# Nonlinear least squares in Stata, how to model summation over variables/sets?

I would like to estimate the following function by nonlinear least squares using Stata:

I am testing the results of another papper and would like to use Stata since it is the same software/solver as they used in the paper I am replicating and because it should be easier to do than using GAMS, for example.

My problem is that I cannot find any way to write out the sum part of the equation above. In my data all i's have are a single observation with the values for the j's in separate variables. I could write out the whole expression in the following manner (for three observations/i's):

``````nl (ln_wage = {alpha0} + {alpha0}*log( ((S_over_H_1)^{alpha2})*exp({alpha3}*distance_1) + ((S_over_H_2)^{alpha2})*exp({alpha3}*distance_2) + ((S_over_H_1)^{alpha2})*exp({alpha3}*distance_1) ))
``````

Is there a simple way to tell Stata to sum over an expression/variables for a given set of numbers, like in GAMS where you can write:

``````lnwage(i) = alpha0 + alpha1*ln(sum((j), power(S_over_H(i,j),alpha2) * exp(alpha3 * distance(i,j))))
``````
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## migrated from stats.stackexchange.comSep 15 '13 at 17:58

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There is no direct equivalent in Stata of the GAMS notation you cite, but you could do this

``````forval j = 1/3 {
local call `call' S_over_H_`j'^({alpha2}) * exp({alpha3} * distance_`j')
}

nl (ln_wage = {alpha0} + {alpha1} * ln(`call')
``````

P.S. please explain what GAMS is.

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Thanks! I feared that using local macros was the only way of achieving this. I have around 420 elements in j, so the length of the macro would probably be to long. The answer is probably to create a number of macros and include them in the nl-statement. As far as I know the nl-statement has no length-limit. GAMS is General Algebraic Modeling System, see gams.com – Jens Sep 16 '13 at 8:46
Macro length should not be a concern here. – Nick Cox Sep 16 '13 at 14:41
You are absolutely right. I don't know where I got the idea of limited length from. Thanks! – Jens Sep 16 '13 at 19:38