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I ran a model (latent class analysis) optimised using the EM algorithm. I got the beta coefficients, and I would like to compute the standar-error, p-value etc via bootstrap method for each coefficient. Any idea about how to achieve this in R?

The matrix of my coefficients is:

        [,"ASC"]            [,"distance"]       [,"cost"]
class 1 "0.467793060957115" "0.422297601453847" "-0.0895117948106473"
class 2 "5.89863431333838"  "0.1824261240747"   "-0.0288237316027786"
class 3 "0.832008955013527" "0.445282416476577" "-0.0242390845214957"

I now that in STATA I can achieve what I want with the following command (for the cost coefficient - third column in the matrix above):

bootstrap t=r(mean), rep(1000): sum cost

The above STATA command gives the following results:

Bootstrap results                               Number of obs      =         3
                                                Replications       =      1000

      command:  summarize costo
            t:  r(mean)

------------------------------------------------------------------------------
             |   Observed   Bootstrap                         Normal-based
             |      Coef.   Std. Err.      z    P>|z|     [95% Conf. Interval]
-------------+----------------------------------------------------------------
           t |  -.0473333   .0175933    -2.69   0.007    -.0818155   -.0128512
------------------------------------------------------------------------------
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see the boot and/or simpleboot packages ... –  Ben Bolker Apr 14 '12 at 14:56
1  
I'm having difficulty imagining a scenario where bootstrapping would solve statistical issues regarding sample sizes of three. Doing a bootstrap analysis 1000 times does not add precision if there are only 3 observations. –  BondedDust Apr 15 '12 at 23:05
    
@DWin I was wondering the same! –  danfreak Apr 16 '12 at 8:58
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