The package FENmlm estimates maximum likelihood (ML) models with fixed-effects. The function femlm is the workhorse of the package: it performs efficient ML estimations with any number of fixed-effects and also allows for non-linear in parameters right-hand-sides. Four likelihood models are supported: Poisson, Negative Binomial, Gaussian (equivalent to OLS) and Logit.

The standard-errors of the estimates can be very easily clustered (up to four-way).

Two specific functions are implemented to seamlessly export the results of multiple estimations into either a data.frame (function res2table), or a Latex table of “article-like” quality (function res2tex).

The main features of the package are illustrated in this vignette. For the theory behind this method, see Berge (2018), “Efficient estimation of maximum likelihood models with multiple fixed-effects: the R package FENmlm.” CREA Discussion Papers, 13 (https://wwwen.uni.lu/content/download/110162/1299525/file/2018_13).

1 Simple example using Trade data

This example deals with international trade, which is a setup that usually requires performing estimations with many fixed-effects. We estimate a very simple gravity model in which we are interested in finding out the negative effect of geographic distance on trade. The sample data consists of European trade extracted from Eurostat. Let’s load the data contained in the package:

library(FENmlm)
#> The package 'FENmlm' is not maintained any more. Please use package 'fixest' instead (which greatly extends its functionalities).
data(trade)

This data is a sample of bilateral importations between EU15 countries from 2007 and 2016. The data is further broken down according to 20 product categories. Here is a sample of the data:

Destination Origin Product Year dist_km Euros
LU BE 1 2007 139.6199 2.966697
BE LU 1 2007 139.6199 6.755030
LU BE 2 2007 139.6199 57.078782
BE LU 2 2007 139.6199 7.117406
LU BE 3 2007 139.6199 17.379821
BE LU 3 2007 139.6199 2.622254

The dependent variable of the estimation will be the level of trade between two countries while the independent variable is the geographic distance between the two countries. To obtain the elasticity of geographic distance net of the effects of the four clusters, we estimate the following:

\(E\left(Trade_{i,j,p,t}\right)=\gamma_{i}^{Exporter}\times\gamma_{j}^{Importer}\times\gamma_{p}^{Product}\times\gamma_{t}^{Year}\times Distance_{ij}^{\beta}\),

where the subscripts \(i\), \(j\), \(p\) and \(t\) stand respectively for the exporting country, the importing country, the type of product and the year, and the \(\gamma_{v}^{c}\) are fixed-effects for these groups. Here \(\beta\) is the elasticity of interest.

Note that when you use the Poisson/Negative Binomial families, this relationship is in fact linear because the right hand side is exponentialized to avoid negative values for the Poisson parameter. This leads to the equivalent relation:1

\(E\left(Trade_{i,j,p,t}\right)=\exp\left(\gamma_{i}^{Exporter}+\gamma_{j}^{Importer}+\gamma_{p}^{Product}+\gamma_{t}^{Year}+\beta\times \ln Distance_{ij}\right)\).

1.1 Estimation

The estimation of this model using a Poisson likelihood is as follows:

gravity_results <- femlm(Euros ~ log(dist_km), trade, family = "poisson", cluster = c("Origin", "Destination", "Product", "Year"))

Note that alternatively you could have done the same estimation without the argument cluster, by inserting the fixed-effects directly in the formula with a pipe. Further, you can avoid the argument family since the Poisson model is the default:

gravity_results <- femlm(Euros ~ log(dist_km)|Origin+Destination+Product+Year, trade)

The results can be shown directly with the print method:

print(gravity_results)
#> ML estimation, family = Poisson, Dep. Var.: Euros
#> Observations: 38,325 
#> Cluster sizes: Origin: 15,  Destination: 15,  Product: 20,  Year: 10
#> Standard-errors type: Standard 
#>              Estimate Std. Error z value  Pr(>|z|)    
#> log(dist_km)  -1.5276   0.001925 -793.65 < 2.2e-16 ***
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
#>            BIC:  -768,493.77      Pseudo-R2: 0.74743 
#> Log-likelihood: 1,538,211.80   Squared Cor.: 0.61201

The print reports the coefficient estimates and standard-errors as well as some other information. Among the quality of fit information, the squared-correlation corresponds to the correlation between the dependent variable and the expected predictor; it reflects somehow to the idea of R-square in OLS estimations.

