Someone wrote to me with a statement that represents a commonly held, but false belief. He stated, in effect, that a p-value of 0.06 means that there is only a 6% probability that the null hypothesis is true.
While the p-value is indeed a probability, it represents effectively a probability about the data, given that the null hypothesis is true. The statement above is effective a statement about the probability that the null hypothesis is true, given the data. It’s a rather subtle reversal of a conditional probability, but one with important ramifications.
The only way that you can compute a probability for the null hypothesis is to use Bayesian statistics. This involve specifying a prior probability for the null hypothesis, something that is quite controversial.
Bayesians delight in computing things like the probability that the sun will rise tomorrow. It takes a different way of looking at things, but I have found that the Bayesian approach becomes more attractive for some of the more complex problems in Statistics.
I have a bibliography of references on p-values (and confidence intervals), and have made a feeble attempt to accumulate a few references about Bayesian statistics. When I get the time, I would like to write a page on some simple Bayesian models. There is an entire software program devoted to Bayesian analysis, BUGS (Bayesian inference Using Gibbs Sampling):
- The BUGS Project. Stevens A, Hosted by the MRC Biostatistics Unit, Cambridge, UK. Accessed on 2005-01-18. www.mrc-bsu.cam.ac.uk/bugs/welcome.shtml
The Edstat-l listserv has had an active debate about the weaknesses of p-values and null hypothesis significance testing starting in late December.
You can find an earlier version of this page on my original website.