```
library(dplyr); library(tidyr); library(purrr) # Data wrangling
library(ggplot2); library(stringr) # Plotting
library(tidyfit) # Model fitting
# Max model size
MODEL_SIZE <- 10
```

`tidyfit`

packages several methods that can be used for feature selection. These include **filter**, **wrapper** and **embedded** algorithms. In this tutorial, we will use 3 algorithms from each of these broader categories, in order to select the top 10 best predictors of industrial production from a macroeconomic data set of monthly US economic indicators (FRED-MD).

The FRED-MD data set contains 134 variables characterizing the US macroeconomy with a monthly frequency and values (across all features) since the early 1990s. The data set is often used in academic research — primarily for the development of high-dimensional forecasting and nowcasting. All variables have conveniently been transformed to ensure stationarity. A description of the data as well as transformations can be found here.

The data can be downloaded using the `fbi`

-package in `R`

.^[See `?fbi::fredmd`

.] In addition to the variables included there, I augment the ISM manufacturing PMI data (6 features), which is no longer provided by FRED.

```
# Load the data
data <- readRDS("FRED-MD.rds")
```

Let’s shift the target to generate a forecast, and drop missing values:

```
data <- data %>%
arrange(date) %>%
# Shift the target by 1 month
mutate(Target = lead(INDPRO)) %>%
drop_na %>%
select(-date)
data
#> # A tibble: 363 × 135
#> RPI W875RX1 DPCERA3M086SBEA CMRMTSPLx RETAILx INDPRO IPFPNSS
#> <dbl> <dbl> <dbl> <dbl> <dbl> <dbl> <dbl>
#> 1 0.00165 0.000812 0.00182 0.00402 -0.00300 0.00828 0.00851
#> 2 0.00373 0.00275 0.000839 0.00664 0.00602 0.00759 0.00743
#> 3 0.00533 0.00549 0.00515 -0.00874 0.00547 0.00322 0.00550
#> 4 0.00417 0.00445 0.00270 0.0105 0.00280 0.000539 -0.00244
#> 5 -0.000796 -0.00135 0.00334 0.0133 0.00708 0.00891 0.00998
#> 6 0.00386 0.00381 0.00247 -0.0160 0.00324 -0.00557 -0.00114
#> 7 -0.00383 -0.00495 0.00649 0.0138 0.00949 0.00314 -0.000570
#> 8 -0.00492 -0.00580 0.00337 0.00404 0.00721 0.00679 0.00775
#> 9 0.00218 0.00446 0.00171 0.00170 0.00221 0.00403 0.00285
#> 10 0.0358 0.0401 0.00656 0.0154 0.0122 0.00158 0.00336
#> # ℹ 353 more rows
#> # ℹ 128 more variables: IPFINAL <dbl>, IPCONGD <dbl>, IPDCONGD <dbl>,
#> # IPNCONGD <dbl>, IPBUSEQ <dbl>, IPMAT <dbl>, IPDMAT <dbl>, IPNMAT <dbl>,
#> # IPMANSICS <dbl>, IPB51222S <dbl>, IPFUELS <dbl>, CUMFNS <dbl>, HWI <dbl>,
#> # HWIURATIO <dbl>, CLF16OV <dbl>, CE16OV <dbl>, UNRATE <dbl>, UEMPMEAN <dbl>,
#> # UEMPLT5 <dbl>, UEMP5TO14 <dbl>, UEMP15OV <dbl>, UEMP15T26 <dbl>,
#> # UEMP27OV <dbl>, CLAIMSx <dbl>, PAYEMS <dbl>, USGOOD <dbl>, …
```

We will fit each of the feature selection algorithms using the `regress`

function in `tidyfit`

, and will iteratively build a `tidyfit.models`

-frame below.

