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I've got a model that looks (in part) like this: m = lm(log(y)~ID+x), which give me the following error:

Error in rep.int(c(1, numeric(n)), n - 1L) : 
  negative length vectors are not allowed

y is 500,000 long, and ID is a factor with 60,000 levels. 500Kx60K >2^31, which is R's object size limit.

If I upgrade to the new R (3.0.1), will this problem be solved? or does the error message come from somewhere else? (I'm not entirely clear on how to upgrade R from Ubuntu 13.04, which I use.)

EDIT: The factor is in fact not meant to be interpretable. The factor is akin to a de-meaning in a "fixed-effects" regression. The other components of the model (x) are of interest. The question is: what is the response of y to a change in x, controlling for unobservable time-invariant heterogeneity? The dataset is a panel. I should add that I am not using plm because the main model of interest will be a random coefficients model or a generalized additive model. I'd prefer not to have to manually fix the standard errors after a manual de-meaning, and I'd like to get a fitted model object to use in a monte-carlo analysis.

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I think you'll be much better off converting your factor into something with many, many fewer levels. A variable like that will almost never be useful. Even if you manage to get the model to run, the results won't be meaningful or informative. –  joran Jun 30 '13 at 16:43
    
The factor is in fact not meant to be interpretable. The factor is akin to a de-meaning in a "fixed-effects" regression. The other components of the model (not listed here because they aren't relevant to to problem) are of interest. The question is: what is the response of y to a change in x, controlling for unobservable time-invariant heterogeneity? The dataset is a panel. To understand these sorts of models, consult an econometrics text. –  ACD Jun 30 '13 at 16:54
    
I should add that I am not using plm because the main model of interest will be a random coefficients model or a generalized additive model. I'd prefer not to have to manually fix the standard errors after a manual de-meaning, and I'd like to get a fitted model object to use in a monte-carlo analysis. And yes, I am working on a cluster computer that can handle that kind of memory. –  ACD Jun 30 '13 at 16:56
    
have you tried sparse model matrices? There was a recent question on SO saying that they didn't work (as well as I would have expected, at least), but it would seem worth investigating. –  Ben Bolker Jun 30 '13 at 17:31

1 Answer 1

To answer the limited question, yes, that number of levels is less than the new limit on the size of vectors which is the mantissa size (or to use the word preferred by the IEEE Committee, "significand") for numeric class (64-bit floating point) variables:

>  500000*60000 > 2^32
[1] TRUE
> 500000*60000 > 2^52
[1] FALSE

To address the larger question. I doubt upgrading would solve that problem. That is not the error message I would have expected for an overflow on assignment to a vector caused by an over-sized index:

a <- numeric(10)
> a[ 2^56] <- 0
Error in a[2^56] <- 0 : vector is too large

... so I'm guessing your guess about the source of the error is incorrect. You have logs in your model and getting negative values after logged variables is to be expected.

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