The last line reports the convergence status of the optimization algorithm (the function nlminb from the package stats). In the, rare, event of no convergence, see the troubleshooting section of this Vignette to explore the possible causes and solutions.

1.2 Clustering the standard-errors

To cluster the standard-errors, we can simply use the argument se of the summary method. Let’s say we want to cluster the standard-errors according to the first two clusters (i.e. the Origin and Destination variables). Then we just have to do:

summary(gravity_results, se = "twoway")
#> ML estimation, family = Poisson, Dep. Var.: Euros
#> Observations: 38,325 
#> Cluster sizes: Origin: 15,  Destination: 15,  Product: 20,  Year: 10
#> Standard-errors type: Two-way (Origin & Destination) 
#>              Estimate Std. Error z value  Pr(>|z|)    
#> log(dist_km)  -1.5276    0.12627 -12.098 < 2.2e-16 ***
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
#>            BIC:  -768,493.77      Pseudo-R2: 0.74743 
#> Log-likelihood: 1,538,211.80   Squared Cor.: 0.61201

The clustering can be done on one (se="cluster"), two (se="twoway"), three (se="threeway") or up to four (se="fourway") variables. If the estimation includes fixed-effects, then by default the clustering will be done using these fixed-effects, in the original order. This is why the Origin and Destination variables were used for the two-way clustering in the previous example. If, instead, you wanted to perform one-way clustering on the Product variable, you need to use the argument cluster:

# Equivalent ways of clustering the SEs:
# - using the vector:
summary(gravity_results, se = "cluster", cluster = trade$Product)
#> ML estimation, family = Poisson, Dep. Var.: Euros
#> Observations: 38,325 
#> Cluster sizes: Origin: 15,  Destination: 15,  Product: 20,  Year: 10
#> Standard-errors type: Clustered 
#>              Estimate Std. Error z value  Pr(>|z|)    
#> log(dist_km)  -1.5276   0.095772 -15.951 < 2.2e-16 ***
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
#>            BIC:  -768,493.77      Pseudo-R2: 0.74743 
#> Log-likelihood: 1,538,211.80   Squared Cor.: 0.61201
# - by reference (only possible because Product has been used as a cluster in the estimation):
summary(gravity_results, se = "cluster", cluster = "Product")
#> ML estimation, family = Poisson, Dep. Var.: Euros
#> Observations: 38,325 
#> Cluster sizes: Origin: 15,  Destination: 15,  Product: 20,  Year: 10
#> Standard-errors type: Clustered (Product) 
#>              Estimate Std. Error z value  Pr(>|z|)    
#> log(dist_km)  -1.5276   0.095772 -15.951 < 2.2e-16 ***
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
#>            BIC:  -768,493.77      Pseudo-R2: 0.74743 
#> Log-likelihood: 1,538,211.80   Squared Cor.: 0.61201

Note that you can always cluster the standard-errors, even when the estimation contained no fixed-effect. Buth then you need to use the argument cluster and give explicitely the data to cluster with:

gravity_simple = femlm(Euros ~ log(dist_km), trade)
summary(gravity_simple, se = "twoway", cluster = trade[, c("Origin", "Destination")])
#> ML estimation, family = Poisson, Dep. Var.: Euros
#> Observations: 38,325 
#> Standard-errors type: Two-way 
#>              Estimate Std. Error z value  Pr(>|z|)    
#> (Intercept)   10.8940   1.086600 10.0250 < 2.2e-16 ***
#> log(dist_km)  -1.0289   0.152658 -6.7401  1.58e-11 ***
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
#>            BIC: -2,492,169.10      Pseudo-R2: 0.18101 
#> Log-likelihood:  4,984,380.42   Squared Cor.: 0.05511

1.3 Using other Likelihoods

To use other likelihood models, you simply have to use the argument family. The fixed-effects Negative Binomial estimation is:

gravity_results_negbin <- femlm(Euros ~ log(dist_km)|Origin+Destination+Product+Year, trade, family = "negbin")

Now to estimate the same relationship with the Gaussian likelihood, we need to put the left hand side in logarithm (since the right-hand-side is not exponentialized):

gravity_results_gaussian <- femlm(log(Euros) ~ log(dist_km)|Origin+Destination+Product+Year, trade, family = "gaussian")

Note that the estimates with the Gaussian likelihood are equivalent to the estimates with Ordinary Least Squares.

