crepes
is a Python package that implements conformal classifiers,
regressors, and predictive systems on top of any standard classifier
and regressor, turning the original predictions into
well-calibrated p-values and cumulative distribution functions, or
prediction sets and intervals with coverage guarantees.
The crepes
package implements standard and Mondrian conformal
classifiers as well as standard, normalized and Mondrian conformal
regressors and predictive systems. While the package allows you to use
your own functions to compute difficulty estimates, non-conformity
scores and Mondrian categories, there is also a separate module,
called crepes.extras
, which provides some standard options for
these.
From PyPI
pip install crepes
From conda-forge
conda install -c conda-forge crepes
For the complete documentation, see crepes.readthedocs.io.
Let us illustrate how we may use crepes
to generate and apply
conformal classifiers with a dataset from
www.openml.org, which we first split into a
training and a test set using train_test_split
from
sklearn, and then further split the
training set into a proper training set and a calibration set:
from sklearn.datasets import fetch_openml
from sklearn.model_selection import train_test_split
dataset = fetch_openml(name="qsar-biodeg", parser="auto")
X = dataset.data.values.astype(float)
y = dataset.target.values
X_train, X_test, y_train, y_test = train_test_split(X, y, test_size=0.5)
X_prop_train, X_cal, y_prop_train, y_cal = train_test_split(X_train, y_train,
test_size=0.25)
We now "wrap" a random forest classifier, fit it to the proper
training set, and fit a standard conformal classifier through the
calibrate
method:
from crepes import WrapClassifier
from sklearn.ensemble import RandomForestClassifier
rf = WrapClassifier(RandomForestClassifier(n_jobs=-1))
rf.fit(X_prop_train, y_prop_train)
rf.calibrate(X_cal, y_cal)
We may now produce p-values for the test set (an array with as many columns as there are classes):
rf.predict_p(X_test)
array([[0.46552707, 0.04407598],
[0.00382577, 0.85400826],
[0.64930738, 0.00804963],
...,
[0.33376105, 0.04065675],
[0.16968437, 0.12810237],
[0.02346899, 0.49634959]])
We can also get prediction sets, represented by binary vectors indicating presence (1) or absence (0) of the class labels that correspond to the columns, here at the 90% confidence level:
rf.predict_set(X_test, confidence=0.9)
array([[1, 0],
[0, 1],
[1, 0],
...,
[1, 0],
[1, 1],
[0, 1]])
Since we have access to the true class labels, we can evaluate the conformal classifier (here using all available metrics which is the default):
rf.evaluate(X_test, y_test, confidence=0.9)
{'error': 0.11553030303030298,
'avg_c': 1.0776515151515151,
'one_c': 0.9223484848484849,
'empty': 0.0,
'time_fit': 2.7418136596679688e-05,
'time_evaluate': 0.01745915412902832}
To control the error level across different groups of objects of
interest, we may use so-called Mondrian conformal classifiers. A
Mondrian conformal classifier is formed by providing the names of the
categories as an additional argument, named bins
, for the
calibrate
method.
Here we consider two categories formed by whether the third column (number of heavy atoms) equals zero or not:
bins_cal = X_cal[:,2] == 0
rf_mond = WrapClassifier(rf.learner)
rf_mond.calibrate(X_cal, y_cal, bins=bins_cal)
bins_test = X_test[:,2] == 0
rf_mond.predict_set(X_test, bins=bins_test)
array([[1, 0],
[0, 1],
[1, 0],
...,
[1, 1],
[1, 1],
[0, 1]])
For conformal classifiers that employ learners that use bagging, like random forests, we may consider an alternative strategy to dividing the original training set into a proper training and calibration set; we may use the out-of-bag (OOB) predictions, which allow us to use the full training set for both model building and calibration. It should be noted that this strategy does not come with the theoretical validity guarantee of the above (inductive) conformal classifiers, due to that calibration and test instances are not handled in exactly the same way. In practice, however, conformal classifiers based on out-of-bag predictions rarely fail to meet the coverage requirements.
