Lagged features for time series forecasting#

This example demonstrates how Polars-engineered lagged features can be used for time series forecasting with HistGradientBoostingRegressor on the Bike Sharing Demand dataset.

See the example on Time-related feature engineering for some data exploration on this dataset and a demo on periodic feature engineering.

Analyzing the Bike Sharing Demand dataset#

We start by loading the data from the OpenML repository as a pandas dataframe. This will be replaced with Polars once fetch_openml adds a native support for it. We convert to Polars for feature engineering, as it automatically caches common subexpressions which are reused in multiple expressions (like pl.col("count").shift(1) below). See https://docs.pola.rs/user-guide/lazy/optimizations/ for more information.

import numpy as np
import polars as pl

from sklearn.datasets import fetch_openml

pl.Config.set_fmt_str_lengths(20)

bike_sharing = fetch_openml(
    "Bike_Sharing_Demand", version=2, as_frame=True, parser="pandas"
)
df = bike_sharing.frame
df = pl.DataFrame({col: df[col].to_numpy() for col in df.columns})

Next, we take a look at the statistical summary of the dataset so that we can better understand the data that we are working with.

import polars.selectors as cs

summary = df.select(cs.numeric()).describe()
summary

shape: (9, 10)

statistic	year	month	hour	weekday	temp	feel_temp	humidity	windspeed	count
str	f64	f64	f64	f64	f64	f64	f64	f64	f64
"count"	17379.0	17379.0	17379.0	17379.0	17379.0	17379.0	17379.0	17379.0	17379.0
"null_count"	0.0	0.0	0.0	0.0	0.0	0.0	0.0	0.0	0.0
"mean"	0.502561	6.537775	11.546752	3.003683	20.376474	23.788755	0.627229	12.73654	189.463088
"std"	0.500008	3.438776	6.914405	2.005771	7.894801	8.592511	0.19293	8.196795	181.387599
"min"	0.0	1.0	0.0	0.0	0.82	0.0	0.0	0.0	1.0
"25%"	0.0	4.0	6.0	1.0	13.94	16.665	0.48	7.0015	40.0
"50%"	1.0	7.0	12.0	3.0	20.5	24.24	0.63	12.998	142.0
"75%"	1.0	10.0	18.0	5.0	27.06	31.06	0.78	16.9979	281.0
"max"	1.0	12.0	23.0	6.0	41.0	50.0	1.0	56.9969	977.0

Let us look at the count of the seasons "fall", "spring", "summer" and "winter" present in the dataset to confirm they are balanced.

import matplotlib.pyplot as plt

df["season"].value_counts()

shape: (4, 2)

season	count
str	u32
"spring"	4242
"fall"	4496
"winter"	4232
"summer"	4409

Generating Polars-engineered lagged features#

Let’s consider the problem of predicting the demand at the next hour given past demands. Since the demand is a continuous variable, one could intuitively use any regression model. However, we do not have the usual (X_train, y_train) dataset. Instead, we just have the y_train demand data sequentially organized by time.

lagged_df = df.select(
    "count",
    *[pl.col("count").shift(i).alias(f"lagged_count_{i}h") for i in [1, 2, 3]],
    lagged_count_1d=pl.col("count").shift(24),
    lagged_count_1d_1h=pl.col("count").shift(24 + 1),
    lagged_count_7d=pl.col("count").shift(7 * 24),
    lagged_count_7d_1h=pl.col("count").shift(7 * 24 + 1),
    lagged_mean_24h=pl.col("count").shift(1).rolling_mean(24),
    lagged_max_24h=pl.col("count").shift(1).rolling_max(24),
    lagged_min_24h=pl.col("count").shift(1).rolling_min(24),
    lagged_mean_7d=pl.col("count").shift(1).rolling_mean(7 * 24),
    lagged_max_7d=pl.col("count").shift(1).rolling_max(7 * 24),
    lagged_min_7d=pl.col("count").shift(1).rolling_min(7 * 24),
)
lagged_df.tail(10)

shape: (10, 14)

