# Estimate multiple Regression Models for groups and save a certain parameter value

I looking for a way to estimate various models (lets say 10) and save a certain parameter value from each estimation in a vector with stata.

Im more of a R-guy and here it is very simple working example with R-code

``````n1 <- 100
n2 <- 10
group <- rep(1:10,each=n1)
data <- as.data.frame(cbind(rnorm(n1*n2,0,1),rnorm(n1*n2,0,1),group))
dimnames(data)[[2]] <- c("y","x","group")
val <- names(table(group))
estimates <- vector(mode="numeric",length=length(val))

for( i in 1:length(val)){
j <- which(data\$group==val[i])
estimates[i] <- coef(lm(y[j] ~ x[j], data=data))[2]
}
``````

Alternatively

``````library(nlme)
mod1 <- lmList(y~x | group, data=data)
coef(mod1)[,2]
``````

And yes, unfortunately I need to use stata :-(

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is `statsby` the right approach? –  Druss2k Jan 17 '13 at 14:12
Your question is posed as if it were aimed at people fluent in both R and Stata, so that they can understand the R code and immediately translate to a Stata equivalent. Also your personal dig at Stata, however humorously intended, is not well advised. A better tactic would be to show also your Stata code so far, so that Stata people can see quickly what you are trying to do. But yes: if your models are fitted separately to different subsets, then `statsby` is a good approach to collate parameter estimates. –  Nick Cox Jan 17 '13 at 14:30
It was not my intention to nag at someone. But I assumed that if I post the hole R-code as a example the logical response would be "Why dont you do it in R?" The reason I posted the R-code at all is that I wanted to provide some kind of example. –  Druss2k Jan 18 '13 at 0:25

What is you ultimate objective? The paradigms of Stata and R are different, so knowing the ultimate goal would help. In R I tend to think in terms of vectors, but not in Stata (vectors don't really exist in Stata). If you want a table, then I suggest the `estout` package from SSC (`ssc install estout`). If just want the coefficients as an end in themselves, then I suggest `statsby`.

``````clear
version 11.2
set seed 2001

set obs 1000
generate y = rnormal()
generate x = rnormal()
generate group = 1 + floor((_n - 1) / 100)

* if you want a table
* you'll need the estout package from SSC (ssc install estout)
eststo clear
forvalues i = 1/10 {
eststo : regress y x if (group == `i')
}
esttab

* if you just the coefficients
statsby, by(group) clear : regress y x
list
``````

Both `esttab` and `statsby` have lots of options, so check out the help files.

Update: It seems you want time series betas by group (here a firm). In terms of economics I think you would want rolling regressions, but this framework should get you started.

``````clear
version 11.2
set seed 2001

set obs 1000
generate y = rnormal()
generate x = rnormal()
generate firm = 1 + floor((_n - 1) / 100)
generate year = 1 + mod((_n - 1), 100)

* regress by firm
xtset firm year
statsby _b, by(firm) saving(temp, replace) : regress y x

* then merge back
merge m:1 firm using temp
list in 1/20
``````
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Hi. My ultimate goal is to regress a variable y on a variable x. Then I want to repeat this procedure as many times as I have groups within my data. Subsequently the slope estimates of this calculations are supposed to be stored somewhere such that I can access them to perform a additional regression. This regression will be a pooled version of a variable which will then be regressed onto this coefficients recieved from the previous regression. The reason I strugle is that I do rather good in R but cannot "speak" stata at all. I already noticed that the paradigm is very different –  Druss2k Jan 18 '13 at 0:31
This supports the suggestions of Richard Herron and myself: look at `statsby` in particular. –  Nick Cox Jan 18 '13 at 0:56
@Druss2k What defines your individual and time for `xtreg`? Does this technique have a name or reference? –  Richard Herron Jan 18 '13 at 2:09
Then I don't think you want `xtreg`. I will update. –  Richard Herron Jan 18 '13 at 2:26
I haven't used `xtgls`, but that does feasible GLS on a panel. With `statsby` you no longer have a panel -- you're running individual time series regressions. In finance I see Newey-West standard errors or clustering more often than I see FGLS. –  Richard Herron Jan 18 '13 at 4:32

This calls for a multilevel model in which level-1 regression is your firm-level regression, and level-2 regression is the regression explaining variability between the group slopes. What you are doing is overly cumbersome, and would not give you the right standard errors, anyway. This most clearly implemented via `gllamm`, although you can probably twist the hands of `xtmixed` to do that, too.

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Very true. Only problem is that my college is kind of stubborn. I would not favor the method I described earlier too. –  Druss2k Jan 18 '13 at 16:16
@Druss2k The method you described is very common in finance (along with time-series averages of cross-sectional regression coefficients). That they beta from the first-stage is estimated doesn't necessarily affect the second stage, right? If your beta estimation error is white noise, then you have an errors-in-variables problem, which would bias-down your second stage coefficients, but is unavoidable. –  Richard Herron Jan 18 '13 at 16:24
But if I would pick a method my guess is I would go with something mixed effect modelling related too. I dont quite get why someone would choose something different in this particular example. Honestly I'm not quite sure how the seocond stage will affect the first stage since (I did not mention this before) the independent variable from which we pick the beta coef. from the second stage is the dependend variable of the first stage. This could induce some sort of bias related to endogenity. –  Druss2k Jan 18 '13 at 20:11
Richard, by estimating everything simultaneously, you can both avoid the attenuation bias, and get the standard errors right. If the finance people don't do this, it is beyond me. At the very least, corrections for the standard errors for generated regressors have been out for a quarter century, see jstor.org/stable/1391724. –  StasK Jan 18 '13 at 20:40
Thanks for the link, @StasK. I will check this out. Wait until you find out about Fama and MacBeth (1973) regressions. :) –  Richard Herron Jan 18 '13 at 21:18