Below we show how to enable this in conjunction with a specific type of Mondrian conformal classifier, a so-called class-conditional conformal classifier, which uses the class labels as Mondrian categories:
rf = WrapClassifier(RandomForestClassifier(n_jobs=-1, n_estimators=500, oob_score=True))
rf.fit(X_train, y_train)
rf.calibrate(X_train, y_train, class_cond=True, oob=True)
rf.evaluate(X_test, y_test, confidence=0.99)
{'error': 0.009469696969697017,
'avg_c': 1.696969696969697,
'one_c': 0.30303030303030304,
'empty': 0.0,
'time_fit': 0.0002560615539550781,
'time_evaluate': 0.06656742095947266}
Let us also illustrate how crepes
can be used to generate conformal
regressors and predictive systems. Again, we import a dataset from
www.openml.org, which we split into a
training and a test set and then further split the training set into a
proper training set and a calibration set:
from sklearn.datasets import fetch_openml
from sklearn.model_selection import train_test_split
dataset = fetch_openml(name="house_sales", version=3, parser="auto")
X = dataset.data.values.astype(float)
y = dataset.target.values.astype(float)
X_train, X_test, y_train, y_test = train_test_split(X, y, test_size=0.5)
X_prop_train, X_cal, y_prop_train, y_cal = train_test_split(X_train, y_train,
test_size=0.25)
Let us now "wrap" a RandomForestRegressor
from
sklearn using the class WrapRegressor
from crepes
and fit it (in the usual way) to the proper training
set:
from sklearn.ensemble import RandomForestRegressor
from crepes import WrapRegressor
rf = WrapRegressor(RandomForestRegressor())
rf.fit(X_prop_train, y_prop_train)
We may now fit a conformal regressor using the calibration set through
the calibrate
method:
rf.calibrate(X_cal, y_cal)
The conformal regressor can now produce prediction intervals for the test set, here using a confidence level of 99%:
rf.predict_int(X_test, confidence=0.99)
array([[-171902.2 , 953866.2 ],
[-276818.01, 848950.39],
[ 22679.37, 1148447.77],
...,
[ 242954.02, 1368722.42],
[-308093.73, 817674.67],
[-227057.4 , 898711. ]])
The output is a NumPy array with a row for each test instance, and where the two columns specify the lower and upper bound of each prediction interval.
We may request that the intervals are cut to exclude impossible values, in this case below 0, and if we also rely on the default confidence level (0.95), the output intervals will be a bit tighter:
rf.predict_int(X_test, y_min=0)
array([[ 152258.55, 629705.45],
[ 47342.74, 524789.64],
[ 346840.12, 824287.02],
...,
[ 567114.77, 1044561.67],
[ 16067.02, 493513.92],
[ 97103.35, 574550.25]])
The above intervals are not normalized, i.e., they are all of the same size (at least before they are cut). We could make them more informative through normalization using difficulty estimates; objects considered more difficult will be assigned wider intervals.
We will use a DifficultyEstimator
from the crepes.extras
module
for this purpose. Here we estimate the difficulty by the standard
deviation of the target of the k (default k=25
) nearest neighbors in
the proper training set to each object in the calibration set. A small
value (beta) is added to the estimates, which may be given through an
argument to the function; below we just use the default, i.e.,
beta=0.01
.
We first obtain the difficulty estimates for the calibration set:
from crepes.extras import DifficultyEstimator
de = DifficultyEstimator()
de.fit(X_prop_train, y=y_prop_train)
sigmas_cal = de.apply(X_cal)
These can now be used for the calibration, which will produce a normalized conformal regressor:
rf.calibrate(X_cal, y_cal, sigmas=sigmas_cal)
We need difficulty estimates for the test set too, which we provide as
input to predict_int
:
sigmas_test = de.apply(X_test)
rf.predict_int(X_test, sigmas=sigmas_test, y_min=0)
array([[ 226719.06607977, 555244.93392023],
[ 173767.90753715, 398364.47246285],
[ 124690.70166966, 1046436.43833034],
...,
[ 607949.71540572, 1003726.72459428],
[ 188671.3752278 , 320909.5647722 ],
[ 145340.39076824, 526313.20923176]])
Depending on the employed difficulty estimator, the normalized intervals may sometimes be unreasonably large, in the sense that they may be several times larger than any previously observed error. Moreover, if the difficulty estimator is uninformative, e.g., completely random, the varying interval sizes may give a false impression of that we can expect lower prediction errors for instances with tighter intervals. Ideally, a difficulty estimator providing little or no information on the expected error should instead lead to more uniformly distributed interval sizes.
A Mondrian conformal regressor can be used to address these problems,
by dividing the object space into non-overlapping so-called Mondrian
categories, and forming a (standard) conformal regressor for each
category. The category membership of the objects can be provided as an
additional argument, named bins
, for the fit
method.
Here we use the helper function binning
from crepes.extras
to form
Mondrian categories by equal-sized binning of the difficulty
estimates; the function returns labels for the calibration objects the
we provide as input to the calibration, and we also get thresholds for
the bins, which can use later when binning the test objects:
from crepes.extras import binning
bins_cal, bin_thresholds = binning(sigmas_cal, bins=20)
rf.calibrate(residuals, bins=bins_cal)
Let us now get the labels of the Mondrian categories for the test objects and use them when predicting intervals:
bins_test = binning(sigmas_test, bins=bin_thresholds)
rf.predict_int(X_test, bins=bins_test, y_min=0)
array([[ 206379.7 , 575584.3 ],
[ 144014.65, 428117.73],
[ 17965.57, 1153161.57],
...,
[ 653865.22, 957811.22],
[ 174264.87, 335316.07],
[ 140587.46, 531066.14]])
We could very easily switch from conformal regressors to conformal predictive systems. The latter produce cumulative distribution functions (conformal predictive distributions). From these we can generate prediction intervals, but we can also obtain percentiles, calibrated point predictions, as well as p-values for given target values. Let us see how we can go ahead to do that.