Filter methods are model-agnostic and perform univariate comparisons between each feature and the target. They encompass the simplest (and typically fastest) group of algorithms. One of the most basic forms of feature selection uses **Pearson’s correlation** coefficient. As with all `tidyfit`

methods, `m("cor")`

fits the method. The actual correlation coefficients will be obtained using `coef()`

:

```
# Correlation
algorithms_df <- data %>%
regress(Target ~ ., Correlation = m("cor"))
```

The **ReliefF** algorithm is a popular nearest-neighbors-based approach to feature selection and can be implemented using `m("relief")`

. The function will automatically use the regression version (RReliefF) when executed within a `regress`

wrapper:

```
# RReliefF
algorithms_df <- algorithms_df %>%
bind_rows(
data %>%
regress(Target ~ ., RReliefF = m("relief"))
)
```

Under the hood, `m("relief")`

is a wrapper for `CORElearn::attrEval`

, which bundles a large number of selection algorithms, with `estimator = "RReliefFequalK"`

as the default. This default can be overridden to employ any alternative feature selection algorithm, such as another nonparametric method called **information gain**. This method first requires the continuous target to be bucketized:

```
# Information Gain
algorithms_df <- algorithms_df %>%
bind_rows(
data %>%
# Split target into buckets
mutate(Target = as.factor(ntile(Target, 10))) %>%
regress(Target ~ .,
`Information Gain` = m("relief", estimator = "InfGain"))
)
```

The next set of methods perform iterative feature selection. The methods fit a model in a sequential manner, eliminating or adding features based on some criterion of model fit or predictive accuracy. We begin with **forward selection**, performed using `m("subset")`

. Here we can specify the target model size directly:

```
# Forward Selection
algorithms_df <- algorithms_df %>%
bind_rows(
data %>%
regress(Target ~ .,
`Forward Selection` = m("subset", method = "forward", nvmax = MODEL_SIZE))
)
```

The opposite of forward selection is **backward elimination**. This method is also implemented using the “subset” wrapper:

```
# Backward Elimination
algorithms_df <- algorithms_df %>%
bind_rows(
data %>%
regress(Target ~ .,
`Backward Elimination` = m("subset", method = "backward", nvmax = MODEL_SIZE))
)
```

The final sequential algorithm examined here is **minimum redundancy, maximum relevance (MRMR)**. The algorithm selects features based on the dual objective of maximizing the relevance for the target, while minimizing redundant information in the feature set. `m("mrmr")`

is a wrapper for `mRMRe::mRMR.ensemble`

:

```
# MRMR
algorithms_df <- algorithms_df %>%
bind_rows(
data %>%
regress(Target ~ ., MRMR = m("mrmr", feature_count = MODEL_SIZE))
)
```

The last group of feature selection algorithms, embedded methods, combine model selection and estimation into a single step — for instance, by forcing a subset of the parameter weights to be zero. The **LASSO** does this by introducing an \(L1\)-penalty on the parameters. Here we will use an expanding window grid search validation to determine the optimal penalty^[See `?rsample::rolling_origin`

for details]:

```
# LASSO
algorithms_df <- algorithms_df %>%
bind_rows(
data %>%
regress(Target ~ .,
`LASSO` = m("lasso", pmax = MODEL_SIZE + 1),
.cv = "rolling_origin",
.cv_args = list(initial = 120, assess = 24, skip = 23)
)
)
```

**Bayesian model averaging** takes a different approach, sampling a large number of models and using Bayes’ rule to compute a posterior inclusion probability for each feature. `m("bma")`

is a wrapper for `BMS::bms`

:

```
# BMA
algorithms_df <- algorithms_df %>%
bind_rows(
data %>%
regress(Target ~ .,
BMA = m("bma", burn = 10000, iter = 100000,
mprior.size = MODEL_SIZE, mcmc = "rev.jump"))
)
```

Last, but not least, **Random Forests importance** is a popular machine learning technique for model selection. We estimate a simple random forest using default settings, with `m("rf")`

, which is a wrapper for the `randomForest`

-package. Note that `importance = TRUE`

by default, thus feature importances are computed and can be accessed using `coef`

:

```
# Random Forest Importance
nonlinear_algorithms_df <- data %>%
regress(Target ~ ., `RF Importance` = m("rf"))
```

All information needed to select the top 10 features for each algorithm can be obtained using `coef(algorithms_df)`

and unnesting the additional information stored in `model_info`

:

```
coef_df <- coef(algorithms_df) %>%
unnest(model_info) %>%
bind_rows(explain(nonlinear_algorithms_df))
```

