This is an unambitious Python library for working with Bayesian networks. For serious usage, you should probably be using a more established project, such as pomegranate, pgmpy, bnlearn (which is built on the latter), or even PyMC. There's also the well-documented bnlearn package in R. Hey, you could even go medieval and use something like Netica โ I'm just jesting, they actually have a nice tutorial on Bayesian networks. By the way, if you're not familiar with Bayesian networks, then I highly recommend Patrick Winston's MIT courses on probabilistic inference (part 1, part 2).
The main goal of this project is to be used for educational purposes. As such, more emphasis is put on tidyness and conciseness than on performance. I find libraries such as pomegranate are wonderful. But, they literally contain several thousand lines of non-obvious code, at the detriment of simplicity and ease of comprehension. I've also put some effort into designing a slick API that makes full use of pandas. Although performance is not the main focus of this library, it is reasonably efficient and should be able to satisfy most use cases in a timely manner.
You should be able to install and use this library with any Python version above 3.9:
pip install sorobn
Note that under the hood, sorobn
uses vose
for random sampling, which is written in Cython.
The central construct in sorobn
is the BayesNet
class. A Bayesian network's structure can be manually defined by instantiating a BayesNet
. As an example, let's use Judea Pearl's famous alarm network:
>>> import sorobn as hh
>>> bn = hh.BayesNet(
... ('Burglary', 'Alarm'),
... ('Earthquake', 'Alarm'),
... ('Alarm', 'John calls'),
... ('Alarm', 'Mary calls'),
... seed=42,
... )
You may also use the following notation, which is slightly more terse:
>>> import sorobn as hh
>>> bn = hh.BayesNet(
... (['Burglary', 'Earthquake'], 'Alarm'),
... ('Alarm', ['John calls', 'Mary calls']),
... seed=42
... )
In Judea Pearl's example, the conditional probability tables are given. Therefore, we can define them manually by setting the values of the P
attribute:
>>> import pandas as pd
# P(Burglary)
>>> bn.P['Burglary'] = pd.Series({False: .999, True: .001})
# P(Earthquake)
>>> bn.P['Earthquake'] = pd.Series({False: .998, True: .002})
# P(Alarm | Burglary, Earthquake)
>>> bn.P['Alarm'] = pd.Series({
... (True, True, True): .95,
... (True, True, False): .05,
...
... (True, False, True): .94,
... (True, False, False): .06,
...
... (False, True, True): .29,
... (False, True, False): .71,
...
... (False, False, True): .001,
... (False, False, False): .999
... })
# P(John calls | Alarm)
>>> bn.P['John calls'] = pd.Series({
... (True, True): .9,
... (True, False): .1,
... (False, True): .05,
... (False, False): .95
... })
# P(Mary calls | Alarm)
>>> bn.P['Mary calls'] = pd.Series({
... (True, True): .7,
... (True, False): .3,
... (False, True): .01,
... (False, False): .99
... })
The prepare
method has to be called whenever the structure and/or the P are manually specified. This will do some house-keeping and make sure everything is sound. It is not compulsory but highly recommended, just like brushing your teeth.
>>> bn.prepare()
Note that you are allowed to specify variables that have no dependencies with any other variable:
>>> _ = hh.BayesNet(
... ('Cloud', 'Rain'),
... (['Rain', 'Cold'], 'Snow'),
... 'Wind speed' # has no dependencies
... )
You can use a Bayesian network to generate random samples. The samples will follow the distribution induced by the network's structure and its conditional probability tables.
>>> from pprint import pprint
>>> pprint(bn.sample())
{'Alarm': False,
'Burglary': False,
'Earthquake': False,
'John calls': False,
'Mary calls': False}
>>> bn.sample(5) # doctest: +SKIP
Alarm Burglary Earthquake John calls Mary calls
0 False False False False False
1 False False False False False
2 False False False False False
3 False False False False False
4 False False False True False
You can also specify starting values for a subset of the variables.
>>> pprint(bn.sample(init={'Alarm': True, 'Burglary': True}))
{'Alarm': True,
'Burglary': True,
'Earthquake': False,
'John calls': True,
'Mary calls': False}
The supported inference methods are:
forward
for forward sampling.
