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moderndive
: Datasets and
functions for tidyverse
-friendly introductory linear
regressionWe present the moderndive
R package of datasets and
functions for tidyverse-friendly introductory
linear regression (Wickham, Averick, et al.
2019). These tools leverage the well-developed
tidyverse
and broom
packages to facilitate 1)
working with regression tables that include confidence intervals, 2)
accessing regression outputs on an observation level
(e.g. fitted/predicted values and residuals), 3) inspecting scalar
summaries of regression fit (e.g. \(R^2\), \(R^2_{adj}\), and mean squared error), and
4) visualizing parallel slopes regression models using
ggplot2
-like syntax (Wickham, Chang,
et al. 2019; Robinson and Hayes 2019). This R package is designed
to supplement the book “Statistical Inference via Data Science: A
ModernDive into R and the Tidyverse” (Ismay and
Kim 2019). Note that the book is also available online at https://moderndive.com and
is referred to as “ModernDive” for short.
Linear regression has long been a staple of introductory statistics
courses. While the curricula of introductory statistics courses has much
evolved of late, the overall importance of regression remains the same
(American Statistical Association Undergraduate
Guidelines Workgroup 2016). Furthermore, while the use of the R
statistical programming language for statistical analysis is not new,
recent developments such as the tidyverse
suite of packages
have made statistical computation with R accessible to a broader
audience (Wickham, Averick, et al. 2019).
We go one step further by leveraging the tidyverse
and the
broom
packages to make linear regression accessible to
students taking an introductory statistics course (Robinson and Hayes 2019). Such students are
likely to be new to statistical computation with R; we designed
moderndive
with these students in mind.
Let’s load all the R packages we are going to need.
Let’s consider data gathered from end of semester student evaluations
for a sample of 463 courses taught by 94 professors from the University
of Texas at Austin (Diez, Barr, and
Çetinkaya-Rundel 2015). This data is included in the
evals
data frame from the moderndive
package.
In the following table, we present a subset of 9 of the 14 variables included for a random sample of 5 courses1:
ID
uniquely identifies the course whereas
prof_ID
identifies the professor who taught this course.
This distinction is important since many professors taught more than one
course.score
is the outcome variable of interest: average
professor evaluation score out of 5 as given by the students in this
course.bty_avg
(average “beauty”
score) for that professor as given by a panel of 6 students.2ID | prof_ID | score | age | bty_avg | gender | ethnicity | language | rank |
---|---|---|---|---|---|---|---|---|
129 | 23 | 3.7 | 62 | 3.000 | male | not minority | english | tenured |
109 | 19 | 4.7 | 46 | 4.333 | female | not minority | english | tenured |
28 | 6 | 4.8 | 62 | 5.500 | male | not minority | english | tenured |
434 | 88 | 2.8 | 62 | 2.000 | male | not minority | english | tenured |
330 | 66 | 4.0 | 64 | 2.333 | male | not minority | english | tenured |
Let’s fit a simple linear regression model of teaching
score
as a function of instructor age
using
the lm()
function.
Let’s now study the output of the fitted model
score_model
“the good old-fashioned way”: using
summary()
which calls summary.lm()
behind the
scenes (we’ll refer to them interchangeably throughout this paper).
summary(score_model)
##
## Call:
## lm(formula = score ~ age, data = evals)
##
## Residuals:
## Min 1Q Median 3Q Max
## -1.9185 -0.3531 0.1172 0.4172 0.8825
##
## Coefficients:
## Estimate Std. Error t value Pr(>|t|)
## (Intercept) 4.461932 0.126778 35.195 <2e-16 ***
## age -0.005938 0.002569 -2.311 0.0213 *
## ---
## Signif. codes: 0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
##
## Residual standard error: 0.5413 on 461 degrees of freedom
## Multiple R-squared: 0.01146, Adjusted R-squared: 0.009311
## F-statistic: 5.342 on 1 and 461 DF, p-value: 0.02125
Here are 5 common student questions we’ve heard over the years in our introductory statistics courses based on this output:
moderndive
To address these questions, we’ve included three functions in the
moderndive
package that take a fitted model object as input
and return the same information as summary.lm()
, but output
them in tidyverse-friendly format (Wickham,
Averick, et al. 2019). As we’ll see later, while these three
functions are thin wrappers to existing functions in the
broom
package for converting statistical objects into tidy
tibbles, we modified them with the introductory statistics student in
mind (Robinson and Hayes 2019).