Well, there is only one thing above that changes: just provide
cps=True
to the calibrate
method.
We can, for example, form normalized Mondrian conformal predictive
systems, by providing both bins
and sigmas
to the calibrate
method. Here we will consider Mondrian categories formed from binning
the point predictions:
bins_cal, bin_thresholds = binning(rf.predict(X_cal), bins=5)
rf.calibrate(X_cal, y_cal, sigmas=sigmas_cal, bins=bins_cal, cps=True)
By providing the bins (and sigmas) for the test objects, we can now make predictions with the conformal predictive system, through the method predict_cps
.
The output of this method can be controlled quite flexibly; here we request prediction intervals with 95% confidence to be output:
bins_test = binning(rf.predict(X_test), bins=bin_thresholds)
rf.predict_cps(X_test, sigmas=sigmas_test, bins=bins_test,
lower_percentiles=2.5, higher_percentiles=97.5, y_min=0)
array([[ 245826.3422693 , 517315.83618985],
[ 145348.03415848, 392968.15587997],
[ 148774.65461212, 1034300.84195976],
...,
[ 589200.5725957 , 1057013.89102007],
[ 171938.29382952, 317732.31611141],
[ 167498.01540504, 482328.98552632]])
If we would like to take a look at the p-values for the true targets (these should be uniformly distributed), we can do the following:
rf.predict_cps(X_test, sigmas=sigmas_test, bins=bins_test, y=y_test)
array([0.98603614, 0.87178256, 0.44201984, ..., 0.05688804, 0.09473604,
0.31069913])
We may request that the predict_cps
method returns the full
conformal predictive distribution (CPD) for each test instance, as
defined by the threshold values, by setting return_cpds=True
. The
format of the distributions vary with the type of conformal predictive
system; for a standard and normalized CPS, the output is an array with
a row for each test instance and a column for each calibration
instance (residual), while for a Mondrian CPS, the default output is a
vector containing one CPD per test instance, since the number of
values may vary between categories.
cpds = rf.predict_cps(X_test, sigmas=sigmas_test, bins=bins_test, return_cpds=True)
The resulting vector of arrays is not displayed here, but we instead provide a plot for the CPD of a random test instance:
For additional examples of how to use the package and module, see the documentation, this Jupyter notebook using WrapClassifier and WrapRegressor, and this Jupyter notebook using ConformalClassifier, ConformalRegressor, and ConformalPredictiveSystem.
If you use crepes
for a scientific publication, you are kindly requested to cite the following paper:
Boström, H., 2022. crepes: a Python Package for Generating Conformal Regressors and Predictive Systems. In Conformal and Probabilistic Prediction and Applications. PMLR, 179. Link
Bibtex entry:
@InProceedings{crepes,
title = {crepes: a Python Package for Generating Conformal Regressors and Predictive Systems},
author = {Bostr\"om, Henrik},
booktitle = {Proceedings of the Eleventh Symposium on Conformal and Probabilistic Prediction and Applications},
year = {2022},
editor = {Johansson, Ulf and Boström, Henrik and An Nguyen, Khuong and Luo, Zhiyuan and Carlsson, Lars},
volume = {179},
series = {Proceedings of Machine Learning Research},
publisher = {PMLR}
}
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[3] Johansson, U., Boström, H., Löfström, T. and Linusson, H., 2014. Regression conformal prediction with random forests. Machine learning, 97(1-2), pp. 155-176. Link
[4] Boström, H., Linusson, H., Löfström, T. and Johansson, U., 2017. Accelerating difficulty estimation for conformal regression forests. Annals of Mathematics and Artificial Intelligence, 81(1-2), pp.125-144. Link
[5] Boström, H. and Johansson, U., 2020. Mondrian conformal regressors. In Conformal and Probabilistic Prediction and Applications. PMLR, 128, pp. 114-133. Link
[6] Vovk, V., Petej, I., Nouretdinov, I., Manokhin, V. and Gammerman, A., 2020. Computationally efficient versions of conformal predictive distributions. Neurocomputing, 397, pp.292-308. Link
[7] Boström, H., Johansson, U. and Löfström, T., 2021. Mondrian conformal predictive distributions. In Conformal and Probabilistic Prediction and Applications. PMLR, 152, pp. 24-38. Link
[8] Vovk, V., 2022. Universal predictive systems. Pattern Recognition. 126: pp. 108536 Link
Author: Henrik Boström (bostromh@kth.se) Copyright 2023 Henrik Boström License: BSD 3 clause