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I am looking to make ks.test in order to compare between two distributions. Therefore here is the way how I proceeded:

  1. I loaded vec1 from a file, length(vec1) = 720642 : which is a too big data set.

  2. I applied fitdistr(vec1,"lognormal") -> Here I get the most suited meanlog=1.69 and sdlog=1.02 that best fits the distribution of vec1

  3. When I simply apply :

    ks.test(vec1, "plnorm", 1.69, 1.02)

    I get: D = 0.1429, p-value < 2.2e-16 alternative hypothesis: two-sided

So the test fails and it is like I am not dealing with a lognormal distribution ....

Has anyone the solution for that? Is it because I've loaded from the file a huge data set?

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If the sample size is big, the ks test will find very small deviations from the assumed distribution. Furthermore, ?ks.test states "If a single-sample test is used, the parameters specified in ... must be pre-specified and not estimated from the data. There is some more refined distribution theory for the KS test with estimated parameters (see Durbin, 1973), but that is not implemented in ks.test." –  Roland Sep 17 '12 at 14:26
    
@Roland this means that there is no way that ks.test will give an accurate result with a big number of samples ? You said: the parameters specified in ... must be pre-specified and not estimated from the data. I actually tried ks.test(vec1, vec2) such that vec2 follows the lognormal distribution having for parameters the cited meanlog and sdlog, and its size is the same as vec1, but always the same result ... Any help ? thanks. –  user764186 Sep 18 '12 at 7:34
    
I suggest to turn this in a statistical question like so: 'I want to test if a large sample is from a log-normal distribution. ?ks.test says ... What is the best way to procede.' (Put a bit more effort into formulating your questions and do some research first.) and post it on Cross Validated. –  Roland Sep 18 '12 at 7:40

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