A Python package for inferring causal effects from observational data.
Causal inference analysis enables estimating the causal effect of an intervention on some outcome from real-world non-experimental observational data.
This package provides a suite of causal methods,
under a unified scikit-learn-inspired API.
It implements meta-algorithms that allow plugging in arbitrarily complex machine learning models.
This modular approach supports highly-flexible causal modelling.
The fit-and-predict-like API makes it possible to train on one set of examples
and estimate an effect on the other (out-of-bag),
which allows for a more "honest"1 effect estimation.
The package also includes an evaluation suite. Since most causal-models utilize machine learning models internally, we can diagnose poor-performing models by re-interpreting known ML evaluations from a causal perspective. If you use it in scientific context, please consider citing Shimoni et al., 2019:
@article{causalevaluations,
title={An Evaluation Toolkit to Guide Model Selection and Cohort Definition in Causal Inference},
author={Shimoni, Yishai and Karavani, Ehud and Ravid, Sivan and Bak, Peter and Ng, Tan Hung and Alford, Sharon Hensley and Meade, Denise and Goldschmidt, Yaara},
journal={arXiv preprint arXiv:1906.00442},
year={2019}
}
1 Borrowing Wager & Athey terminology of avoiding overfit.
pip install causallib
In general, the package is imported using the name causallib
.
Every causal model requires an internal machine-learning model.
causallib
supports any model that has a sklearn-like fit-predict API
(note some models might require a predict_proba
implementation).
For example:
from sklearn.linear_model import LogisticRegression
from causallib.estimation import IPW
from causallib.datasets import load_nhefs
data = load_nhefs()
ipw = IPW(LogisticRegression())
ipw.fit(data.X, data.a)
potential_outcomes = ipw.estimate_population_outcome(data.X, data.a, data.y)
effect = ipw.estimate_effect(potential_outcomes[1], potential_outcomes[0])
Comprehensive Jupyter Notebooks examples can be found in the examples directory.
We use the Slack workspace at causallib.slack.com for informal communication.
We encourage you to ask questions regarding causal-inference modelling or
usage of causallib that don't necessarily merit opening an issue on Github.
Use this invite link to join causallib on Slack.
Some key points on how we address causal-inference estimation
Causal effect may be the desired outcome.
However, every effect is defined by two potential (counterfactual) outcomes.
We adopt this two-step approach by separating the effect-estimating step
from the potential-outcome-prediction step.
A beneficial consequence to this approach is that it better supports
multi-treatment problems where "effect" is not well-defined.
The causal inference literature devotes special attention to the population
on which the effect is estimated on.
For example, ATE (average treatment effect on the entire sample),
ATT (average treatment effect on the treated), etc.
By allowing out-of-bag estimation, we leave this specification to the user.
For example, ATE is achieved by model.estimate_population_outcome(X, a)
and ATT is done by stratifying on the treated: model.estimate_population_outcome(X.loc[a==1], a.loc[a==1])
We distinguish between two types of models:
- Weight models: weight the data to balance between the treatment and control groups,
and then estimates the potential outcome by using a weighted average of the observed outcome.
Inverse Probability of Treatment Weighting (IPW or IPTW) is the most known example of such models. - Direct outcome models: uses the covariates (features) and treatment assignment to build a
model that predicts the outcome directly. The model can then be used to predict the outcome
under any assignment of treatment values, specifically the potential-outcome under assignment of
all controls or all treated.
These models are usually known as Standardization models, and it should be noted that, currently, they are the only ones able to generate individual effect estimation (otherwise known as CATE).
One of the most important steps in causal inference analysis is to have proper selection on both dimensions of the data to avoid introducing bias:
- On rows: thoughtfully choosing the right inclusion\exclusion criteria for individuals in the data.
- On columns: thoughtfully choosing what covariates (features) act as confounders and should be included in the analysis.
This is a place where domain expert knowledge is required and cannot be fully and truly automated
by algorithms.
This package assumes that the data provided to the model fit the criteria.
However, filtering can be applied in real-time using a scikit-learn pipeline estimator
that chains preprocessing steps (that can filter rows and select columns) with a causal model at the end.