Some algorithms return more than the maximum 10 variables. For instance, the filter methods (correlation, RReliefF and information gain) return a score for each feature. The below code chunk selects the top 10 features for each algorithm:

```
model_df <- coef_df %>%
# Always remove the intercept
filter(term != "(Intercept)") %>%
mutate(selected = case_when(
# Extract top 10 largest scores
model %in% c("Correlation", "RReliefF", "Information Gain") ~
rank(-abs(estimate)) <= MODEL_SIZE,
# BMA features are selected using the posterior inclusion probability
model == "BMA" ~ rank(-pip) <= MODEL_SIZE,
# The RF importance is stored in a separate column (%IncMSE)
model == "RF Importance" ~ rank(-importance) <= MODEL_SIZE,
# For all other methods keep all features
TRUE ~ TRUE
)) %>%
# Keep only included terms
filter(selected) %>%
select(model, term)
```

Before examining the results, we will also add a **domain expert**. Here I simply add those features that are included in the US Conference Board Composite Leading Indicator and are available in our data set:

```
model_df <- model_df %>%
bind_rows(tibble(
model = "Domain Expert",
term = c("NAPMNOI", "ANDENOx", "CLAIMSx", "ACOGNO",
"S&P 500", "T10YFFM", "PERMIT", "AWHMAN")
))
```

Now, let’s examine the models selected by each of the various algorithms:

```
model_df %>%
# Add 'FALSE' entries, when a feature is not selected
mutate(selected = TRUE) %>%
spread(term, selected) %>%
gather("term", "selected", -model) %>%
# Plotting color
mutate(selected = ifelse(is.na(selected), "white", "darkblue")) %>%
# Fix plotting order
group_by(term) %>%
mutate(selected_sum = sum(selected=="darkblue")) %>%
ungroup %>%
arrange(desc(selected_sum)) %>%
mutate(term = factor(term, levels = unique(term))) %>%
mutate(model = factor(model, levels = unique(model_df$model))) %>%
ggplot(aes(term, model)) +
geom_tile(aes(fill = selected)) +
theme_bw(8, "Arial") +
scale_fill_identity() +
xlab(element_blank()) + ylab(element_blank()) +
theme(axis.text.x = element_text(angle = 90, vjust = 0.5, hjust=1))
```

There is quite a lot of disagreement between different feature selection algorithms. We can develop an understanding of the type of information selected by each algorithm by examining how well each feature set explains the target using the \(R2\)-statistic. To get a sense of the sample stability, we generate bootstrap samples and regress the target onto each model. Note that it is important to set `.force_cv = TRUE`

below, since `m("lm")`

does not have hyperparameters and thus ignores the `.cv`

argument by default.

```
model_names <- unique(model_df$model)
# Retrieve selected variables
selected_vars_list <- model_names %>%
map(function(mod) {
model_df %>%
filter(model == mod) %>%
pull(term)
})
names(selected_vars_list) <- model_names
# Bootstrap resampling & regression
boot_models_df <- selected_vars_list %>%
map_dfr(function(selected_vars) {
data %>%
select(all_of(c("Target", selected_vars))) %>%
regress(Target ~ .,
# Use linear regression
m("lm"),
# Bootstrap settings (see ?rsample::bootstraps)
.cv = "bootstraps", .cv_args = list(times = 100),
# Make sure the results for each slice are returned
.force_cv = T, .return_slices = T)
}, .id = "model")
# Finally, extract R2 from the model results
boot_df <- boot_models_df %>%
mutate(R2 = map_dbl(model_object, function(obj) summary(obj)$r.squared)) %>%
select(model, R2)
```

```
boot_df %>%
group_by(model) %>%
mutate(upper = mean(R2) + 2 * sd(R2) / sqrt(n()),
lower = mean(R2) - 2 * sd(R2) / sqrt(n())) %>%
mutate(model = str_wrap(model, 10)) %>%
mutate(model = factor(model, levels = str_wrap(unique(model_df$model), 10))) %>%
ggplot(aes(model)) +
geom_errorbar(aes(ymin = lower, ymax = upper), linewidth = 0.25, width = 0.25) +
theme_bw(8, "Arial") +
xlab(element_blank()) + ylab("R2 statistic")
```

The filter methods as well as RF Importance tend to explain a relatively small proportion of the response variation, while BMA and subset selection algorithms perform best.