Get a tidy regression table with confidence intervals:
Get information on each point/observation in your regression, including fitted/predicted values and residuals, in a single data frame:
get_regression_points(score_model)
## # A tibble: 463 × 5
## ID score age score_hat residual
## <int> <dbl> <int> <dbl> <dbl>
## 1 1 4.7 36 4.25 0.452
## 2 2 4.1 36 4.25 -0.148
## 3 3 3.9 36 4.25 -0.348
## 4 4 4.8 36 4.25 0.552
## 5 5 4.6 59 4.11 0.488
## 6 6 4.3 59 4.11 0.188
## 7 7 2.8 59 4.11 -1.31
## 8 8 4.1 51 4.16 -0.059
## 9 9 3.4 51 4.16 -0.759
## 10 10 4.5 40 4.22 0.276
## # ℹ 453 more rows
Get scalar summaries of a regression fit including \(R^2\) and \(R^2_{adj}\) but also the (root) mean-squared error:
moderndive
Furthermore, say you would like to create a visualization of the
relationship between two numerical variables and a third categorical
variable with \(k\) levels. Let’s
create this using a colored scatterplot via the ggplot2
package for data visualization (Wickham, Chang,
et al. 2019). Using
geom_smooth(method = "lm", se = FALSE)
yields a
visualization of an interaction model where each of the \(k\) regression lines has their own
intercept and slope. For example in , we extend our previous regression
model by now mapping the categorical variable ethnicity
to
the color
aesthetic.
# Code to visualize interaction model:
ggplot(evals, aes(x = age, y = score, color = ethnicity)) +
geom_point() +
geom_smooth(method = "lm", se = FALSE) +
labs(x = "Age", y = "Teaching score", color = "Ethnicity")
However, many introductory statistics courses start with the easier
to teach “common slope, different intercepts” regression model, also
known as the parallel slopes model. However, no argument to
plot such models exists within geom_smooth()
.
Evgeni
Chasnovski thus wrote a custom geom_
extension to
ggplot2
called geom_parallel_slopes()
; this
extension is included in the moderndive
package. Much like
geom_smooth()
from the ggplot2
package, you
add geom_parallel_slopes()
as a layer to the code,
resulting in .
# Code to visualize parallel slopes model:
ggplot(evals, aes(x = age, y = score, color = ethnicity)) +
geom_point() +
geom_parallel_slopes(se = FALSE) +
labs(x = "Age", y = "Teaching score", color = "Ethnicity")
At this point however, students will inevitably ask a sixth question: “When would you ever use a parallel slopes model?”
moderndive
package?To recap this introduction, we believe that the following functions
included in the moderndive
package
get_regression_table()
get_regression_points()
get_regression_summaries()
geom_parallel_slopes()
are effective pedagogical tools that can help address the six common questions posed by students about introductory linear regression performed in R. We now argue why.
The first common student question:
“Wow! Look at those p-value stars! Stars are good, so I should try to get many stars, right?”
We argue that the summary.lm()
output is deficient in an
introductory statistics setting because:
Signif. codes: 0 '' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
only encourage p-hacking. In case you have not yet been
convinced of the perniciousness of p-hacking, perhaps comedian John
Oliver can convince you.summary.lm()
.Instead of summary()
, let’s use the
get_regression_table()
function:
get_regression_table(score_model)
## # A tibble: 2 × 7
## term estimate std_error statistic p_value lower_ci upper_ci
## <chr> <dbl> <dbl> <dbl> <dbl> <dbl> <dbl>
## 1 intercept 4.46 0.127 35.2 0 4.21 4.71
## 2 age -0.006 0.003 -2.31 0.021 -0.011 -0.001
Observe how the p-value stars are omitted and confidence intervals
for the point estimates of all regression parameters are included by
default. By including them in the output, we can then emphasize to
students that they “surround” the point estimates in the
estimate
column. Note the confidence level is defaulted to
95%; this default can be changed using the conf.level
argument:
The second common student question:
“How do we extract the values in the regression table?”
While one might argue that extracting the intercept and slope
coefficients can be “simply” done using
coefficients(score_model)
, what about the standard errors?
