This is the Python package for the GenSVM multiclass classifier by Gerrit J.J. van den Burg and Patrick J.F. Groenen.
Useful links:
- PyGenSVM on GitHub
- PyGenSVM on PyPI
- Package documentation
- Journal paper: GenSVM: A Generalized Multiclass Support Vector Machine JMLR, 17(225):1−42, 2016.
- There is also an R package
- Or you can directly use the C library
Before GenSVM can be installed, a working NumPy installation is required. so GenSVM can be installed using the following command:
$ pip install numpy && pip install gensvm
If you encounter any errors, please open an issue on GitHub. Don't hesitate, you're helping to make this project better!
If you use this package in your research please cite the paper, for instance using the following BibTeX entry::
@article{JMLR:v17:14-526,
author = {{van den Burg}, G. J. J. and Groenen, P. J. F.},
title = {{GenSVM}: A Generalized Multiclass Support Vector Machine},
journal = {Journal of Machine Learning Research},
year = {2016},
volume = {17},
number = {225},
pages = {1-42},
url = {http://jmlr.org/papers/v17/14-526.html}
}
The package contains two classes to fit the GenSVM model: GenSVM and GenSVMGridSearchCV. These classes respectively fit a single GenSVM model or fit a series of models for a parameter grid search. The interface to these classes is the same as that of classifiers in Scikit-Learn so users familiar with Scikit-Learn should have no trouble using this package. Below we will show some examples of using the GenSVM classifier and the GenSVMGridSearchCV class in practice.
In the examples we assume that we have loaded the iris dataset from Scikit-Learn as follows:
>>> from sklearn.datasets import load_iris
>>> from sklearn.model_selection import train_test_split
>>> from sklearn.preprocessing import MaxAbsScaler
>>> X, y = load_iris(return_X_y=True)
>>> X_train, X_test, y_train, y_test = train_test_split(X, y)
>>> scaler = MaxAbsScaler().fit(X_train)
>>> X_train, X_test = scaler.transform(X_train), scaler.transform(X_test)
Note that we scale the data using the
MaxAbsScaler
function. This scales the columns of the data matrix to [-1, 1]
without
breaking sparsity. Scaling the dataset can have a significant effect on the
computation time of GenSVM and is generally recommended for
SVMs.
Let's start by fitting the most basic GenSVM model on the training data:
>>> from gensvm import GenSVM
>>> clf = GenSVM()
>>> clf.fit(X_train, y_train)
GenSVM(coef=0.0, degree=2.0, epsilon=1e-06, gamma='auto', kappa=0.0,
kernel='linear', kernel_eigen_cutoff=1e-08, lmd=1e-05,
max_iter=100000000.0, p=1.0, random_state=None, verbose=0,
weights='unit')
With the model fitted, we can predict the test dataset:
>>> y_pred = clf.predict(X_test)
Next, we can compute a score for the predictions. The GenSVM class has a
score
method which computes the
accuracy_score
for the predictions. In the GenSVM paper, the adjusted Rand
index is often
used to compare performance. We illustrate both options below (your results
may be different depending on the exact train/test split):
>>> clf.score(X_test, y_test)
1.0
>>> from sklearn.metrics import adjusted_rand_score
>>> adjusted_rand_score(clf.predict(X_test), y_test)
1.0
We can try this again by changing the model parameters, for instance we can
turn on verbosity and use the Euclidean norm in the GenSVM model by setting p = 2
:
>>> clf2 = GenSVM(verbose=True, p=2)
>>> clf2.fit(X_train, y_train)
Starting main loop.
Dataset:
n = 112
m = 4
K = 3
Parameters:
kappa = 0.000000
p = 2.000000
lambda = 0.0000100000000000
epsilon = 1e-06
iter = 0, L = 3.4499531579689533, Lbar = 7.3369415851139745, reldiff = 1.1266786095824437
...
Optimization finished, iter = 4046, loss = 0.0230726364692517, rel. diff. = 0.0000009998645783
Number of support vectors: 9
GenSVM(coef=0.0, degree=2.0, epsilon=1e-06, gamma='auto', kappa=0.0,
kernel='linear', kernel_eigen_cutoff=1e-08, lmd=1e-05,
max_iter=100000000.0, p=2, random_state=None, verbose=True,
weights='unit')
For other parameters that can be tuned in the GenSVM model, see GenSVM.
