[R] p-values
Peter Ho
peter at estg.ipvc.pt
Mon Aug 8 17:26:55 CEST 2005
Spencer,
Thank you for referring me to your other email on Exact goodness-of-fit
test. However, I'm not entirely sure if what you mentioned is the same
for my case. I'm not a statistician and it would help me if you could
explain what you meant in a little more detail. Perhaps I need to
explain the problem in more detail.
I am looking for a way to calculate exaxt p-values by Monte Carlo
Simulation for Durbin's test. Durbin's test statistic is similar to
Friedman's statistic, but considers the case of Balanced Incomplete
block designs. I have found a function written by Felipe de Mendiburu
for calculating Durbin's statistic, which gives the chi-squared p-value.
I have also been read an article by Torsten Hothorn "On exact rank Tests
in R" (R News 1(1), 11–12.) and he has shown how to calculate Monte
Carlo p-values using pperm. In the article by Torsten Hothorn he gives:
R> pperm(W, ranks, length(x))
He compares his method to that of StatXact, which is the program Rayner
and Best suggested using. Is there a way to do this for example for the
friedman test.
A paper by Joachim Rohmel discusses "The permutation distribution for
the friendman test" (Computational Statistics & Data Analysis 1997, 26:
83-99). This seems to be on the lines of what I need, although I am not
quite sure. Has anyone tried to recode his APL program for R?
I have tried a number of things, all unsucessful. Searching through
previous postings have not been very successful either. It seems that
pperm is the way to go, but I would need help from someone on this.
Any hints on how to continue would be much appreciated.
Peter
Spencer Graves wrote:
>Hi, Peter:
>
> Please see my reply of a few minutes ago subject: exact
>goodness-of-fit test. I don't know Rayner and Best, but the same
>method, I think, should apply. spencer graves
>
>Peter Ho wrote:
>
>
>
>>HI R-users,
>>
>>I am trying to repeat an example from Rayner and Best "A contingency
>>table approach to nonparametric testing (Chapter 7, Ice cream example).
>>
>>In their book they calculate Durbin's statistic, D1, a dispersion
>>statistics, D2, and a residual. P-values for each statistic is
>>calculated from a chi-square distribution and also Monte Carlo p-values.
>>
>>I have found similar p-values based on the chi-square distribution by
>>using:
>>
>> > pchisq(12, df= 6, lower.tail=F)
>>[1] 0.0619688
>> > pchisq(5.1, df= 6, lower.tail=F)
>>[1] 0.5310529
>>
>>Is there a way to calculate the equivalent Monte Carlo p-values?
>>
>>The values were 0.02 and 0.138 respectively.
>>
>>The use of the approximate chi-square probabilities for Durbin's test
>>are considered not good enough according to Van der Laan (The American
>>Statistician 1988,42,165-166).
>>
>>
>>Peter
>>--------------------------------
>>ESTG-IPVC
>>
>>______________________________________________
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>>
>>
>
>
>
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