1.4 Viewing the results in R

Now let’s say that we want a compact overview of the results of several estimations. The best way is to use the function res2table. This function summarizes the results of several femlm estimations into a data.frame. To see the fixed-effects results with the three different likelihoods, we just have to type:

res2table(gravity_results, gravity_results_negbin, gravity_results_gaussian, se = "twoway", subtitles = c("Poisson", "Negative Binomial", "Gaussian"))
Poisson Negative Binomial Gaussian
Dependent Var.: Euros Euros log(Euros)
log(dist_km) -1.5276*** (0.1263) -1.7276*** (0.1431) -2.1697*** (0.1655)
Overdispersion: 0.845552
Fixed-Effects: ——————- ——————- ——————-
Origin Yes Yes Yes
Destination Yes Yes Yes
Product Yes Yes Yes
Year Yes Yes Yes
___________________ ___________________ ___________________ ___________________
Family: Poisson Neg. Bin. Gaussian
Observations 38,325 38,325 38,325
Squared-Correlation 0.612 0.474 0.706
Adj-pseudo R2 0.74743 0.1622 0.23583
Log-Likelihood -768,493.77 -130,359.17 -75,682.39
BIC 1,537,599.67 261,341.03 151,976.92

We added the argument se="twoway" to cluster the standard-errors for all estimations. As can be seen this function gives an overview of the estimates and standard-errors, as well as some quality of fit measures. The argument subtitles is used to add information on each estimation column.

In the previous example, we directly added the estimation results as arguments of the function res2table. But the function also accepts lists of estimations. Let’s give an example. Say you want to see the influence of the introduction of fixed-effects on the estimate of the elasticity of distance. You can do it with the following code:

gravity_subcluster = list()
all_clusters = c("Year", "Destination", "Origin", "Product")
for(i in 1:4){
    gravity_subcluster[[i]] = femlm(Euros ~ log(dist_km), trade, cluster = all_clusters[1:i])
}

The previous code performs 4 estimations with an increasing number of fixed-effects and store their results into the list named gravity_subcluster. To show the results of all 4 estimations, it’s easy:

res2table(gravity_subcluster, se = "twoway", cluster = trade[, c("Origin", "Destination")])
model 1 model 2 model 3 model 4
log(dist_km) -1.0293*** (0.1527) -1.2256*** (0.1975) -1.5173*** (0.1238) -1.5276*** (0.1263)
Fixed-Effects: ——————- ——————- ——————- ——————-
Year Yes Yes Yes Yes
Destination No Yes Yes Yes
Origin No No Yes Yes
Product No No No Yes
___________________ ___________________ ___________________ ___________________ ___________________
Observations 38,325 38,325 38,325 38,325
Squared-Correlation 0.057 0.164 0.385 0.612
Adj-pseudo R2 0.18423 0.35047 0.58023 0.74743
Log-Likelihood -2,482,334.64 -1,976,479.31 -1,277,291.27 -768,493.77
BIC 4,964,785.39 3,953,222.48 2,554,994.15 1,537,599.67

We have a view of the 5 estimations, all reporting two-way clustered standard-errors thanks to the use of the arguments se and cluster.