For example, a Google query of “how do I extract standard errors
from lm in R” yielded results from the R mailing list and from Cross Validated suggesting we run:
We argue that this task shouldn’t be this hard, especially in an
introductory statistics setting. To rectify this, the three
get_regression_*
functions all return data frames in the
tidyverse-style tibble (tidy table) format (Müller and Wickham 2019). Therefore you can
extract columns using the pull()
function from the
dplyr
package (Wickham et al.
2020):
or equivalently you can use the $
sign operator from
base R:
Furthermore, by piping the above
get_regression_table(score_model)
output into the
kable()
function from the knitr
package (Xie 2020), you can obtain aesthetically
pleasing regression tables in R Markdown documents, instead of tables
written in jarring computer output font:
term | estimate | std_error | statistic | p_value | lower_ci | upper_ci |
---|---|---|---|---|---|---|
intercept | 4.462 | 0.127 | 35.195 | 0.000 | 4.213 | 4.711 |
age | -0.006 | 0.003 | -2.311 | 0.021 | -0.011 | -0.001 |
The third common student question:
“Where are the fitted/predicted values and residuals?”
How can we extract point-by-point information from a regression model, such as the fitted/predicted values and the residuals? (Note we only display the first 10 out of 463 of such values for brevity’s sake.)
## 1 2 3 4 5 6 7
## 4.248156 4.248156 4.248156 4.248156 4.111577 4.111577 4.111577
## 8 9 10
## 4.159083 4.159083 4.224403
## 1 2 3 4 5
## 0.45184376 -0.14815624 -0.34815624 0.55184376 0.48842294
## 6 7 8 9 10
## 0.18842294 -1.31157706 -0.05908286 -0.75908286 0.27559666
But why have the original explanatory/predictor age
and
outcome variable score
in evals
, the
fitted/predicted values score_hat
, and
residual
floating around in separate vectors? Since each
observation relates to the same course, we argue it makes more sense to
organize them together in the same data frame using
get_regression_points()
:
## # A tibble: 10 × 5
## ID score age score_hat residual
## <int> <dbl> <int> <dbl> <dbl>
## 1 1 4.7 36 4.25 0.452
## 2 2 4.1 36 4.25 -0.148
## 3 3 3.9 36 4.25 -0.348
## 4 4 4.8 36 4.25 0.552
## 5 5 4.6 59 4.11 0.488
## 6 6 4.3 59 4.11 0.188
## 7 7 2.8 59 4.11 -1.31
## 8 8 4.1 51 4.16 -0.059
## 9 9 3.4 51 4.16 -0.759
## 10 10 4.5 40 4.22 0.276
Observe that the original outcome variable score
and
explanatory/predictor variable age
are now supplemented
with the fitted/predicted values score_hat
and
residual
columns. By putting the fitted values, predicted
values, and residuals next to the original data, we argue that the
computation of these values is less opaque. For example, instructors can
emphasize how all values in the first row of output are computed.
Furthermore, recall that since all outputs in the
moderndive
package are tibble data frames, custom residual
analysis plots can be created instead of relying on the default plots
yielded by plot.lm()
. For example, we can check for the
normality of residuals using the histogram of residuals shown in .
# Code to visualize distribution of residuals:
ggplot(score_model_points, aes(x = residual)) +
geom_histogram(bins = 20) +
labs(x = "Residual", y = "Count")
As another example, we can investigate potential relationships between the residuals and all explanatory/predictor variables and the presence of heteroskedasticity using partial residual plots, like the partial residual plot over age shown in . If the term “heteroskedasticity” is new to you, it corresponds to the variability of one variable being unequal across the range of values of another variable. The presence of heteroskedasticity violates one of the assumptions of inference for linear regression.
# Code to visualize partial residual plot over age:
ggplot(score_model_points, aes(x = age, y = residual)) +
geom_point() +
labs(x = "Age", y = "Residual")
The fourth common student question:
“How do I apply this model to a new set of data to make predictions?”
With the fields of machine learning and artificial intelligence
gaining prominence, the importance of predictive modeling cannot be
understated. Therefore, we’ve designed the
get_regression_points()
function to allow for a
newdata
argument to quickly apply a previously fitted model
to new observations.
