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I have a huge data which has about 2,000 variables and about 10,000 observations. Initially, I wanted to run a regression model for each one with 1999 independent variables and then do stepwise model selection. Therefore, I would have 2,000 models.

However, unfortunately R presented errors because of lack of memory.. So, alternatively, I have tried to remove some independent variables which are low correlation value- maybe lower than .5-

With variables which are highly correlated with each dependent variable, I would like to run regression model..

I tried to do follow codes, even melt function doesn't work because of memory issue.. oh god..




#it doesn't work with my own data..because of lack of memory.

Please help me.. and thank you so much in advance..!

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consider looking into the glmnet package as a more principled, and more efficient, way of handling this problem ... – Ben Bolker Sep 27 '13 at 20:25
thank you for kind comments! I just quickly take a look at it. but I could not clearly understand what is "lasso or elastic-net regulariza- tion path" mean.. – user976856 Sep 27 '13 at 20:32
see chapter 3 of www-stat.stanford.edu/~tibs/ElemStatLearn (not necessarily an easy read but well worth the investment if you're going to work in this area ...) – Ben Bolker Sep 27 '13 at 21:13
I don't think the goals are expressed coherently. The distinction between dependent and independent variables appears fuzzy. – 42- Sep 27 '13 at 22:29
Dwin, yes all 2000 variables could be dependent variable itself for one model and could be one of the independent variables for other 1999 models. I understand what you meant – user976856 Sep 28 '13 at 3:22

In such a situation if might be worth trying sparsity inducing techniques such as the Lasso. Here a sparse subset of variables is selected by constraining the sum of absolute values of the regression coefficients.

This will give you a reduced subset of variables which are the most relevant (and due to the nature of the Lasso algorithm also the most correlated, which was what you were looking for)

In R you can use the LARS package and information about the Lasso can be found here: http://www-stat.stanford.edu/~tibs/lasso.html

Also a very good resource is: http://www-stat.stanford.edu/~tibs/ElemStatLearn/

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