[R] Getting all possible contingency tables
(Ted Harding)
Ted.Harding at wlandres.net
Sat Dec 1 17:00:24 CET 2012
You will need to be clear about whether you are conditioning on
the marginal totals as well as on the overall total. As stated,
you are only asking for the overall total (36) to be fixed.
In that case, one possible (and by no means unique) approach
would be to:
[A]: Choose any four "random integers" a,b,c,d that add up to 36
(even there, you still have to make a choice about what distribution
to adopt for the "random integers").
[B]: Place the results into the 2x2 matrix; then evaluate chi-squared.
[C]: Repeat until you have enough cases.
Example (using equiprobable multinomial to generate 4 "random integers")
Tab <- matrix(rmultinom(1,36,c(1,1,1,1)/4), nrow=2)
A more specific choice would be to fix the row and column probablilties
(but not the sample row and column totals), e.g.:
P.row1 <- 0.25 ; P.row2 <- 1 - P.row1
P.col1 <- 0.50 ; P.col2 <- 1 - P.col1
Then, adopting the hypothesis of independence between rows and columns:
P11 <- P.row1*P.col1
P21 <- P.row2*P.col1
P12 <- P.row1*P.col2
P22 <- P.row2*P.col2
Tab <- matrix(rmultinom(1,36,c(P11,P21,P12,P22)), nrow=2)
On the other hand, if you want to also fix the sample row margins
and column margins, then your sampled table needs to be generated
using a hypergeometric distribution, (which is the basis of the
fisher.test mentioned by Bert Gunter). Since explaining how to
do this is a bit mjore complicated than the above, please first
confirm what constraints (e.g. only total count; row-margins
only; col-margins only; both row- & col-margins) you wich to impose.
Hoping this helps,
Ted.
On 01-Dec-2012 14:28:24 Christofer Bogaso wrote:
> Thanks Bert for your reply.
>
> I am trying to understand/visualize the Sample Chi-Squared Statistic's
> Null distribution. Therefore I need all possible Contingency tables
> under Independence case.
>
> What could be better way to visualize that?
>
> Thanks and regards,
>
> On 01 December 2012 20:03:00, Bert Gunter wrote:
>> Christopher:
>>
>> Don't do this!
>>
>> If I understand you correctly, you want FIsher's exact test. This is
>> already available in R, using far smarter algorithms then you would. See:
>>
>> ?fisher.test
>>
>> -- Bert
>>
>> On Sat, Dec 1, 2012 at 5:48 AM, Christofer Bogaso
>> <bogaso.christofer at gmail.com <mailto:bogaso.christofer at gmail.com>> wrote:
>>
>> Thanks John for your reply. However still not clear how I should
>> proceed.
>>
>> My goal is to generate all possible contingency tables. Basically
>> I want to see the distribution of Chi-squared Statistic under
>> independence (NULL).
>>
>> So I was thinking if I can generate all possible permutation of
>> integer numbers having sum equal to (8 + 10 + 12 + 6) = 36. Is
>> there any R function to do that?
>>
>> Thanks and regards,
>>
>>
>> On 01-12-2012 18:39, John Kane wrote:
>>
>> Are you basically asking for all possible permutations of the
>> table? If so see ?permn in the combinat package.
>>
>> John Kane
>> Kingston ON Canada
>>
>>
>> -----Original Message-----
>> From: bogaso.christofer at gmail.com
>> <mailto:bogaso.christofer at gmail.com>
>> Sent: Sat, 01 Dec 2012 18:10:15 +0545
>> To: r-help at r-project.org <mailto:r-help at r-project.org>
>> Subject: [R] Getting all possible contingency tables
>>
>> Hello all,
>>
>> Let say I have 2-way contingency table:
>>
>> Tab <- matrix(c(8, 10, 12, 6), nr = 2)
>>
>> and the Chi-squared test could not reject the independence:
>>
>> > chisq.test(Tab)
>>
>> Pearson's Chi-squared test with Yates'
>> continuity correction
>>
>> data: Tab
>> X-squared = 1.0125, df = 1, p-value = 0.3143
>>
>>
>> However I want to get all possible contingency tables
>> under this
>> independence scenario (one of them would obviously be the
>> given table
>> as, we could not reject the independence), and for each
>> such table I
>> want to calculate the Ch-sq statistic.
>>
>> Can somebody help me how to generate all such tables?
>>
>> Thanks and regards,
-------------------------------------------------
E-Mail: (Ted Harding) <Ted.Harding at wlandres.net>
Date: 01-Dec-2012 Time: 16:00:16
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