Note that randomness is controlled via the seed
parameter, when BayesNet
is initialized.
A Bayesian network is a generative model. Therefore, it can be used for many purposes. For instance, it can answer probabilistic queries, such as:
What is the likelihood of there being a burglary if both John and Mary call?
This question can be answered by using the query
method, which returns the probability distribution for the possible outcomes. Said otherwise, the query
method can be used to look at a query variable's distribution conditioned on a given event. This can be denoted as P(query | event)
.
>>> bn.query('Burglary', event={'Mary calls': True, 'John calls': True})
Burglary
False 0.715828
True 0.284172
Name: P(Burglary), dtype: float64
We can also answer questions that involve multiple query variables, for instance:
What are the chances that John and Mary call if an earthquake happens?
>>> bn.query('John calls', 'Mary calls', event={'Earthquake': True})
John calls Mary calls
False False 0.675854
True 0.027085
True False 0.113591
True 0.183470
Name: P(John calls, Mary calls), dtype: float64
By default, the answer is found via an exact inference procedure. For small networks this isn't very expensive to perform. However, for larger networks, you might want to prefer using approximate inference. The latter is a class of methods that randomly sample the network and return an estimate of the answer. The quality of the estimate increases with the number of iterations that are performed. For instance, you can use Gibbs sampling:
>>> bn.query(
... 'Burglary',
... event={'Mary calls': True, 'John calls': True},
... algorithm='gibbs',
... n_iterations=1000
... ) # doctest: +SKIP
Burglary
False 0.706
True 0.294
Name: P(Burglary), dtype: float64
The supported inference methods are:
exact
for variable elimination.gibbs
for Gibbs sampling.likelihood
for likelihood weighting.rejection
for rejection sampling.
As with random sampling, randomness is controlled during BayesNet
initialization, via the seed
parameter.
A use case for probabilistic inference is to impute missing values. The impute
method fills the missing values with the most likely replacements, given the present information. This is usually more accurate than simply replacing by the mean or the most common value. Additionally, such an approach can be much more efficient than model-based iterative imputation.
>>> sample = {
... 'Alarm': True,
... 'Burglary': True,
... 'Earthquake': False,
... 'John calls': None, # missing
... 'Mary calls': None # missing
... }
>>> sample = bn.impute(sample)
>>> pprint(sample)
{'Alarm': True,
'Burglary': True,
'Earthquake': False,
'John calls': True,
'Mary calls': True}
Note that the impute
method can be seen as the equivalent of pomegranate
's predict
method.
You can estimate the likelihood of an event with the predict_proba
method:
>>> event = {
... 'Alarm': False,
... 'Burglary': False,
... 'Earthquake': False,
... 'John calls': False,
... 'Mary calls': False
... }
>>> bn.predict_proba(event)
0.936742...
In other words, predict_proba
computes P(event)
, whereas the query
method computes P(query | event)
. You may also estimate the likelihood for a partial event. The probabilities for the unobserved variables will be summed out.
>>> event = {'Alarm': True, 'Burglary': False}
>>> bn.predict_proba(event)
0.001576...
This also works for an event with a single variable:
>>> event = {'Alarm': False}
>>> bn.predict_proba(event)
0.997483...
Note that you can also pass a bunch of events to predict_proba
, as so:
>>> events = pd.DataFrame([
... {'Alarm': False, 'Burglary': False, 'Earthquake': False,
... 'John calls': False, 'Mary calls': False},
...
... {'Alarm': False, 'Burglary': False, 'Earthquake': False,
... 'John calls': True, 'Mary calls': False},
...
... {'Alarm': True, 'Burglary': True, 'Earthquake': True,
... 'John calls': True, 'Mary calls': True}
... ])
>>> bn.predict_proba(events)
Alarm Burglary Earthquake John calls Mary calls
False False False False False 0.936743
True False 0.049302
True True True True True 0.000001
Name: P(Alarm, Burglary, Earthquake, John calls, Mary calls), dtype: float64
You can determine the values of the P from a dataset. This is a straightforward procedure, as it only requires performing a groupby
followed by a value_counts
for each CPT.