count	lagged_count_1h	lagged_count_2h	lagged_count_3h	lagged_count_1d	lagged_count_1d_1h	lagged_count_7d	lagged_count_7d_1h	lagged_mean_24h	lagged_max_24h	lagged_min_24h	lagged_mean_7d	lagged_max_7d	lagged_min_7d
i64	i64	i64	i64	i64	i64	i64	i64	f64	i64	i64	f64	i64	i64
247	203	224	157	160	169	70	135	93.5	224	1	67.732143	271	1
315	247	203	224	138	160	46	70	97.125	247	1	68.785714	271	1
214	315	247	203	133	138	33	46	104.5	315	1	70.386905	315	1
164	214	315	247	123	133	33	33	107.875	315	1	71.464286	315	1
122	164	214	315	125	123	26	33	109.583333	315	1	72.244048	315	1
119	122	164	214	102	125	26	26	109.458333	315	1	72.815476	315	1
89	119	122	164	72	102	18	26	110.166667	315	1	73.369048	315	1
90	89	119	122	47	72	23	18	110.875	315	1	73.791667	315	1
61	90	89	119	36	47	22	23	112.666667	315	1	74.190476	315	1
49	61	90	89	49	36	12	22	113.708333	315	1	74.422619	315	1

Watch out however, the first lines have undefined values because their own past is unknown. This depends on how much lag we used:

lagged_df.head(10)

shape: (10, 14)

count	lagged_count_1h	lagged_count_2h	lagged_count_3h	lagged_count_1d	lagged_count_1d_1h	lagged_count_7d	lagged_count_7d_1h	lagged_mean_24h	lagged_max_24h	lagged_min_24h	lagged_mean_7d	lagged_max_7d	lagged_min_7d
i64	i64	i64	i64	i64	i64	i64	i64	f64	i64	i64	f64	i64	i64
16	null	null	null	null	null	null	null	null	null	null	null	null	null
40	16	null	null	null	null	null	null	null	null	null	null	null	null
32	40	16	null	null	null	null	null	null	null	null	null	null	null
13	32	40	16	null	null	null	null	null	null	null	null	null	null
1	13	32	40	null	null	null	null	null	null	null	null	null	null
1	1	13	32	null	null	null	null	null	null	null	null	null	null
2	1	1	13	null	null	null	null	null	null	null	null	null	null
3	2	1	1	null	null	null	null	null	null	null	null	null	null
8	3	2	1	null	null	null	null	null	null	null	null	null	null
14	8	3	2	null	null	null	null	null	null	null	null	null	null

We can now separate the lagged features in a matrix X and the target variable (the counts to predict) in an array of the same first dimension y.

lagged_df = lagged_df.drop_nulls()
X = lagged_df.drop("count")
y = lagged_df["count"]
print("X shape: {}\ny shape: {}".format(X.shape, y.shape))

X shape: (17210, 13)
y shape: (17210,)

Naive evaluation of the next hour bike demand regression#

Let’s randomly split our tabularized dataset to train a gradient boosting regression tree (GBRT) model and evaluate it using Mean Absolute Percentage Error (MAPE). If our model is aimed at forecasting (i.e., predicting future data from past data), we should not use training data that are ulterior to the testing data. In time series machine learning the “i.i.d” (independent and identically distributed) assumption does not hold true as the data points are not independent and have a temporal relationship.

from sklearn.ensemble import HistGradientBoostingRegressor
from sklearn.model_selection import train_test_split

X_train, X_test, y_train, y_test = train_test_split(
    X, y, test_size=0.2, random_state=42
)

model = HistGradientBoostingRegressor().fit(X_train, y_train)

Taking a look at the performance of the model.

from sklearn.metrics import mean_absolute_percentage_error

y_pred = model.predict(X_test)
mean_absolute_percentage_error(y_test, y_pred)

np.float64(0.3889873516666431)

Proper next hour forecasting evaluation#

Let’s use a proper evaluation splitting strategies that takes into account the temporal structure of the dataset to evaluate our model’s ability to predict data points in the future (to avoid cheating by reading values from the lagged features in the training set).

