[R] Boostrap p-value in regression [indirectly related to R]

Viechtbauer Wolfgang (STAT) Wolfgang.Viechtbauer at STAT.unimaas.nl
Mon May 21 16:41:18 CEST 2007 

Hello All,

Despite my preference for reporting confidence intervals, I need to
obtain a p-value for a hypothesis test in the context of regression
using bootstrapping. I have read John Fox's chapter on bootstrapping
regression models and have consulted Efron & Tibshirani's "An
Introduction to the Bootstrap" but I just wanted to ask the experts here
for some feedback to make sure that I am not doing something wrong.

Let's take a simplified example where the model includes one independent
variable and the idea is to test H0: beta1 = 0 versus Ha: beta1 != 0.

########################################################

### generate some sample data

n  <- 50
xi <- runif(n, min=1, max=5)
yi <- 0 + 0.2 * xi + rnorm(n, mean=0, sd=1)

### fit simple regression model

mod <- lm(yi ~ xi)
summary(mod)
b1  <- coef(mod)[2]
t1  <- coef(mod)[2] / coef(summary(mod))[2,2]

### 1000 bootstrap replications using (X,Y)-pair resampling

t1.star <- rep(NA,1000)

for (i in 1:1000) {

  ids        <- sample(1:n, replace=TRUE)
  newyi      <- yi[ids]
  newxi      <- xi[ids]  
  mod        <- lm(newyi ~ newxi)
  t1.star[i] <- ( coef(mod)[2] - b1) / coef(summary(mod))[2,2]

}

### get bootstrap p-value

hist(t1.star, nclass=40)
abline(v=t1, lwd=3)
abline(v=-1*t1, lwd=3)
2 * mean( t1.star > abs(t1) )

########################################################

As suggested in the chapter on bootstrapping regression models by John
Fox, the bootstrap p-value is 2 times the proportion of bootstrap
t-values (with b1 subtracted so that we get the distribution under H0)
larger than the absolute value of the actual t-value observed in the
data. 

Doesn't this assume that the bootstrap sampling distribution is
symmetric? And if yes, would it then not be more reasonable to
calculate:

mean( abs(t1.star) > abs(t1) )

or in words: the number of bootstrap t-values that are more extreme on
either side of the bootstrap distribution than the actual t-value
observed?

Any suggestions or comments would be appreciated!

-- 
Wolfgang Viechtbauer 
 Department of Methodology and Statistics 
 University of Maastricht, The Netherlands 
 http://www.wvbauer.com

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