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I'm trying to estimate a dif-in-dif-regression with time fixed and firm fixed effects. My model consists of a dummy for the treatment group (treat), a dummy for the days during which the treatment was active (ban), the dif-in-dif estimator (treat.ban) which is the product of the other two dummies (treat * ban) and some control variables.

When I estimate the model without fixed effects it works fine. Including fixed effects leads to the following warning:

Warning message: In chol.default(mat, pivot = TRUE, tol = tol) : the matrix is either rank-deficient or indefinite

See the regression summary with some sample data (note that with the original sample results are more plausible, but I still face the problem of NAs in the coefficients of the treat and the ban dummies):

library(lfe)
library(dplyr)

reg1 <- felm(dynmes ~ treat + ban + treat.ban + log(total.assets) 
             + market.to.book + leverage | symbol + date,
             data = temp)

> summary(reg1)

Call:
   felm(formula = dynmes ~ treat + ban + treat.ban + log(total.assets) + 
                  market.to.book + leverage | symbol + date, data = temp) 

Residuals:
      Min        1Q    Median        3Q       Max 
-0.052129 -0.024407 -0.002392  0.019482  0.075099 

Coefficients:
                  Estimate Std. Error t value Pr(>|t|)  
treatTRUE               NA         NA      NA       NA  
banTRUE                 NA         NA      NA       NA  
treat.banTRUE     0.037566   0.020848   1.802   0.0761 .
log(total.assets)       NA         NA      NA       NA  
market.to.book    0.199361   0.081149   2.457   0.0167 *
leverage          0.004716   0.009160   0.515   0.6084  
---
Signif. codes:  0 ‘***’ 0.001 ‘**’ 0.01 ‘*’ 0.05 ‘.’ 0.1 ‘ ’ 1

Residual standard error: 0.03534 on 66 degrees of freedom
Multiple R-squared(full model): 0.892   Adjusted R-squared: 0.838 
Multiple R-squared(proj model): 0.1625   Adjusted R-squared: -0.2563 
F-statistic(full model):16.52 on 33 and 66 DF, p-value: < 2.2e-16 
F-statistic(proj model): 2.134 on 6 and 66 DF, p-value: 0.06093 


Warning message:
In chol.default(mat, pivot = TRUE, tol = tol) :
  the matrix is either rank-deficient or indefinite

My concern is that the dif-in-dif coefficient treat.ban may be biased as it may catch some of the effects that should actually be covered by the ban and the treat dummies. I guess that collinearity of the dummy variables causes this problem but I haven't found a way how to handle it. I've read the lfe vignettes and I've also tried to change the order in the second part of the formula (that is: ... | date + symbol) without succeeding. Further I've found some general advices on how to handle collinearity (e.g. this post on stackexchange), but no solution for my case.

I'm not sure if this question rather should be placed on stackexchange in case that it is a general statistical problem if one tries to include e.g. time fixed effects in a regression with a time dummy. But I guess it's more a computational or rather coding issue, which is why I post it here.

Here is a subsample of my orginal data set which I used for the regression example above (my original sample is about 200,000 rows which is why I use felm in the first place):

