Demo for the DoWhy causal API#
We show a simple example of adding a causal extension to any dataframe.
[1]:
import dowhy.datasets
import dowhy.api
from dowhy.graph import build_graph_from_str
import numpy as np
import pandas as pd
from statsmodels.api import OLS
[2]:
data = dowhy.datasets.linear_dataset(beta=5,
num_common_causes=1,
num_instruments = 0,
num_samples=1000,
treatment_is_binary=True)
df = data['df']
df['y'] = df['y'] + np.random.normal(size=len(df)) # Adding noise to data. Without noise, the variance in Y|X, Z is zero, and mcmc fails.
nx_graph = build_graph_from_str(data["dot_graph"])
treatment= data["treatment_name"][0]
outcome = data["outcome_name"][0]
common_cause = data["common_causes_names"][0]
df
[2]:
| W0 | v0 | y | |
|---|---|---|---|
| 0 | 0.692489 | True | 6.513994 |
| 1 | 0.647121 | True | 8.080264 |
| 2 | -0.291692 | True | 3.450810 |
| 3 | 1.054548 | True | 8.130324 |
| 4 | -0.618836 | True | 3.947363 |
| ... | ... | ... | ... |
| 995 | 2.401029 | True | 9.171075 |
| 996 | 1.724637 | True | 8.373037 |
| 997 | 0.999508 | True | 7.068687 |
| 998 | -0.378417 | False | 1.271395 |
| 999 | -0.114634 | True | 4.968926 |
1000 rows × 3 columns
[3]:
# data['df'] is just a regular pandas.DataFrame
df.causal.do(x=treatment,
variable_types={treatment: 'b', outcome: 'c', common_cause: 'c'},
outcome=outcome,
common_causes=[common_cause],
).groupby(treatment).mean().plot(y=outcome, kind='bar')
[3]:
<Axes: xlabel='v0'>
[4]:
df.causal.do(x={treatment: 1},
variable_types={treatment:'b', outcome: 'c', common_cause: 'c'},
outcome=outcome,
method='weighting',
common_causes=[common_cause]
).groupby(treatment).mean().plot(y=outcome, kind='bar')
[4]:
<Axes: xlabel='v0'>
[5]:
cdf_1 = df.causal.do(x={treatment: 1},
variable_types={treatment: 'b', outcome: 'c', common_cause: 'c'},
outcome=outcome,
graph=nx_graph
)
cdf_0 = df.causal.do(x={treatment: 0},
variable_types={treatment: 'b', outcome: 'c', common_cause: 'c'},
outcome=outcome,
graph=nx_graph
)
[6]:
cdf_0
[6]:
| W0 | v0 | y | propensity_score | weight | |
|---|---|---|---|---|---|
| 0 | 1.232935 | False | 0.530949 | 0.070514 | 14.181545 |
| 1 | -0.120800 | False | -1.078003 | 0.539004 | 1.855275 |
| 2 | 0.601958 | False | 2.265526 | 0.213499 | 4.683865 |
| 3 | 0.292528 | False | 0.574488 | 0.336535 | 2.971462 |
| 4 | 1.000027 | False | 0.634646 | 0.108299 | 9.233726 |
| ... | ... | ... | ... | ... | ... |
| 995 | 1.312027 | False | 3.808483 | 0.060733 | 16.465611 |
| 996 | 0.707995 | False | 1.570884 | 0.179726 | 5.564022 |
| 997 | 0.805173 | False | 1.552603 | 0.152575 | 6.554158 |
| 998 | 0.598637 | False | -0.046964 | 0.214628 | 4.659231 |
| 999 | 0.204984 | False | -1.838001 | 0.377095 | 2.651853 |
1000 rows × 5 columns
[7]:
cdf_1
[7]:
| W0 | v0 | y | propensity_score | weight | |
|---|---|---|---|---|---|
| 0 | 0.411220 | True | 5.997172 | 0.714754 | 1.399083 |
| 1 | 1.470005 | True | 7.939459 | 0.955118 | 1.046991 |
| 2 | 0.302906 | True | 6.055634 | 0.668131 | 1.496713 |
| 3 | 0.763221 | True | 5.912023 | 0.836140 | 1.195972 |
| 4 | -0.505381 | True | 3.969568 | 0.282244 | 3.543032 |
| ... | ... | ... | ... | ... | ... |
| 995 | 0.879454 | True | 5.608546 | 0.865835 | 1.154954 |
| 996 | 2.503162 | True | 10.771813 | 0.994207 | 1.005827 |
| 997 | 2.256445 | True | 8.361526 | 0.990499 | 1.009593 |
| 998 | 1.252414 | True | 6.828937 | 0.932022 | 1.072936 |
| 999 | 1.605996 | True | 8.848931 | 0.965529 | 1.035701 |
1000 rows × 5 columns
Comparing the estimate to Linear Regression#
First, estimating the effect using the causal data frame, and the 95% confidence interval.
[8]:
(cdf_1['y'] - cdf_0['y']).mean()
[8]:
$\displaystyle 5.60782363962144$
[9]:
1.96*(cdf_1['y'] - cdf_0['y']).std() / np.sqrt(len(df))
[9]:
$\displaystyle 0.16460849994063$
Comparing to the estimate from OLS.
[10]:
model = OLS(np.asarray(df[outcome]), np.asarray(df[[common_cause, treatment]], dtype=np.float64))
result = model.fit()
result.summary()
[10]:
| Dep. Variable: | y | R-squared (uncentered): | 0.973 |
|---|---|---|---|
| Model: | OLS | Adj. R-squared (uncentered): | 0.973 |
| Method: | Least Squares | F-statistic: | 1.808e+04 |
| Date: | Tue, 31 Dec 2024 | Prob (F-statistic): | 0.00 |
| Time: | 08:35:02 | Log-Likelihood: | -1451.6 |
| No. Observations: | 1000 | AIC: | 2907. |
| Df Residuals: | 998 | BIC: | 2917. |
| Df Model: | 2 | ||
| Covariance Type: | nonrobust |
| coef | std err | t | P>|t| | [0.025 | 0.975] | |
|---|---|---|---|---|---|---|
| x1 | 1.9217 | 0.040 | 48.081 | 0.000 | 1.843 | 2.000 |
| x2 | 5.0082 | 0.058 | 86.916 | 0.000 | 4.895 | 5.121 |
| Omnibus: | 0.132 | Durbin-Watson: | 1.898 |
|---|---|---|---|
| Prob(Omnibus): | 0.936 | Jarque-Bera (JB): | 0.193 |
| Skew: | 0.020 | Prob(JB): | 0.908 |
| Kurtosis: | 2.945 | Cond. No. | 2.85 |
Notes:
[1] R² is computed without centering (uncentered) since the model does not contain a constant.
[2] Standard Errors assume that the covariance matrix of the errors is correctly specified.