I'm using scikit-learn in Python to develop a classification algorithm to predict the gender of certain customers. Amongst others, I want to use the Naive Bayes classifier but my problem is that I have a mix of categorical data (ex: "Registered online", "Accepts email notifications" etc) and continuous data (ex: "Age", "Length of membership" etc). I haven't used scikit much before but I suppose that that Gaussian Naive Bayes is suitable for continuous data and that Bernoulli Naive Bayes can be used for categorical data. However, since I want to have both categorical and continuous data in my model, I don't really know how to handle this. Any ideas would be much appreciated!
6 Answers
You have at least two options:
Transform all your data into a categorical representation by computing percentiles for each continuous variables and then binning the continuous variables using the percentiles as bin boundaries. For instance for the height of a person create the following bins: "very small", "small", "regular", "big", "very big" ensuring that each bin contains approximately 20% of the population of your training set. We don't have any utility to perform this automatically in scikit-learn but it should not be too complicated to do it yourself. Then fit a unique multinomial NB on those categorical representation of your data.
Independently fit a gaussian NB model on the continuous part of the data and a multinomial NB model on the categorical part. Then transform all the dataset by taking the class assignment probabilities (with
predict_proba
method) as new features:np.hstack((multinomial_probas, gaussian_probas))
and then refit a new model (e.g. a new gaussian NB) on the new features.
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8@ogrisel: Am I right in believing that the second method might miss correlations between the continuous and categorical data? For example, suppose young people who register online are typically male, but young people who do not register online are typically female. But further suppose for the sake of concreteness that the gaussian NB model predicts young people (without knowledge of the categorical data) are generally male. Since only this probability is being passed on to the second-stage gaussian NB, it will miss the correlation.– unutbuJan 14, 2013 at 20:07
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14@unutbu: Naive Bayes classifiers assumes independence of the features given the class. The first method listed above will learn
P(age|gender)
andP(registration_type|gender)
independently. The correlation between age and registration_type will not be captured for a given gender.– SamAug 1, 2014 at 1:33 -
@ogrisel can we use one-hot-encoding to convert the categorical variables to values between 0 and n-1 for n classes and keep the continuous variables as they are for GaussianNB() ? based on this post: dataaspirant.com/2017/02/20/…– jaiApr 12, 2018 at 18:16
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1@jai, No! First, one-hot encoding is not the same as converting to values between 0 and n-1. Second, converting categorical variables to values between 0 and n-1 and then treating them as continuous variables makes no sense. Third, one-hot categorical variables are so non-Gaussian, that treating them as Gaussian (which
GaussianNB
assumes) does not, in my experience, produce good results.– HimJun 7, 2018 at 19:24 -
@ogrisel, I thought that
predict_proba
is to be used for predicting probabilities on the 'test' data. E.g. I create 2 separate classifiers on the train data, and I can then use this to predict the probability for my remainingtest
data. If I then train another Gaussian model on thepredict_proba
result from thetest
data, doesn't that leave with nothing to test on? Am I looking at this correctly? Cheers– ChuckOct 24, 2018 at 18:45
Hope I'm not too late. I recently wrote a library called Mixed Naive Bayes, written in NumPy. It can assume a mix of Gaussian and categorical (multinoulli) distributions on the training data features.
https://github.com/remykarem/mixed-naive-bayes
The library is written such that the APIs are similar to scikit-learn's.
In the example below, let's assume that the first 2 features are from a categorical distribution and the last 2 are Gaussian. In the fit()
method, just specify categorical_features=[0,1]
, indicating that Columns 0 and 1 are to follow categorical distribution.
from mixed_naive_bayes import MixedNB
X = [[0, 0, 180.9, 75.0],
[1, 1, 165.2, 61.5],
[2, 1, 166.3, 60.3],
[1, 1, 173.0, 68.2],
[0, 2, 178.4, 71.0]]
y = [0, 0, 1, 1, 0]
clf = MixedNB(categorical_features=[0,1])
clf.fit(X,y)
clf.predict(X)
Pip installable via pip install mixed-naive-bayes
. More information on the usage in the README.md file. Pull requests are greatly appreciated :)
The simple answer: multiply result!! it's the same.
Naive Bayes based on applying Bayes’ theorem with the “naive” assumption of independence between every pair of features - meaning you calculate the Bayes probability dependent on a specific feature without holding the others - which means that the algorithm multiply each probability from one feature with the probability from the second feature (and we totally ignore the denominator - since it is just a normalizer).
so the right answer is:
- calculate the probability from the categorical variables.
- calculate the probability from the continuous variables.
- multiply 1. and 2.
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Gaussian NB gives a density estimate for the prior. I'm not sure about what you meant for the second part.– DavisJun 12, 2018 at 5:54
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@Davis, I'm not sure what you meant, but the Gaussian NB means that the the likelihood of the features is assumed to be Gaussian and this how the P(x|y) is calculated.– YaronJun 12, 2018 at 9:31
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I mean there isn't Pr(x_i | y) anymore, but this prior is replaced Norm(mu_i, sig_i) which is a density estimate because the probability of Pr(X_i = x | y) is zero as the RV X_i is continuous.– DavisJun 12, 2018 at 14:01
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I think your question is not related to the topic but you can get your answer from: stats.stackexchange.com/questions/26624/…– YaronJun 13, 2018 at 6:07
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Yaron ,when you say
calculate the probabilities
, is this on the test or train data, and what function would you use to do this? Are you usingpredict-proba
on the train data as well as doing the fit on the train data? I'm struggling to figure out what I should be multiplying... Cheers– ChuckOct 24, 2018 at 18:53
You will need the following steps:
- Calculate the probability from the categorical variables (using
predict_proba
method fromBernoulliNB
) - Calculate the probability from the continuous variables (using
predict_proba
method fromGaussianNB
) - Multiply 1. and 2. AND
- Divide by the prior (either from
BernoulliNB
or fromGaussianNB
since they are the same) AND THEN - Divide 4. by the sum (over the classes) of 4. This is the normalisation step.
It should be easy enough to see how you can add your own prior instead of using those learned from the data.
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Thank god someone finally thought about fixing the squared prior issue! Jan 21 at 13:31
@Yaron's approach needs an extra step (4. below):
- Calculate the probability from the categorical variables.
- Calculate the probability from the continuous variables.
- Multiply 1. and 2. AND
- Divide 3. by the sum of the product of 1. and 2. EDIT: What I actually mean is that the denominator should be (probability of the event given the hypotnesis is yes) + (probability of evidence given the hypotnesis is no) (asuming a binary problem, without loss of generality). Thus, the probabilities of the hypotheses (yes or no) given the evidence would sum to 1.
Step 4. is the normalization step. Take a look at @remykarem's mixed-naive-bayes
as an example (lines 268-278):
if self.gaussian_features.size != 0 and self.categorical_features.size != 0:
finals = t * p * self.priors
elif self.gaussian_features.size != 0:
finals = t * self.priors
elif self.categorical_features.size != 0:
finals = p * self.priors
normalised = finals.T/(np.sum(finals, axis=1) + 1e-6)
normalised = np.moveaxis(normalised, [0, 1], [1, 0])
return normalised
The probabilities of the Gaussian and Categorical models (t
and p
respectively) are multiplied together in line 269 (line 2 in extract above) and then normalized as in 4. in line 275 (fourth line from the bottom in extract above).
For hybrid features, you can check this implementation.
The author has presented mathematical justification in his Quora answer, you might want to check.