1.5 Exporting the results to Latex

So far we have seen how to report the results of multiple estimations on the R console. Now, with the function res2tex, we can export the results to high quality Latex tables. The function res2tex works exactly as the function res2table, it takes any number of femlm estimations. By default, it reports Latex code on the R console:

res2tex(gravity_subcluster, se = "twoway", cluster = trade[, c("Origin", "Destination")])
#> \global\long\def\sym#1{\ifmmode^{#1}\else\ensuremath{^{#1}}\fi}
#> \begin{table}[htbp]\centering
#> \caption{no title}
#> \begin{tabular}{lcccc}
#>  & & & & \tabularnewline
#> \hline
#> \hline
#> Dependent Variable:&\multicolumn{4}{c}{Euros}\\
#> Model:&(1)&(2)&(3)&(4)\\
#> \hline
#> \emph{Variables}\tabularnewline
#> log(dist_km)&-1\sym{***}&-1\sym{***}&-2\sym{***}&-2\sym{***}\\
#>   &(0.1527)&(0.1975)&(0.1238)&(0.1263)\\
#> \hline
#> \emph{Fixed-Effects}&  & & & \\
#> Year&Yes&Yes&Yes&Yes\\
#> Destination&No&Yes&Yes&Yes\\
#> Origin&No&No&Yes&Yes\\
#> Product&No&No&No&Yes\\
#> \hline
#> \emph{Fit statistics}&  & & & \\
#> Observations& 38,325&38,325&38,325&38,325\\
#> Adj-pseudo $R^2$ &0.18423&0.35047&0.58023&0.74743\\
#> Log-Likelihood & -2,482,334.64&-1,976,479.31&-1,277,291.27&-768,493.77\\
#> BIC & 4,964,785.39&3,953,222.48&2,554,994.15&1,537,599.67\\
#> \hline
#> \hline
#> \multicolumn{5}{l}{\emph{Two-way standard-errors in parenthesis. Signif Codes: ***: 0.01, **: 0.05, *: 0.1}}\\
#> \end{tabular}
#> \end{table}

This function has many optional arguments. The user can export the Latex table directly into a file (argument file), add a title (arg. title) and a label to the table (arg. label).

The coefficients can be renamed easily (arg. dict), some can be dropped (arg. drop) and they can be easily reordered with regular expressions (arg. order).

The significance codes can easily be changed (arg. signifCode) and all quality of fit information can be customized. Among others, the number of fixed-effect per cluster can also be displayed using the argument showClusterSize.

1.5.1 An elaborate example

Consider the following example of the exportation of two tables:

# we set the dictionary once and for all
myDict = c("log(dist_km)" = "$\\ln (Distance)$", "(Intercept)" = "Constant")
# 1st export: we change the signif code and drop the intercept
res2tex(gravity_subcluster, signifCode = c("a" = 0.01, "b" = 0.05), drop = "Int", dict = myDict, file = "Estimation Table.tex", append = FALSE, title = "First export -- normal Standard-errors")
# 2nd export: clustered S-E + distance as the first coefficient
res2tex(gravity_subcluster, se = "cluster", cluster = trade$Product, order = "dist", dict = myDict, file = "Estimation Table.tex", title = "Second export -- clustered standard-errors (on Product variable)")

In this example, two tables containing the results of the 5 estimations are directly exported in the file “Estimation Table.tex”. The file is re-created in the first exportation thanks to the argument append=FALSE.

To change the variable names in the Latex table, we use the argument dict. The variable myDict is the dictionary we use to rename the variables, it is simply a named vector. The original name of the variables correspond to the names of myDict while the new names of the variables are the values of this vector. Any variable that matches the names of myDict will be replaced by its value. Thus we do not care of the order of appearance of the variables in the estimation results.

In the first export, the coefficient of the intercept is dropped by using drop = "Int" (could be anything such that grepl(drop[1], "(Intercept)") is TRUE). In the second, the coefficient of the distance is put before the intercept (which is kept). Note that the actions performed by the arguments drop or order are performed before the renaming takes place with the argument dict.

