for each replication and store all of them somewhere. Is there a fast way to do that ? I know there is the `library(boot)` which in principle should allow me to do that, but I am having an hard time to figure out how, since for using the function gmm I need to specify another function (`fun`)

EDIT: What the `gmm` function is doing is minimizing the other function `fun` with respect to the parameter `betastar`. All the terms in `gmm()` define the way `gmm` works. What I want is to bind betastar (which is a coefficient) and its standard error in an object, for any 1:B replication. They can be recovered by the commands `coef(k)` and `sqrt(k\$vcov)` I am trying the following

``````B <- 199  # number of bootstrapping
betak_boot <- rep(NA, 199)
se_betak_boot <- rep(NA, 199)
for (ii in 1:B){
sample <- (replicate(ii, apply(xx, 2, sample, replace = TRUE)))
k_cons <- gmm(fun, x=samples, 0, gradv=Dg, optfct="optim", lower = 0, upper = 2, method="Brent")
betak_boot[ii] <- coef(k_cons)
se_betak_boot[ii] <- sqrt(k_cons\$vcov)
}
``````

I don't know why, I get an error while applying `fun`, i.e. `Error in x[, 1] : incorrect number of dimensions`. Indeed, I don't know why `sample` is

``````dim(sample)
[1] 200   6   1
``````
-
what's Dg? What does the 0 do? bind `betastar` in an object, e.g. a list, is that what you mean? –  Toby Apr 16 '14 at 11:11
Dg is a parameter (gradient) of the function. Does not matter, I removed it. What the `gmm` function is doing is minimizing the other function `fun`, with respect to the parameter `betastar`. All the terms in `gmm( )` define the way `gmm` works. What I want is to bind betastar (which is a coefficient) and its standard error in an object, for any `1:B` replication. Both of them can be recovered by the commands `coef(k)` and `sqrt(k\$vcov)` –  Bob Apr 16 '14 at 12:06
I am trying to write a loop for doing the entire job so to not use `library(boot)` but I am not having good results. I think it will be also (really) slow, if working. Bootstrapping works like this `samples <- replicate(ii, apply(xx, 2, sample, replace = TRUE))`, where `ii` should be the number of times you create new samples with replacement. I took it here link –  Bob Apr 16 '14 at 12:34

``````library(gmm)
set.seed(123)
n <- 200
x1 <- rnorm(n)
x2 <- rnorm(n)
x3 <- rnorm(n)
x4 <- rnorm(n)
x5 <- rnorm(n)
x6 <- rnorm(n)

xx <- cbind(x1, x2, x3, x4, x5, x6)
fun <- function(betastar, x) {
m1 <- (x[,1] - x[,2]*betastar - x[,3] - x[,4])*x[,5]
m2 <- (x[,1] - x[,2]*betastar - x[,3] - x[,4])*x[,6]
f <- cbind(m1,m2)
return(f)
}
ii=4
samples <- replicate(ii, apply(xx, 2, sample, replace = TRUE))

coefk <- rep(0,ii)
sdk <- rep(0,ii)

for (i in 1:ii) {
xx <- samples[,,i]
k <-  gmm(fun, x=xx, 0, optfct="optim", lower = 0, upper = 2, method="Brent")
coefk[i] <- coef(k)
sdk[i] <- sqrt(k\$vcov)[1,1]
}
``````
-
may you explain me `samples[,,i]` as the result of apply ? Does that mean that samples is an object which has `i` "versions" and each time I have to use the `ith` of them ? –  Bob Apr 16 '14 at 13:09
`class(samples)` is `"array"`. What you produce is a 3 dimensional array. the first 2 dimensions, are the dimensions of your sample. The third dimension, are the individual bootstrappings... –  Toby Apr 16 '14 at 13:13
As I guess. And why did you write `k <- gmm(fun, x=xx, 0, optfct="optim", lower = 0, upper = 2, method="Brent")` above the loop ? And may you confirm the `apply(xx, 2, sample, replace = TRUE)` resample just within each column ? Just having a little doubt about that. Thank you –  Bob Apr 16 '14 at 13:19
deleted the line. tis not necessary. you are right. your bootstrapping method is a valid selection to do this, yes. –  Toby Apr 16 '14 at 13:33
Well, I suppose it works. now I have to check how it performs with 4000 observations and 20 variables.. thanks ! –  Bob Apr 16 '14 at 13:42