Let’s create an artificial “new” dataset consisting of two
instructors of age 39 and 42 and save it in a tibble data frame called
new_prof
. We then set the newdata
argument to
get_regression_points()
to apply our previously fitted
model score_model
to this new data, where
score_hat
holds the corresponding fitted/predicted
values.
new_prof <- tibble(age = c(39, 42))
get_regression_points(score_model, newdata = new_prof)
## # A tibble: 2 × 3
## ID age score_hat
## <int> <dbl> <dbl>
## 1 1 39 4.23
## 2 2 42 4.21
Let’s do another example, this time using the Kaggle House Prices: Advanced Regression Techniques practice competition ( displays the homepage for this competition).
This Kaggle competition requires you to fit/train a model to the
provided train.csv
training set to make predictions of
house prices in the provided test.csv
test set. We present
an application of the get_regression_points()
function
allowing students to participate in this Kaggle competition. It
will:
submission.csv
file that can be submitted to Kaggle using
get_regression_points()
. Note the use of the
ID
argument to use the id
variable in
test
to identify the rows (a requirement of Kaggle
competition submissions).library(readr)
library(dplyr)
library(moderndive)
# Load in training and test set
train <- read_csv("https://moderndive.com/data/train.csv")
test <- read_csv("https://moderndive.com/data/test.csv")
# Fit model:
house_model <- lm(SalePrice ~ YrSold, data = train)
# Make predictions and save in appropriate data frame format:
submission <- house_model %>%
get_regression_points(newdata = test, ID = "Id") %>%
select(Id, SalePrice = SalePrice_hat)
# Write predictions to csv:
write_csv(submission, "submission.csv")
After submitting submission.csv
to the leaderboard for
this Kaggle competition, we obtain a “root mean squared logarithmic
error” (RMSLE) score of 0.42918 as seen in .
The fifth common student question:
“What is all this other stuff at the bottom?”
Recall the output of the standard summary.lm()
from
earlier:
##
## Call:
## lm(formula = score ~ age, data = evals)
##
## Residuals:
## Min 1Q Median 3Q Max
## -1.9185 -0.3531 0.1172 0.4172 0.8825
##
## Coefficients:
## Estimate Std. Error t value Pr(>|t|)
## (Intercept) 4.461932 0.126778 35.195 <2e-16 ***
## age -0.005938 0.002569 -2.311 0.0213 *
## ---
## Signif. codes: 0 '***' 0.001 '**' 0.01 '*' 0.05 '.' 0.1 ' ' 1
##
## Residual standard error: 0.5413 on 461 degrees of freedom
## Multiple R-squared: 0.01146, Adjusted R-squared: 0.009311
## F-statistic: 5.342 on 1 and 461 DF, p-value: 0.02125
Say we wanted to extract the scalar model summaries at the bottom of
this output, such as \(R^2\), \(R^2_{adj}\), and the \(F\)-statistic. We can do so using the
get_regression_summaries()
function.
get_regression_summaries(score_model)
## # A tibble: 1 × 9
## r_squared adj_r_squared mse rmse sigma statistic p_value df
## <dbl> <dbl> <dbl> <dbl> <dbl> <dbl> <dbl> <dbl>
## 1 0.011 0.009 0.292 0.540 0.541 5.34 0.021 1
## # ℹ 1 more variable: nobs <dbl>
We’ve supplemented the standard scalar summaries output yielded by
summary()
with the mean squared error mse
and
root mean squared error rmse
given their popularity in
machine learning settings.
Finally, the last common student question:
“When would you ever use a parallel slopes model?”
For example, recall the earlier visualizations of the interaction and parallel slopes models for teaching score as a function of age and ethnicity we saw in Figures \(\ref{fig:interaction-model}\) and \(\ref{fig:parallel-slopes-model}\). Let’s present both visualizations side-by-side in .