1.6 Extracting the fixed-effects

To obtain the fixed-effects of the estimation, the function getFE must be performed on the results. This function returns a list containing the fixed-effects for each cluster. The summary method helps to have a quick overview:

fixedEffects <- getFE(gravity_results)
summary(fixedEffects)
#> Fixed-effects coefficients.
#>                         Origin Destination Product   Year
#> Number of fixed-effects     15          15      20     10
#> Number of references         0           1       1      1
#> Mean                      9.53        3.09  0.0129  0.157
#> Variance                  1.63        1.23    1.86 0.0129
#> 
#> COEFFICIENTS:
#>   Origin:    BE    LU    NL    DE    GB                 
#>           9.744 6.414 10.62 10.89 9.934 ... 10 remaining
#> -----
#>   Destination: LU    BE   NL    DE    IE                 
#>                 0 2.696 3.23 4.322 2.588 ... 10 remaining
#> -----
#>   Product: 1     2      3     4      5                 
#>            0 1.414 0.6562 1.449 -1.521 ... 15 remaining
#> -----
#>   Year: 2007    2008     2009    2010  2011                
#>            0 0.06912 0.005226 0.07331 0.163 ... 5 remaining

We can see that the fixed-effects are balanced across clusters. Indeed, apart from the first cluster, only one fixed-effect per cluster needs to be set as reference (i.e. fixed to 0) to avoid collinearity across the fixed-effects of the different clusters. This ensures that the fixed-effects coefficients can be compared within cluster. Had there be strictly more than one reference per cluster, their interpretation would have not been possible at all. If this was the case though, a warning message would have been prompted. Note that the mean values are meaningless per se, but give a reference points to which compare the fixed-effects within a cluster. Let’s look specifically at the Year fixed-effects:

fixedEffects$Year
#>        2007        2008        2009        2010        2011        2012 
#> 0.000000000 0.069122369 0.005225534 0.073308290 0.163013422 0.192605196 
#>        2013        2014        2015        2016 
#> 0.230629312 0.242605390 0.282800746 0.310325679

Finally, the plot method helps to distinguish the most notable fixed-effects:

plot(fixedEffects)

For each cluster, the fixed-effects are first centered, then sorted, and finally the most notable (i.e. highest and lowest) are reported. The exponential of the coefficient is reported in the right hand side to simplify the interpretation for models with log-link (as the Poisson model). As we can see from the country of destination cluster, trade involving France (FR), Italy (IT) and Germany (DE) as destination countries is more than 2.7 times higher than the EU15 average. Further, the highest heterogeneity come from the product category, where trade in product 4 (dairy products) is roughly 2.7 times the average while product 14 (vegetable plaiting materials) represents a negligible fraction of the average.

Note however that the interpretation of the fixed-effects must be taken with extra care. In particular, here the fixed-effects can be interpreted only because they are perfectly balanced.

2 Additional features

Now we present some other features of the package. First the possibility for non-linear in parameter estimation. The use of parallelism to accelerate the estimation. And finally some troobleshooting in case of problems.

2.1 Non-linear in parameters example

The function femlm also allows to have non-linear in parameters right-hand-sides (RHS). First an example without fixed-effects, the one with fixed-effects is given later. Let’s say we want to estimate the following relation with a Poisson model:

\(E\left(z_i\right) = a\times x_i + b\times y_i\).

In fact, this type of model is non-linear in the context of a Poisson model because the sum is embedded within the log:

\(E\left(z_i\right) = \exp\left(\log\left(a\times x_i + b\times y_i\right)\right)\).

So let’s estimate such a relation. First we generate the data:

# Generating data:
n = 1000
# x and y: two positive random variables
x = rnorm(n, 1, 5)**2
y = rnorm(n, -1, 5)**2
# E(z) = 2*x + 3*y and some noise
z = rpois(n, 2*x + 3*y) + rpois(n, 1)
base = data.frame(x, y, z)

To estimate the non-linear relationship, we need to use the argument NL.fml where we put the non-linear part. We also have to provide starting values with the argument NL.start. Finally, to ensure the RHS can be evaluated in any situation, we add lower bounds for the parameters with the argument lower.

result_NL = femlm(z~0, base, NL.fml = ~ log(a*x + b*y), NL.start = list(a=1, b=1), lower = list(a=0, b=0))

