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I would like to estimate the 4-parameters that minimises the log-likelihood function LogL(\theta). The first two parameters (a and sigma) are positive; the third one is unconstrained and the last one should be leas than the minimum value in the data. So, I tried to use nlminb function and write it as:

nlminb(start=c(a=0.13,mu=1,sigma=31,xi=0.01),f,lower=c(0.0001,0,0.123,0.01210),
upper=c(2,18.21,50,0.95),control=list(eval.max=100, iter.max=100))

I got a good result, but there is still problem that the estimator of mu take the same value of the upper limit for all the values I try to use and for xi, it take the same lower value even If I change the starting values.

The log likelihood function take form:

-loglik=-n*log(a)+n*log(1-exp(-1))+n*log(sigma) -(a-1)*sum(log(x-mu))+(1/xi+1)*sum(log(1+xi*((x-mu)**a)/sigma))+ sum((1+xi*((x-mu)**a)/sigma)*(-1/xi))

I have another condition that x-mu should be positive and 1+xi*((x-mu)*a)/sigma as well

Any suggestion will be appreciated

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I tried to use optim and nlm, but they didn't work. Also, I can't get stable solution. –  S Eljabri Oct 31 '12 at 15:59
    
the log likelihood function take form: -loglik=-nlog(a)+nlog(1-exp(-1))+n*log(sigma) -(a-1)*sum(log(x-mu))+(1/xi+1)*sum(log(1+xi*((x-mu)**a)/sigma))+ sum((1+xi*((x-mu)**a)/sigma)**(-1/xi)). So, I've another condition that x-mu should be positive and 1+xi*((x-mu)**a)/sigma as well. –  S Eljabri Oct 31 '12 at 16:01
    
Don't add comments to your own questions - just edit the question –  csgillespie Oct 31 '12 at 16:16
    
    
You can see a worked example of a triangular constraint implemented here: stackoverflow.com/questions/5436630/… . I cannot tell whether 1+xi*((x-mu)*a)/sigma > 0 would be even a linear constraint, so you may need other methods, which was why I posted the link to the Task View first. –  BondedDust Oct 31 '12 at 16:56

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