temp <- structure(list(symbol = c("AT_ABCB", "AT_ABCB", "AT_ABCB", "AT_ABCB", 
"AT_ABCB", "AT_ABCB", "AT_ABCB", "AT_ABCB", "AT_ABCB", "AT_ABCB", 
"AT_ABCB", "AT_ABCB", "AT_ABCB", "AT_ABCB", "AT_ABCB", "AT_ABCB", 
"AT_ABCB", "AT_ABCB", "AT_ABCB", "AT_ABCB", "AT_ABCB", "AT_ABCB", 
"AT_ABCB", "AT_ABCB", "AT_ABCB", "AT_ABCB", "AT_ABCB", "AT_ABCB", 
"AT_ACFC", "AT_ACFC", "AT_ACFC", "AT_ACFC", "AT_ACFC", "AT_ACFC", 
"AT_ACFC", "AT_ACFC", "AT_ACFC", "AT_ACFC", "AT_ACFC", "AT_ACFC", 
"AT_ACFC", "AT_ACFC", "AT_ACFC", "AT_ACFC", "AT_ACFC", "AT_ACFC", 
"AT_ACFC", "AT_ACFC", "AT_ACFC", "AT_ACFC", "AT_ACFC", "AT_ACFC", 
"AT_ACFC", "AT_ACFC", "AT_ACFC", "AT_ACFC", "AT_ACGL", "AT_ACGL", 
"AT_ACGL", "AT_ACGL", "AT_ACGL", "AT_ACGL", "AT_ACGL", "AT_ACGL", 
"AT_ACGL", "AT_ACGL", "AT_ACGL", "AT_ACGL", "AT_ACGL", "AT_ACGL", 
"AT_ACGL", "AT_ACGL", "AT_ACGL", "AT_ACGL", "AT_ACGL", "AT_ACGL", 
"AT_ACGL", "AT_ACGL", "AT_ACGL", "AT_ACGL", "AT_ACGL", "AT_ACGL", 
"AT_ACGL", "AT_ACGL", "AT_AFSI", "AT_AFSI", "AT_AFSI", "AT_AFSI", 
"AT_AFSI", "AT_AFSI", "AT_AFSI", "AT_AFSI", "AT_AFSI", "AT_AFSI", 
"AT_AFSI", "AT_AFSI", "AT_AFSI", "AT_AFSI", "AT_AFSI", "AT_AFSI"
), date = structure(c(14132, 14133, 14134, 14137, 14138, 14139, 
14140, 14141, 14144, 14145, 14146, 14147, 14148, 14151, 14152, 
14153, 14154, 14155, 14158, 14159, 14160, 14161, 14162, 14165, 
14166, 14167, 14168, 14169, 14132, 14133, 14134, 14137, 14138, 
14139, 14140, 14141, 14144, 14145, 14146, 14147, 14148, 14151, 
14152, 14153, 14154, 14155, 14158, 14159, 14160, 14161, 14162, 
14165, 14166, 14167, 14168, 14169, 14132, 14133, 14134, 14137, 
14138, 14139, 14140, 14141, 14144, 14145, 14146, 14147, 14148, 
14151, 14152, 14153, 14154, 14155, 14158, 14159, 14160, 14161, 
14162, 14165, 14166, 14167, 14168, 14169, 14132, 14133, 14134, 
14137, 14138, 14139, 14140, 14141, 14144, 14145, 14146, 14147, 
14148, 14151, 14152, 14153), class = "Date"), dynmes = c(0.1, 
0.11, 0.098, 0.087, 0.101, 0.128, 0.185, 0.262, 0.257, 0.226, 
0.201, 0.186, 0.178, 0.17, 0.208, 0.271, 0.271, 0.24, 0.233, 
0.202, 0.27, 0.26, 0.277, 0.362, 0.346, 0.315, 0.321, 0.354, 
0.031, 0.024, 0.038, 0.03, 0.028, 0.026, 0.077, 0.11, 0.146, 
0.128, 0.098, 0.123, 0.104, 0.086, 0.069, 0.114, 0.105, 0.166, 
0.165, 0.125, 0.108, 0.095, 0.104, 0.081, 0.143, 0.232, 0.225, 
0.219, 0.033, 0.032, 0.03, 0.028, 0.025, 0.034, 0.031, 0.04, 
0.046, 0.059, 0.055, 0.05, 0.046, 0.042, 0.042, 0.042, 0.039, 
0.037, 0.035, 0.038, 0.044, 0.048, 0.063, 0.062, 0.082, 0.081, 
0.081, 0.079, 0.049, 0.06, 0.06, 0.061, 0.061, 0.055, 0.058, 
0.053, 0.075, 0.068, 0.078, 0.093, 0.105, 0.09, 0.11, 0.119), 
    total.assets = c(2106528, 2106528, 2106528, 2106528, 2106528, 
    2106528, 2106528, 2106528, 2106528, 2106528, 2106528, 2106528, 
    2106528, 2106528, 2106528, 2106528, 2106528, 2106528, 2106528, 
    2106528, 2106528, 2106528, 2106528, 2106528, 2106528, 2106528, 
    2106528, 2106528, 931026, 931026, 931026, 931026, 931026, 
    931026, 931026, 931026, 931026, 931026, 931026, 931026, 931026, 
    931026, 931026, 931026, 931026, 931026, 931026, 931026, 931026, 
    931026, 931026, 931026, 931026, 931026, 931026, 931026, 15567216, 
    15567216, 15567216, 15567216, 15567216, 15567216, 15567216, 
    15567216, 15567216, 15567216, 15567216, 15567216, 15567216, 
    15567216, 15567216, 15567216, 15567216, 15567216, 15567216, 
    15567216, 15567216, 15567216, 15567216, 15567216, 15567216, 
    15567216, 15567216, 15567216, 2286292, 2286292, 2286292, 
    2286292, 2286292, 2286292, 2286292, 2286292, 2286292, 2286292, 
    2286292, 2286292, 2286292, 2286292, 2286292, 2286292), treat = c(TRUE, 
    TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, 
    TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, 
    TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, 
    TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, 
    TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, 
    TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, 
    TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, 
    TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, 
    TRUE, TRUE, TRUE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, 
    FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, 
    FALSE), ban = c(FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, 
    FALSE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, 
    TRUE, TRUE, TRUE, TRUE, TRUE, FALSE, FALSE, FALSE, FALSE, 
    FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, 
    FALSE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, 
    TRUE, TRUE, TRUE, TRUE, TRUE, FALSE, FALSE, FALSE, FALSE, 
    FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, 