Note that the arguments NL.start and lower are named lists. Setting lower = list(a=0, b=0) means that the optimization algorithm will never explores parameters for \(a\) and \(b\) that are lower than 0. The results obtained can be interpreted similarly to results with linear RHS. We can see them with a print:

print(result_NL)
#> Non-linear ML estimation, family = Poisson, Dep. Var.: z
#> Observations: 1,000 
#> Standard-errors type: Standard 
#>   Estimate Std. Error z value  Pr(>|z|)    
#> a   2.0021   0.011197  178.81 < 2.2e-16 ***
#> b   3.0142   0.012027  250.61 < 2.2e-16 ***
#> ---
#> Signif. codes:  0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
#>            BIC: -3,585.74      Pseudo-R2: 0.94523 
#> Log-likelihood:  7,199.11   Squared Cor.: 0.99358

We can see that we obtain coefficients close to the generating values.

2.1.1 Adding fixed-effects to non-linear in parameters models

Adding fixed-effects is identical to the linear case. The user must only be well aware of the functional form. Indeed, the fixed-effects must enter the estimation linearly. This means that the previous equation with one set of fixed-effects writes:

\(E\left(z_i\right) = \gamma_{id_i} \left( a\times x_i + b\times y_i \right)\),

where \(id_i\) is the class of observation \(i\) and \(\gamma\) is the vector of fixed-effects. Here the fixed-effects are in fact linear because in the context of the Poisson model we estimate:

\(E\left(z_i\right) = \exp\left(\gamma_{id_i}+\log\left(a\times x_i + b\times y_i\right)\right)\).

Further, remark that there exists an infinity of values of \(\gamma^{\prime}\), \(a^{\prime}\) and \(b^{\prime}\) such that:

\(\gamma_{k} \left( a\times x_i + b\times y_i \right) = \gamma_{k}^{\prime} \left(a^{\prime}\times x_i + b^{\prime}\times y_i \right),\forall i,k\).

An example is \(\gamma^{\prime}_{k} = 2\times \gamma_k\), \(a^{\prime} = a/2\) and \(b^{\prime} = b/2\). Thus estimating this relation directly will lead to a problem to uniquely identify the coefficients. To circumvent this problem, we just have to fix one of the coefficient, this will ensure that we uniquely identify them.

Let’s generate this relation:

# the class of each observation
id = sample(20, n, replace = TRUE)
base$id = id
# the vector of fixed-effects
gamma = rnorm(20)**2
# the new vector z_bis
z_bis = rpois(n, gamma[id] * (2*x + 3*y)) + rpois(n, 1)
base$z_bis = z_bis

Now we estimate it with the fixed-effects while fixing one of the coefficients (we fix \(a\) to its true value but it could be any value):

# we add the fixed-effect in the formula
result_NL_fe = femlm(z_bis~0|id, base, NL.fml = ~ log(2*x + b*y), NL.start = list(b=1), lower = list(b=0))
# The coef should be around 3
coef(result_NL_fe)
#>        b 
#> 2.980075
# the gamma and the exponential of the fixed-effects should be similar
rbind(gamma, exp(getFE(result_NL_fe)$id))
#>               1         2          3        4         5         6        7
#> gamma 0.4384653 0.3082814 0.05060817 3.603996 0.3717587 0.2163741 4.337891
#>       0.4372835 0.3219458 0.05822930 3.615091 0.3639620 0.2228637 4.388690
#>                8        9        10          11        12         13
#> gamma 0.07925386 1.101924 0.1002304 0.001901939 0.2867469 0.02560278
#>       0.08073083 1.113902 0.1035990 0.009154030 0.3011106 0.03142881
#>              14         15       16        17        18         19
#> gamma 0.5035311 0.09535258 2.564633 0.8799833 0.3822747 0.02359699
#>       0.5258336 0.10527956 2.577267 0.8965694 0.3866346 0.02929856
#>                 20
#> gamma 0.0004552988
#>       0.0074764681

As we can see, we obtain the “right” estimates.