from sklearn.model_selection import TimeSeriesSplit

ts_cv = TimeSeriesSplit(
    n_splits=3,  # to keep the notebook fast enough on common laptops
    gap=48,  # 2 days data gap between train and test
    max_train_size=10000,  # keep train sets of comparable sizes
    test_size=3000,  # for 2 or 3 digits of precision in scores
)
all_splits = list(ts_cv.split(X, y))

Training the model and evaluating its performance based on MAPE.

train_idx, test_idx = all_splits[0]
X_train, X_test = X[train_idx, :], X[test_idx, :]
y_train, y_test = y[train_idx], y[test_idx]

model = HistGradientBoostingRegressor().fit(X_train, y_train)
y_pred = model.predict(X_test)
mean_absolute_percentage_error(y_test, y_pred)

np.float64(0.44300751539296973)

The generalization error measured via a shuffled trained test split is too optimistic. The generalization via a time-based split is likely to be more representative of the true performance of the regression model. Let’s assess this variability of our error evaluation with proper cross-validation:

from sklearn.model_selection import cross_val_score

cv_mape_scores = -cross_val_score(
    model, X, y, cv=ts_cv, scoring="neg_mean_absolute_percentage_error"
)
cv_mape_scores

array([0.44300752, 0.27772182, 0.3697178 ])

The variability across splits is quite large! In a real life setting it would be advised to use more splits to better assess the variability. Let’s report the mean CV scores and their standard deviation from now on.

print(f"CV MAPE: {cv_mape_scores.mean():.3f} ± {cv_mape_scores.std():.3f}")

CV MAPE: 0.363 ± 0.068

We can compute several combinations of evaluation metrics and loss functions, which are reported a bit below.

from collections import defaultdict

from sklearn.metrics import (
    make_scorer,
    mean_absolute_error,
    mean_pinball_loss,
    root_mean_squared_error,
)
from sklearn.model_selection import cross_validate


def consolidate_scores(cv_results, scores, metric):
    if metric == "MAPE":
        scores[metric].append(f"{value.mean():.2f} ± {value.std():.2f}")
    else:
        scores[metric].append(f"{value.mean():.1f} ± {value.std():.1f}")

    return scores


scoring = {
    "MAPE": make_scorer(mean_absolute_percentage_error),
    "RMSE": make_scorer(root_mean_squared_error),
    "MAE": make_scorer(mean_absolute_error),
    "pinball_loss_05": make_scorer(mean_pinball_loss, alpha=0.05),
    "pinball_loss_50": make_scorer(mean_pinball_loss, alpha=0.50),
    "pinball_loss_95": make_scorer(mean_pinball_loss, alpha=0.95),
}
loss_functions = ["squared_error", "poisson", "absolute_error"]
scores = defaultdict(list)
for loss_func in loss_functions:
    model = HistGradientBoostingRegressor(loss=loss_func)
    cv_results = cross_validate(
        model,
        X,
        y,
        cv=ts_cv,
        scoring=scoring,
        n_jobs=2,
    )
    time = cv_results["fit_time"]
    scores["loss"].append(loss_func)
    scores["fit_time"].append(f"{time.mean():.2f} ± {time.std():.2f} s")

    for key, value in cv_results.items():
        if key.startswith("test_"):
            metric = key.split("test_")[1]
            scores = consolidate_scores(cv_results, scores, metric)

Modeling predictive uncertainty via quantile regression#

Instead of modeling the expected value of the distribution of \(Y|X\) like the least squares and Poisson losses do, one could try to estimate quantiles of the conditional distribution.

\(Y|X=x_i\) is expected to be a random variable for a given data point \(x_i\) because we expect that the number of rentals cannot be 100% accurately predicted from the features. It can be influenced by other variables not properly captured by the existing lagged features. For instance whether or not it will rain in the next hour cannot be fully anticipated from the past hours bike rental data. This is what we call aleatoric uncertainty.

