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This is regarding the R code as posted by the user eyjo on Oct 4 '10 at 15:48. I have a question related to the code associated with finding the Var(alpha1hat). As per Madalla (1983) the formula for finding Var(alpha1hat) is as following:

Var(alpha1hat)= c*{(H'X'XH)^-1}+{(gamma1*sigma2)^2}{(H'X'XH)^-1}{H'X'XV0X'XH}*{(H'X'XH)^-1} for model 3 i.e. when y1 is observed and y2 is dichotomous.

However, as per the posted code (by the user eyjo) the formula used is as following: Var(alpha1hat)= c*{(H'X'XH)^-1}+{(gamma1)^2}{(H'X'XH)^-1}{H'X'XV0X'XH}*{(H'X'XH)^-1}

Here, in the 2nd part of the expression it is (gamma1)^2 (which is same formula as given for model 2 where y1 is observed and y2 is censored) is used instead of (gamma1*sigma2)^2. Is this because y2 is dichotomous, and therefore, its variance Var(v2)=(sigma2)^2 is normalized to 1? Also are the formulas for c and d as used in the code correct, i.e., c=sigma1sq - 2 * gamma1 * sigma12 and d=gamma2 ^ 2 * sigma1sq - 2 * gamma2 * sigma12, or, the formulas for c and d should be as given in page#245 of Madalla(1983), provided sigma2 is not normalized to 1?

It would be really very helpful if someone can clarify.

Please help. Thank you in advance for your help.



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I'm unsure how this is related to programming? Perhaps your question would be better addressed somewhere else? Perhaps or maybe – Roman Luštrik May 31 '11 at 6:29
Yup, an admin should migrate this post and the answer over to – Brandon Bertelsen Jun 1 '11 at 2:16

1 Answer 1

up vote 2 down vote accepted

You are referring to my answer here. As stated in the answer, it is an implementation of Amemiya (1978). The answer to your question is; Amemiya assumes a normalization condition: sigma_22 = 1 (see page 1195 in Amemiya, 1978). This reduces the calculations from what Maddala shows in his textbook into what you see in the code.

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Thank you so much eyjo. It is helpful. – Bond Tiger Jun 1 '11 at 20:54

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