2.2 Using multi-cores

The package FENmlm integrates multi-platform parallelism to hasten the estimation process. To use the multi-core facility, just use the argument cores:

# Sample of results:
# 1 core: 2.7s
system.time(femlm(Euros ~ log(dist_km)|Origin+Destination+Product+Year, trade, family = "negbin", cores = 1))
# 2 cores: 1.74s
system.time(femlm(Euros ~ log(dist_km)|Origin+Destination+Product+Year, trade, family = "negbin", cores = 2))
# 4 cores: 1.31s
system.time(femlm(Euros ~ log(dist_km)|Origin+Destination+Product+Year, trade, family = "negbin", cores = 4))

As you can see, the efficiency of increasing the number of cores is not 1 to 1. Two cores do not divide the computing time by 2, nor four cores by 4. However it still reduces significantly the computing time, which might be valuable for large sample estimations.

Although parallelism has been implemented for all likelihood models, the only ones for which it is really efficient are the Negative Binomial and the Logit models.

Indeed, the underlying femlm code alternate between R and C and the parallelism has been implemented with the C library OpenMP. Setting the parallelism with OpenMP incurs “fixed-costs”, and since there is many back and forth between R and C, these fixed-costs add up significantly. Thus to be worth, the C-code sections with parallelism must be “complex”.

Because the Negative Binomial and Logit models are the ones with the most computationnaly intensive C-code chunks, they are the ones that benefit the most from the parallelism.

2.3 Troubleshooting

This section deals with possible error/warning messages stemming from the estimation. There are two identified – possible – problems: collinearity and precision.

2.3.1 Collineartiy

The user ought to estimate the coefficient of variables that are not collinear: neither among each other, neither with the fixed-effects. Estimation with collinear variables either leads the algorithm to not converge, either leads to a non invertible Hessian (leading to the absence of Variance-Covariance matrix for the coefficients). In such cases, femlm will raise a warning and suggest to use the function diagnostic to spot the problem.

Let’s take an example in which we want to estimate the coefficient of a variable which is constant. Of course it makes no sense, so a warning will be raised suggesting to use the function diagnostic to figure out what is wrong.

base_coll = trade
base_coll$constant_variable = 1
res <- femlm(Euros ~ log(dist_km) + constant_variable|Origin+Destination+Product+Year, base_coll)
#> Warning in femlm(Euros ~ log(dist_km) + constant_variable | Origin +
#> Destination + : [femlm]: The optimization algorithm did not converge,
#> the results are not reliable. The information matrix is singular
#> (likely presence of collinearity). Use function diagnostic() to pinpoint
#> collinearity problems.
diagnostic(res)
#> [1] "Variable 'constant_variable' is collinear with cluster Origin."

As we can see, the function diagnostic spots the collinear variables and name them. Even in more elaborate cases of collinearity, the algorithm tries to find out the culprit and informs the user accordingly.

2.3.2 A note on precision

When there is more than one fixed-effect, the “optimal” fixed-effects are computed according to a fixed-point algorithm. This algorithm has a stopping criterion which is equal to the argument precision.cluster. By default, it stops when the maximum absolute difference between two iterations is lower than \(10^{-5}\).

Further, the algorithm implements a dynamic setting of the precision. This means that it increases the precision (i.e. sets precision.cluster to a lower value) when some condition occur in order to unblock the optimization algorithm. Thus, thanks to the dynamic handling of the precision, the default value precision.cluster should be enough for most situations.

However, in some very very specific cases (for large data sets where small errors can lead to large differences, or with very “similar” fixed-effects (ie fixed-effects with many overlap)), the algorithm may not converge because the fixed-effects are not computed with enough precision (although they’ll be very close to optimality). Said differently, in such situations the dynamic handling of the precision is not enough because the initial rounding errors when obtaining the cluster coefficients led the optimization algorithm astray.

In such cases, setting the argument precision.cluster to a lower value may help the algorithm to converge. Again, such situation should be rare and the default value should work for the large majority of cases. Finally, note that increasing the precision leads to significantly increase the running time of the algorithm.


  1. Since the \(\gamma\) are parameters, I omit to put them in logarithmic form.