# conditional sampling from multivariate kernel density estimate in python

One can create a multivariate kernel density estimate (KDE) with scikitlearn (https://scikit-learn.org/stable/modules/generated/sklearn.neighbors.KernelDensity.html#sklearn.neighbors.KernelDensity) and scipy (https://docs.scipy.org/doc/scipy/reference/generated/scipy.stats.gaussian_kde.html)

Both allow for random sampling from the estimated distribution. Is there a way to do conditional sampling in either of the two libraries (or any other library)? In the 2-variable (x,y) case this would mean sample from P(x|y) (or P(y|x)), thus from a cross-section of the probability function (and that cross-section has to be rescaled to unit area under its curve).

``````x = np.random.random(100)
y =np.random.random(100)
kde = stats.gaussian_kde([x,y])
# sampling from the whole pdf:
kde.resample()
``````

I am looking for something like

``````# sampling y, conditional on x
kde.sample_conditional(x=1.5) #does not exist
``````
• Have you solved this?
– vps
Sep 10, 2020 at 10:53
• also interested in this.
Apr 16, 2021 at 15:36
• any development? Sep 15, 2021 at 9:12
• Check my answer Oct 29, 2021 at 9:41

This function samples conditionally one column based on all other columns.

``````def conditional_sample(kde, training_data, columns, values, samples = 100):
if len(values) - len(columns) != 0:
raise ValueError("length of columns and values should be equal")
if training_data.shape[1] - len(columns) != 1:
raise ValueError(f'Expected {training_data.shape[1] - 1} columns/values but {len(columns)} have be given')
cols_values_dict = dict(zip(columns, values))

#create array to sample from
steps = 10000
X_test = np.zeros((steps,training_data.shape[1]))
for i in range(training_data.shape[1]):
col_data = training_data.iloc[:, i]
X_test[:, i] = np.linspace(col_data.min(),col_data.max(),steps)
for col in columns:
idx_col_training_data = list(training_data.columns).index(col)
idx_in_values_list = list(cols_values_dict.keys()).index(col)
X_test[:, idx_col_training_data] = values[idx_in_values_list]

#compute probability of each sample
prob_dist = np.exp(kde.score_samples(X_test))/np.exp(kde.score_samples(X_test)).sum()

#sample using np.random.choice
return X_test[np.random.choice(range(len(prob_dist)), p=prob_dist, size = (samples))]
``````
• nice workaround for part of the problem, but not for everything. If I understand it correctly, it works with probing the KDE with a discrete grid, which will introduce errors. Also, a KDE can actually extrapolate beyond the smallest and largest training point along an axis, which this method wont be able to do.
– Sip
Nov 2, 2021 at 9:15
• Indeed for more efficient conditional sampling, we need to construct the pdf i think. Sadly no implementation of pdf in sklearn.kde and no sampling implementation of sampling in statsmodels.kde Nov 2, 2021 at 12:10

This function works for use cases with only 1-dimensional conditions. It's built in a way that the condition doesn't need to be fulfilled exactly, but with some tolerance.

``````from scipy import stats
import numpy as np

x = np.random.random(1000)
y = np.random.random(1000)
kde = stats.gaussian_kde([x,y])

def conditional_sample(kde, condition, precision = 0.5,  sample_size = 1000):

block_size = int(sample_size / (2 * precision / 100))
sample = kde.resample(block_size)

lower_limit = np.percentile(sample[-1], stats.percentileofscore(sample[-1], condition) - precision)
upper_limit = np.percentile(sample[-1], stats.percentileofscore(sample[-1], condition) + precision)

conditional_sample = sample[:, (upper_limit > sample[-1]) * (sample[-1] > lower_limit)]

return conditional_sample[0:-1]

conditional_sample(kde=kde, condition=0.6)
``````

Not a universal solution but works well for my use case.