Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

I make a simple cointegration function using add.test from tseries packages

cointegration <- function(vals)
{
    library(tseries)

    beta <- coef(lm(vals[,2] ~ vals[,1] + 0, data = vals))[1]
    names(beta) <- NULL
    res <- adf.test(vals[,2] - beta*vals[,1], alternative = "stationary", k = 0)
    return( list(beta = beta, p.value = res$p.value) )
}

Apparently, adf.test has a lower bound of printed p-value at 0.01. Any value smaller p-value will create a warning message:

Warning message:
In adf.test(vals[, 2] - beta * vals[, 1], alternative = "stationary",  :
  p-value smaller than printed p-value

Is it possible to have adf.test print out more precise p-value instead?

I know the alternative way is to suppress the warning message:

res <- suppressWarnings(adf.test(vals[,2] - beta*vals[,1],
                        alternative = "stationary", k = 0))

But printing more precise p-value would be nice.

Thanks

share|improve this question
    
Please inculde your data sample to make your problem reproducible. –  tonytonov Feb 26 '14 at 8:00

1 Answer 1

up vote 1 down vote accepted

From the help file of ?adf.test:

The p-values are interpolated from Table 4.2, p. 103 of Banerjee et al. (1993). If the computed statistic is outside the table of critical values, then a warning message is generated.

So the short answer is no, you cannot get "more precise" p-values. At least not directly. Anyway, usually it does not make much sense to report anything other than p<0.01.

If you really want to get the "exact" p-value, you should probably look at the reference below. I don't have access to it, but they probably explain how they came up with their "table of critical values", so it might be possible to extend it.

A. Banerjee, J. J. Dolado, J. W. Galbraith, and D. F. Hendry (1993): Cointegration, Error Correction, and the Econometric Analysis of Non-Stationary Data, Oxford University Press, Oxford.

share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.