Students might be wondering “Why would you use the parallel slopes model on the right when the data clearly form an”X” pattern as seen in the interaction model on the left?” This is an excellent opportunity to gently introduce the notion of model selection and Occam’s Razor: an interaction model should only be used over a parallel slopes model if the additional complexity of the interaction model is warranted. Here, we define model “complexity/simplicity” in terms of the number of parameters in the corresponding regression tables:
# Regression table for interaction model:
interaction_evals <- lm(score ~ age * ethnicity, data = evals)
get_regression_table(interaction_evals)
## # A tibble: 4 × 7
## term estimate std_error statistic p_value lower_ci upper_ci
## <chr> <dbl> <dbl> <dbl> <dbl> <dbl> <dbl>
## 1 intercept 2.61 0.518 5.04 0 1.59 3.63
## 2 age 0.032 0.011 2.84 0.005 0.01 0.054
## 3 ethnicity: n… 2.00 0.534 3.74 0 0.945 3.04
## 4 age:ethnicit… -0.04 0.012 -3.51 0 -0.063 -0.018
# Regression table for parallel slopes model:
parallel_slopes_evals <- lm(score ~ age + ethnicity, data = evals)
get_regression_table(parallel_slopes_evals)
## # A tibble: 3 × 7
## term estimate std_error statistic p_value lower_ci upper_ci
## <chr> <dbl> <dbl> <dbl> <dbl> <dbl> <dbl>
## 1 intercept 4.37 0.136 32.1 0 4.1 4.63
## 2 age -0.006 0.003 -2.5 0.013 -0.012 -0.001
## 3 ethnicity: n… 0.138 0.073 1.89 0.059 -0.005 0.282
The interaction model is “more complex” as evidenced by its regression table involving 4 rows of parameter estimates whereas the parallel slopes model is “simpler” as evidenced by its regression table involving only 3 parameter estimates. It can be argued however that this additional complexity is warranted given the clearly different slopes in the left-hand plot of .
We now present a contrasting example, this time from Chapter 6 of the online version of ModernDive Subsection 6.3.1 involving Massachusetts USA public high schools.3 Let’s plot both the interaction and parallel slopes models in .
# Code to plot interaction and parallel slopes models for MA_schools
ggplot(
MA_schools,
aes(x = perc_disadvan, y = average_sat_math, color = size)
) +
geom_point(alpha = 0.25) +
labs(
x = "% economically disadvantaged",
y = "Math SAT Score",
color = "School size"
) +
geom_smooth(method = "lm", se = FALSE)
ggplot(
MA_schools,
aes(x = perc_disadvan, y = average_sat_math, color = size)
) +
geom_point(alpha = 0.25) +
labs(
x = "% economically disadvantaged",
y = "Math SAT Score",
color = "School size"
) +
geom_parallel_slopes(se = FALSE)
In terms of the corresponding regression tables, observe that the corresponding regression table for the parallel slopes model has 4 rows as opposed to the 6 for the interaction model, reflecting its higher degree of “model simplicity.”
# Regression table for interaction model:
interaction_MA <-
lm(average_sat_math ~ perc_disadvan * size, data = MA_schools)
get_regression_table(interaction_MA)
## # A tibble: 6 × 7
## term estimate std_error statistic p_value lower_ci upper_ci
## <chr> <dbl> <dbl> <dbl> <dbl> <dbl> <dbl>
## 1 intercept 594. 13.3 44.7 0 568. 620.
## 2 perc_disadvan -2.93 0.294 -9.96 0 -3.51 -2.35
## 3 size: medium -17.8 15.8 -1.12 0.263 -48.9 13.4
## 4 size: large -13.3 13.8 -0.962 0.337 -40.5 13.9
## 5 perc_disadva… 0.146 0.371 0.393 0.694 -0.585 0.877
## 6 perc_disadva… 0.189 0.323 0.586 0.559 -0.446 0.824
# Regression table for parallel slopes model:
parallel_slopes_MA <-
lm(average_sat_math ~ perc_disadvan + size, data = MA_schools)
get_regression_table(parallel_slopes_MA)
## # A tibble: 4 × 7
## term estimate std_error statistic p_value lower_ci upper_ci
## <chr> <dbl> <dbl> <dbl> <dbl> <dbl> <dbl>
## 1 intercept 588. 7.61 77.3 0 573. 603.
## 2 perc_disadvan -2.78 0.106 -26.1 0 -2.99 -2.57
## 3 size: medium -11.9 7.54 -1.58 0.115 -26.7 2.91
## 4 size: large -6.36 6.92 -0.919 0.359 -20.0 7.26
Unlike our earlier comparison of interaction and parallel slopes models in , in this case it could be argued that the additional complexity of the interaction model is not warranted since the 3 three regression lines in the left-hand interaction are already somewhat parallel. Therefore the simpler parallel slopes model should be favored.