Quantile regression makes it possible to give a finer description of that distribution without making strong assumptions on its shape.

quantile_list = [0.05, 0.5, 0.95]

for quantile in quantile_list:
    model = HistGradientBoostingRegressor(loss="quantile", quantile=quantile)
    cv_results = cross_validate(
        model,
        X,
        y,
        cv=ts_cv,
        scoring=scoring,
        n_jobs=2,
    )
    time = cv_results["fit_time"]
    scores["fit_time"].append(f"{time.mean():.2f} ± {time.std():.2f} s")

    scores["loss"].append(f"quantile {int(quantile*100)}")
    for key, value in cv_results.items():
        if key.startswith("test_"):
            metric = key.split("test_")[1]
            scores = consolidate_scores(cv_results, scores, metric)

scores_df = pl.DataFrame(scores)
scores_df

shape: (6, 8)

loss	fit_time	MAPE	RMSE	MAE	pinball_loss_05	pinball_loss_50	pinball_loss_95
str	str	str	str	str	str	str	str
"squared_error"	"0.39 ± 0.06 s"	"0.36 ± 0.07"	"62.3 ± 3.5"	"39.1 ± 2.3"	"17.7 ± 1.3"	"19.5 ± 1.1"	"21.4 ± 2.4"
"poisson"	"0.35 ± 0.05 s"	"0.32 ± 0.07"	"64.2 ± 4.0"	"39.3 ± 2.8"	"16.7 ± 1.5"	"19.7 ± 1.4"	"22.6 ± 3.0"
"absolute_error"	"0.49 ± 0.02 s"	"0.32 ± 0.06"	"64.6 ± 3.8"	"39.9 ± 3.2"	"17.1 ± 1.1"	"19.9 ± 1.6"	"22.7 ± 3.1"
"quantile 5"	"0.62 ± 0.04 s"	"0.41 ± 0.01"	"145.6 ± 20.9"	"92.5 ± 16.2"	"5.9 ± 0.9"	"46.2 ± 8.1"	"86.6 ± 15.3"
"quantile 50"	"0.67 ± 0.04 s"	"0.32 ± 0.06"	"64.6 ± 3.8"	"39.9 ± 3.2"	"17.1 ± 1.1"	"19.9 ± 1.6"	"22.7 ± 3.1"
"quantile 95"	"0.58 ± 0.02 s"	"1.07 ± 0.27"	"99.6 ± 8.7"	"72.0 ± 6.1"	"62.9 ± 7.4"	"36.0 ± 3.1"	"9.1 ± 1.3"

Let us take a look at the losses that minimise each metric.

def min_arg(col):
    col_split = pl.col(col).str.split(" ")
    return pl.arg_sort_by(
        col_split.list.get(0).cast(pl.Float64),
        col_split.list.get(2).cast(pl.Float64),
    ).first()


scores_df.select(
    pl.col("loss").get(min_arg(col_name)).alias(col_name)
    for col_name in scores_df.columns
    if col_name != "loss"
)

shape: (1, 7)

fit_time	MAPE	RMSE	MAE	pinball_loss_05	pinball_loss_50	pinball_loss_95
str	str	str	str	str	str	str
"poisson"	"absolute_error"	"squared_error"	"squared_error"	"quantile 5"	"squared_error"	"quantile 95"

Even if the score distributions overlap due to the variance in the dataset, it is true that the average RMSE is lower when loss="squared_error", whereas the average MAPE is lower when loss="absolute_error" as expected. That is also the case for the Mean Pinball Loss with the quantiles 5 and 95. The score corresponding to the 50 quantile loss is overlapping with the score obtained by minimizing other loss functions, which is also the case for the MAE.

A qualitative look at the predictions#

We can now visualize the performance of the model with regards to the 5th percentile, median and the 95th percentile:

all_splits = list(ts_cv.split(X, y))
train_idx, test_idx = all_splits[0]

