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I'm a R novice but I'm looking for a way to determine the three parameters A, B and C related by the following function in R:

y = A * (x1^B) * (x2^C)

Can someone give me some hints about R method(s) that would help me to achieve such a fitting?

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What is the error distribution that you can assume? i.e. is it normal, log-normal, Cauchy, etc. etc.? Are errors in different observations correlated with each other? While nls may fit your bill, it may also give you biased and inefficient estimates. Without the error model, you're literally groping in the dark. –  Deer Hunter Dec 13 '12 at 9:54

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up vote 4 down vote accepted

One option is the nls function as @SvenHohenstein suggested. Another option is to convert your nonlinear regression into a linear regression. In the case of this equation just take the log of both sides of the equation and do a little algebra and you will have a linear equation. You can run the regression using something like:

fit <- lm( log(y) ~ log(x1) + log(x2), data=mydata)

The intercept will be log(A) so use exp to get the value, the B and C parameters will be the 2 slopes.

The big difference here is that nls will fit the model with normal errors added to the original equation and the lm fit with logs assumes that the errors in the original model are from a lognormal distribution and are multiplied instead of added to the model. Many datasets will give similar results for the 2 methods.

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I don't know if it's possible to get an estimate of the parameter B since x1 is a constant in my model. I'm always getting: Coefficients: (1 not defined because of singularities) –  Yann Dec 20 '12 at 19:10
    
@Yann, if x1 is constant then you could either leave it out in the 'lm' case, or use offset to include it with a B value of 1 (or other prespecified value). –  Greg Snow Dec 20 '12 at 19:28

You could fit a nonlinear least-squares model with the function nls.

nls(y ~ A * (x1^B) * (x2^C))
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You should give starting values for this to work well. –  Roland Dec 13 '12 at 9:44
    
And if this should happen to be homework, beware the perfect dataset. As per ?nls , it won't converge unless there's noise in the data. –  Carl Witthoft Dec 13 '12 at 12:28
    
Maybe I should mention that my x1 is a constant and therefore always get this error: singular gradient matrix at initial parameter estimates –  Yann Dec 20 '12 at 19:08
    
@Yann I suppose two vectors (i.e., y and x2) are insufficient for estimating three parameters. You might wish to consider using a simpler model. –  Sven Hohenstein Dec 20 '12 at 19:13

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