Going one step further, notice how the three regression lines in the
visualization of the parallel slopes model in the right-hand plot of
have similar intercepts. In can thus be argued that the additional model
complexity induced by introducing the categorical variable school
size
is not warranted. Therefore, a simple linear
regression model using only perc_disadvan
percent of the
student body that are economically disadvantaged should be favored.
While many students will inevitably find these results depressing, in our opinion, it is important to additionally emphasize that such regression analyses can be used as an empowering tool to bring to light inequities in access to education and inform policy decisions.
broom
functionsAs we mentioned earlier, the three get_regression_*
functions are wrappers of functions from the broom
package
for converting statistical analysis objects into tidy tibbles along with
a few added tweaks, but with the introductory statistics student in mind
(Robinson and Hayes 2019):
get_regression_table()
is a wrapper for
broom::tidy()
.get_regression_points()
is a wrapper for
broom::augment()
.get_regression_summaries
is a wrapper for
broom::glance()
.Why did we take this approach to address the initial 5 common student questions at the outset of the article?
broom
package function names tidy()
,
augment()
, and glance()
. To make them more
user-friendly, the moderndive
package wrappers have much
more intuitively named get_regression_table()
,
get_regression_points()
, and
get_regression_summaries()
.broom
functions are not all applicable to an introductory
statistics students and of those that were, we found they were not
intuitive for new R users. We therefore cut out some of the variables
from the output and renamed some of the remaining variables. For
example, compare the outputs of the get_regression_points()
wrapper function and the parent broom::augment()
function.get_regression_points(score_model)
## # A tibble: 463 × 5
## ID score age score_hat residual
## <int> <dbl> <int> <dbl> <dbl>
## 1 1 4.7 36 4.25 0.452
## 2 2 4.1 36 4.25 -0.148
## 3 3 3.9 36 4.25 -0.348
## 4 4 4.8 36 4.25 0.552
## 5 5 4.6 59 4.11 0.488
## 6 6 4.3 59 4.11 0.188
## 7 7 2.8 59 4.11 -1.31
## 8 8 4.1 51 4.16 -0.059
## 9 9 3.4 51 4.16 -0.759
## 10 10 4.5 40 4.22 0.276
## # ℹ 453 more rows
broom::augment(score_model)
## # A tibble: 463 × 8
## score age .fitted .resid .hat .sigma .cooksd .std.resid
## <dbl> <int> <dbl> <dbl> <dbl> <dbl> <dbl> <dbl>
## 1 4.7 36 4.25 0.452 0.00560 0.542 0.00197 0.837
## 2 4.1 36 4.25 -0.148 0.00560 0.542 0.000212 -0.274
## 3 3.9 36 4.25 -0.348 0.00560 0.542 0.00117 -0.645
## 4 4.8 36 4.25 0.552 0.00560 0.541 0.00294 1.02
## 5 4.6 59 4.11 0.488 0.00471 0.541 0.00193 0.904
## 6 4.3 59 4.11 0.188 0.00471 0.542 0.000288 0.349
## 7 2.8 59 4.11 -1.31 0.00471 0.538 0.0139 -2.43
## 8 4.1 51 4.16 -0.0591 0.00232 0.542 0.0000139 -0.109
## 9 3.4 51 4.16 -0.759 0.00232 0.541 0.00229 -1.40
## 10 4.5 40 4.22 0.276 0.00374 0.542 0.000488 0.510
## # ℹ 453 more rows
The source code for these three get_regression_*
functions can be found on GitHub.
The geom_parallel_slopes()
is a custom built
geom
extension to the ggplot2
package. For
example, the ggplot2
webpage page gives instructions on how to create such extensions. The
source code for geom_parallel_slopes()
written by Evgeni
Chasnovski can be found on GitHub.
Many thanks to Jenny Smetzer @smetzer180, Luke W. Johnston @lwjohnst86,
and Lisa Rosenthal @lisamr for their helpful feedback for this vignette
and to Evgeni Chasnovski @echasnovski for contributing the
geom_parallel_slopes()
function via GitHub pull request. The authors do not have any financial
support to disclose.
These binaries (installable software) and packages are in development.
They may not be fully stable and should be used with caution. We make no claims about them.