One of the key features of the GenSVM classifier is that training can be
accelerated by using so-called "warm-starts". This way the optimization can be
started in a location that is closer to the final solution than a random
starting position would be. To support this, the fit
method of the GenSVM
class has an optional seed_V
parameter. We'll illustrate how this can be
used below.
We start with relatively large value for the epsilon
parameter in the
model. This is the stopping parameter that determines how long the
optimization continues (and therefore how exact the fit is).
>>> clf1 = GenSVM(epsilon=1e-3)
>>> clf1.fit(X_train, y_train)
...
>>> clf1.n_iter_
163
The n_iter_
attribute tells us how many iterations the model did. Now, we
can use the solution of this model to start the training for the next model:
>>> clf2 = GenSVM(epsilon=1e-8)
>>> clf2.fit(X_train, y_train, seed_V=clf1.combined_coef_)
...
>>> clf2.n_iter_
3196
Compare this to a model with the same stopping parameter, but without the warm start:
>>> clf2.fit(X_train, y_train)
...
>>> clf2.n_iter_
3699
So we saved about 500 iterations! This effect will be especially significant with large datasets and when you try out many parameter configurations. Therefore this technique is built into the GenSVMGridSearchCV class that can be used to do a grid search of parameters.
Often when we're fitting a machine learning model such as GenSVM, we have to try several parameter configurations to figure out which one performs best on our given dataset. This is usually combined with cross validation to avoid overfitting. To do this efficiently and to make use of warm starts, the GenSVMGridSearchCV class is available. This class works in the same way as the GridSearchCV class of Scikit-Learn, but uses the GenSVM C library for speed.
To do a grid search, we first have to define the parameters that we want to vary and what values we want to try:
>>> from gensvm import GenSVMGridSearchCV
>>> param_grid = {'p': [1.0, 2.0], 'lmd': [1e-8, 1e-6, 1e-4, 1e-2, 1.0], 'kappa': [-0.9, 0.0] }
For the values that are not varied in the parameter grid, the default values
will be used. This means that if you want to change a specific value (such as
epsilon
for instance), you can add this to the parameter grid as a
parameter with a single value to try (e.g. 'epsilon': [1e-8]
).
Running the grid search is now straightforward:
>>> gg = GenSVMGridSearchCV(param_grid)
>>> gg.fit(X_train, y_train)
GenSVMGridSearchCV(cv=None, iid=True,
param_grid={'p': [1.0, 2.0], 'lmd': [1e-06, 0.0001, 0.01, 1.0], 'kappa': [-0.9, 0.0]},
refit=True, return_train_score=True, scoring=None, verbose=0)
Note that if we have set refit=True
(the default), then we can use the
GenSVMGridSearchCV instance to predict or score using the best estimator
found in the grid search:
>>> y_pred = gg.predict(X_test)
>>> gg.score(X_test, y_test)
1.0
A nice feature borrowed from Scikit-Learn
_ is that the results from the grid
search can be represented as a pandas
DataFrame:
>>> from pandas import DataFrame
>>> df = DataFrame(gg.cv_results_)
This can make it easier to explore the results of the grid search.
The following are known limitations that are on the roadmap for a future release of the package. If you need any of these features, please vote on them on the linked GitHub issues (this can make us add them sooner!).
- Support for sparse matrices. NumPy supports sparse matrices, as does the GenSVM C library. Getting them to work together requires some additional effort. In the meantime, if you really want to use sparse data with GenSVM (this can lead to significant speedups!), check out the GenSVM C library.
- Specification of class misclassification weights. Currently, incorrectly classification an object from class A to class C is as bad as incorrectly classifying an object from class B to class C. Depending on the application, this may not be the desired effect. Adding class misclassification weights can solve this issue.
If you have any questions or encounter any issues with using this package, please ask them on GitHub.
This package is licensed under the GNU General Public License version 3.
Copyright (c) G.J.J. van den Burg, excluding the sections of the code that are explicitly marked to come from Scikit-Learn.