    FALSE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, 
    TRUE, TRUE, TRUE, TRUE, TRUE, FALSE, FALSE, FALSE, FALSE, 
    FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, 
    FALSE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE
    ), treat.ban = c(FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, 
    FALSE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, 
    TRUE, TRUE, TRUE, TRUE, TRUE, FALSE, FALSE, FALSE, FALSE, 
    FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, 
    FALSE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, 
    TRUE, TRUE, TRUE, TRUE, TRUE, FALSE, FALSE, FALSE, FALSE, 
    FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, 
    FALSE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, TRUE, 
    TRUE, TRUE, TRUE, TRUE, TRUE, FALSE, FALSE, FALSE, FALSE, 
    FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, 
    FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, FALSE, 
    FALSE), market.to.book = c(0.913, 0.915, 0.91, 0.864, 0.938, 
    0.802, 0.995, 1.067, 1.047, 1.025, 0.993, 1.031, 0.99, 0.867, 
    1.051, 0.963, 0.983, 0.923, 0.913, 0.743, 0.79, 0.701, 0.919, 
    1.002, 0.954, 0.847, 1.006, 0.958, 1.192, 1.149, 1.15, 1.14, 
    1.131, 1.032, 0.939, 1.044, 1.013, 1.013, 1.103, 1.083, 1.071, 
    1.065, 1.179, 1.143, 0.992, 1.059, 1.059, 1.038, 1.06, 1.007, 
    1.004, 0.855, 1.077, 1.188, 1.082, 1.083, 1.15, 1.139, 1.142, 
    1.147, 1.214, 1.209, 1.279, 1.342, 1.234, 1.221, 1.228, 1.234, 
    1.224, 1.193, 1.218, 1.222, 1.205, 1.216, 1.179, 1.125, 1.078, 
    0.988, 0.958, 1.078, 1.04, 0.995, 0.959, 0.981, 1.93, 1.885, 
    1.841, 1.798, 1.805, 1.758, 1.74, 1.873, 1.853, 1.957, 1.819, 
    1.951, 1.963, 1.798, 1.927, 1.764), leverage = c(11.965, 
    11.94, 11.999, 12.594, 11.676, 13.485, 11.068, 10.386, 10.564, 
    10.769, 11.082, 10.715, 11.111, 12.547, 10.525, 11.401, 11.191, 
    11.847, 11.965, 14.484, 13.675, 15.288, 11.898, 10.997, 11.501, 
    12.817, 10.954, 11.455, 8.861, 9.153, 9.144, 9.219, 9.285, 
    10.081, 10.98, 9.975, 10.245, 10.245, 9.491, 9.646, 9.745, 
    9.795, 8.943, 9.197, 10.443, 9.845, 9.845, 10.027, 9.833, 
    10.3, 10.329, 11.958, 9.695, 8.882, 9.659, 9.646, 3.484, 
    3.508, 3.503, 3.49, 3.355, 3.363, 3.234, 3.129, 3.315, 3.341, 
    3.328, 3.315, 3.334, 3.396, 3.346, 3.338, 3.371, 3.35, 3.423, 
    3.539, 3.651, 3.894, 3.983, 3.651, 3.747, 3.873, 3.978, 3.912, 
    3.284, 3.339, 3.395, 3.451, 3.442, 3.507, 3.533, 3.353, 3.378, 
    3.252, 3.423, 3.259, 3.246, 3.451, 3.287, 3.499)), class = c("tbl_df", 
"tbl", "data.frame"), row.names = c(NA, -100L), .Names = c("symbol", 
"date", "dynmes", "total.assets", "treat", "ban", "treat.ban", 
"market.to.book", "leverage"))
  • 1
    A couple of points: 1) If you only have a single "ban", that occurs on a particular date, then ban and date are collinear, and ban can be omitted. 2) Since log(total.assets) returns NA, it is likely that you have some invalid entry (probably a 0) in total.assets. If this is the case, using log(total.assets + 1) will solve that issue. – lmo Aug 3 '17 at 12:04
  • 1) The ban periods lasts 14 days, so that the ban variable is TRUE on 14 dates. The original sample covers a period of 403 days. 2) log(total.assets) is only NA in the example data provided in the post. In my original sample the coefficients is computed in a regular manner. – jb123 Aug 3 '17 at 12:14
  • I assume that you have fixed effects for each day. If yes, then these fixed effects will soak up all the variability for the ban period, making that variable unnecessary and collinear. The interaction of ban and treatment (the variable of interest) will be fine. – lmo Aug 3 '17 at 12:21
  • Yes, I use daily fixed effects. In fact, if I run the model without fixed effects, all coefficients are computed. Adding (daily) time fixed effects causes the coefficient ban to be NA, just like adding firm fixed effects causes the coeffiient treatto be NA, and in the final model with both effects only the treat.ban coefficient can be estimated. But does this necessarily have to be this way? And if yes, why? – jb123 Aug 3 '17 at 12:30
  • This is a methodological question better posted on crossValidated. By controlling for daily fixed effects, you are controlling for the ban period (as well as every other day). Similarly, by adding firm fixed effects you are controlling for the firm(s) that is(are) banned already. Think about a 2X2 identity matrix. The vector (1, 1) is a linear combination of the vectors (0, 1) and (1, 0). This is what is happening here when you add the unnecessary ban and treat indicators. – lmo Aug 3 '17 at 12:40

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