X_train, X_test = X[train_idx, :], X[test_idx, :]
y_train, y_test = y[train_idx], y[test_idx]

max_iter = 50
gbrt_mean_poisson = HistGradientBoostingRegressor(loss="poisson", max_iter=max_iter)
gbrt_mean_poisson.fit(X_train, y_train)
mean_predictions = gbrt_mean_poisson.predict(X_test)

gbrt_median = HistGradientBoostingRegressor(
    loss="quantile", quantile=0.5, max_iter=max_iter
)
gbrt_median.fit(X_train, y_train)
median_predictions = gbrt_median.predict(X_test)

gbrt_percentile_5 = HistGradientBoostingRegressor(
    loss="quantile", quantile=0.05, max_iter=max_iter
)
gbrt_percentile_5.fit(X_train, y_train)
percentile_5_predictions = gbrt_percentile_5.predict(X_test)

gbrt_percentile_95 = HistGradientBoostingRegressor(
    loss="quantile", quantile=0.95, max_iter=max_iter
)
gbrt_percentile_95.fit(X_train, y_train)
percentile_95_predictions = gbrt_percentile_95.predict(X_test)

We can now take a look at the predictions made by the regression models:

last_hours = slice(-96, None)
fig, ax = plt.subplots(figsize=(15, 7))
plt.title("Predictions by regression models")
ax.plot(
    y_test[last_hours],
    "x-",
    alpha=0.2,
    label="Actual demand",
    color="black",
)
ax.plot(
    median_predictions[last_hours],
    "^-",
    label="GBRT median",
)
ax.plot(
    mean_predictions[last_hours],
    "x-",
    label="GBRT mean (Poisson)",
)
ax.fill_between(
    np.arange(96),
    percentile_5_predictions[last_hours],
    percentile_95_predictions[last_hours],
    alpha=0.3,
    label="GBRT 90% interval",
)
_ = ax.legend()

Here it’s interesting to notice that the blue area between the 5% and 95% percentile estimators has a width that varies with the time of the day:

At night, the blue band is much narrower: the pair of models is quite certain that there will be a small number of bike rentals. And furthermore these seem correct in the sense that the actual demand stays in that blue band.
During the day, the blue band is much wider: the uncertainty grows, probably because of the variability of the weather that can have a very large impact, especially on week-ends.
We can also see that during week-days, the commute pattern is still visible in the 5% and 95% estimations.
Finally, it is expected that 10% of the time, the actual demand does not lie between the 5% and 95% percentile estimates. On this test span, the actual demand seems to be higher, especially during the rush hours. It might reveal that our 95% percentile estimator underestimates the demand peaks. This could be be quantitatively confirmed by computing empirical coverage numbers as done in the calibration of confidence intervals.

Looking at the performance of non-linear regression models vs the best models:

from sklearn.metrics import PredictionErrorDisplay

fig, axes = plt.subplots(ncols=3, figsize=(15, 6), sharey=True)
fig.suptitle("Non-linear regression models")
predictions = [
    median_predictions,
    percentile_5_predictions,
    percentile_95_predictions,
]
labels = [
    "Median",
    "5th percentile",
    "95th percentile",
]
for ax, pred, label in zip(axes, predictions, labels):
    PredictionErrorDisplay.from_predictions(
        y_true=y_test,
        y_pred=pred,
        kind="residual_vs_predicted",
        scatter_kwargs={"alpha": 0.3},
        ax=ax,
    )
    ax.set(xlabel="Predicted demand", ylabel="True demand")
    ax.legend(["Best model", label])

plt.show()

Conclusion#

Through this example we explored time series forecasting using lagged features. We compared a naive regression (using the standardized train_test_split) with a proper time series evaluation strategy using TimeSeriesSplit. We observed that the model trained using train_test_split, having a default value of shuffle set to True produced an overly optimistic Mean Average Percentage Error (MAPE). The results produced from the time-based split better represent the performance of our time-series regression model. We also analyzed the predictive uncertainty of our model via Quantile Regression. Predictions based on the 5th and 95th percentile using loss="quantile" provide us with a quantitative estimate of the uncertainty of the forecasts made by our time series regression model. Uncertainty estimation can also be performed using MAPIE, that provides an implementation based on recent work on conformal prediction methods and estimates both aleatoric and epistemic uncertainty at the same time. Furthermore, functionalities provided by sktime can be used to extend scikit-learn estimators by making use of recursive time series forecasting, that enables dynamic predictions of future values.