>>> samples = bn.sample(1000)
>>> bn = bn.fit(samples)
Note that in this case you do not have to call the prepare
method because it is done for you implicitly.
If you want to update an already existing Bayesian networks with new observations, then you can use partial_fit
:
>>> bn = bn.partial_fit(samples[:500])
>>> bn = bn.partial_fit(samples[500:])
The same result will be obtained whether you use fit
once or partial_fit
multiple times in succession.
A Chow-Liu tree is a tree structure that represents a factorised distribution with maximal likelihood. It's essentially the best tree structure that can be found.
>>> samples = hh.examples.asia().sample(300)
>>> structure = hh.structure.chow_liu(samples)
>>> bn = hh.BayesNet(*structure)
You can use the graphviz
method to obtain a graphviz.Digraph
representation.
>>> bn = hh.examples.asia()
>>> dot = bn.graphviz()
>>> path = dot.render('asia', directory='figures', format='svg', cleanup=True)
Note that the graphviz
library is not installed by default because it requires a platform dependent binary. Therefore, you have to install it by yourself.
A side-goal of this project is to provide a user interface to play around with a given user interface. Fortunately, we live in wonderful times where many powerful and opensource tools are available. At the moment, I have a preference for streamlit
.
You can install the GUI dependencies by running the following command:
$ pip install git+https://github.com/MaxHalford/sorobn --install-option="--extras-require=gui"
You can then launch a demo by running the sorobn
command:
$ sorobn
This will launch a streamlit
interface where you can play around with the examples that sorobn
provides. You can see a running instance of it in this Streamlit app.
An obvious next step would be to allow users to run this with their own Bayesian networks. Then again, using streamlit
is so easy that you might as well do this yourself.
Bayesian networks that handle both discrete and continuous are said to be hybrid. There are two approaches to deal with continuous variables. The first approach is to use parametric distributions within nodes that pertain to a continuous variable. This has two disadvantages. First, it is complex because there are different cases to handle: a discrete variable conditioned by a continuous one, a continuous variable conditioned by a discrete one, or combinations of the former with the latter. Secondly, such an approach requires having to pick a parametric distribution for each variable. Although there are methods to automate this choice for you, they are expensive and are far from being foolproof.
The second approach is to simply discretize the continuous variables. Although this might seem naive, it is generally a good enough approach and definitely makes things simpler implementation-wise. There are many ways to go about discretising a continuous attribute. For instance, you can apply a quantile-based discretization function. You could also round each number to its closest integer. In some cases you might be able to apply a manual rule. For instance, you can convert a numeric temperature to "cold", "mild", and "hot".
To summarize, we prefer to give the user the flexibility to discretize the variables by herself. Indeed, most of the time the best procedure depends on the problem at hand and cannot be automated adequately.
Several toy networks are available to fool around with in the examples
submodule:
- ๐จ
alarm
โ the alarm network introduced by Judea Pearl. - ๐
asia
โ a popular example introduced in Local computations with probabilities on graphical structures and their application to expert systems. - ๐
grades
โ an example from Stanford's CS 228 class. - ๐ฆ
sprinkler
โ the network used in chapter 14 of Artificial Intelligence: A Modern Approach (3rd edition).
Here is some example usage:
>>> bn = hh.examples.sprinkler()
>>> bn.nodes
['Cloudy', 'Rain', 'Sprinkler', 'Wet grass']
>>> pprint(bn.parents)
{'Rain': ['Cloudy'],
'Sprinkler': ['Cloudy'],
'Wet grass': ['Rain', 'Sprinkler']}
>>> pprint(bn.children)
{'Cloudy': ['Rain', 'Sprinkler'],
'Rain': ['Wet grass'],
'Sprinkler': ['Wet grass']}
# Download and navigate to the source code
git clone https://github.com/MaxHalford/sorobn
cd sorobn
# Install poetry
curl -sSL https://install.python-poetry.org | python3 -
# Install in development mode
poetry install
# Run tests
poetry shell
pytest
This project is free and open-source software licensed under the MIT license.