mirror of https://github.com/davisking/dlib.git
209 lines
7.6 KiB
C++
209 lines
7.6 KiB
C++
// The contents of this file are in the public domain. See LICENSE_FOR_EXAMPLE_PROGRAMS.txt
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/*
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This is an example showing how to define custom kernel functions for use with
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the machine learning tools in the dlib C++ Library.
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This example assumes you are somewhat familiar with the machine learning
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tools in dlib. In particular, you should be familiar with the krr_trainer
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and the matrix object. So you may want to read the krr_classification_ex.cpp
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and matrix_ex.cpp example programs if you haven't already.
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*/
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#include <iostream>
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#include <dlib/svm.h>
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using namespace std;
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using namespace dlib;
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// ----------------------------------------------------------------------------------------
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/*
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Here we define our new kernel. It is the UKF kernel from
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Facilitating the applications of support vector machine by using a new kernel
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by Rui Zhang and Wenjian Wang.
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In the context of the dlib library a kernel function object is an object with
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an interface with the following properties:
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- a public typedef named sample_type
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- a public typedef named scalar_type which should be a float, double, or
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long double type.
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- an overloaded operator() that operates on two items of sample_type
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and returns a scalar_type.
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- a public typedef named mem_manager_type that is an implementation of
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dlib/memory_manager/memory_manager_kernel_abstract.h or
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dlib/memory_manager_global/memory_manager_global_kernel_abstract.h or
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dlib/memory_manager_stateless/memory_manager_stateless_kernel_abstract.h
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- an overloaded == operator that tells you if two kernels are
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identical or not.
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Below we define such a beast for the UKF kernel. In this case we are expecting the
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sample type (i.e. the T type) to be a dlib::matrix. However, note that you can design
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kernels which operate on any type you like so long as you meet the above requirements.
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*/
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template < typename T >
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struct ukf_kernel
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{
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typedef typename T::type scalar_type;
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typedef T sample_type;
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// If your sample type, the T, doesn't have a memory manager then
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// you can use dlib::default_memory_manager here.
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typedef typename T::mem_manager_type mem_manager_type;
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ukf_kernel(const scalar_type g) : sigma(g) {}
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ukf_kernel() : sigma(0.1) {}
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scalar_type sigma;
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scalar_type operator() (
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const sample_type& a,
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const sample_type& b
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) const
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{
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// This is the formula for the UKF kernel from the above referenced paper.
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return 1/(length_squared(a-b) + sigma);
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}
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bool operator== (
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const ukf_kernel& k
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) const
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{
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return sigma == k.sigma;
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}
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};
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// ----------------------------------------------------------------------------------------
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/*
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Here we define serialize() and deserialize() functions for our new kernel. Defining
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these functions is optional. However, if you don't define them you won't be able
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to save your learned decision_function objects to disk.
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*/
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template < typename T >
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void serialize ( const ukf_kernel<T>& item, std::ostream& out)
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{
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// save the state of the kernel to the output stream
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serialize(item.sigma, out);
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}
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template < typename T >
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void deserialize ( ukf_kernel<T>& item, std::istream& in )
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{
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deserialize(item.sigma, in);
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}
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// ----------------------------------------------------------------------------------------
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/*
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This next thing, the kernel_derivative specialization is optional. You only need
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to define it if you want to use the dlib::reduced2() or dlib::approximate_distance_function()
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routines. If so, then you need to supply code for computing the derivative of your kernel as
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shown below. Note also that you can only do this if your kernel operates on dlib::matrix
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objects which represent column vectors.
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*/
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namespace dlib
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{
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template < typename T >
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struct kernel_derivative<ukf_kernel<T> >
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{
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typedef typename T::type scalar_type;
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typedef T sample_type;
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typedef typename T::mem_manager_type mem_manager_type;
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kernel_derivative(const ukf_kernel<T>& k_) : k(k_){}
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sample_type operator() (const sample_type& x, const sample_type& y) const
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{
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// return the derivative of the ukf kernel with respect to the second argument (i.e. y)
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return 2*(x-y)*std::pow(k(x,y),2);
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}
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const ukf_kernel<T>& k;
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};
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}
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// ----------------------------------------------------------------------------------------
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int main()
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{
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// We are going to be working with 2 dimensional samples and trying to perform
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// binary classification on them using our new ukf_kernel.
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typedef matrix<double, 2, 1> sample_type;
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typedef ukf_kernel<sample_type> kernel_type;
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// Now let's generate some training data
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std::vector<sample_type> samples;
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std::vector<double> labels;
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for (double r = -20; r <= 20; r += 0.9)
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{
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for (double c = -20; c <= 20; c += 0.9)
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{
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sample_type samp;
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samp(0) = r;
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samp(1) = c;
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samples.push_back(samp);
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// if this point is less than 13 from the origin
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if (sqrt(r*r + c*c) <= 13)
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labels.push_back(+1);
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else
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labels.push_back(-1);
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}
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}
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cout << "samples generated: " << samples.size() << endl;
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cout << " number of +1 samples: " << sum(mat(labels) > 0) << endl;
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cout << " number of -1 samples: " << sum(mat(labels) < 0) << endl;
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// A valid kernel must always give rise to kernel matrices which are symmetric
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// and positive semidefinite (i.e. have nonnegative eigenvalues). This next
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// bit of code makes a kernel matrix and checks if it has these properties.
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const matrix<double> K = kernel_matrix(kernel_type(0.1), randomly_subsample(samples, 500));
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cout << "\nIs it symmetric? (this value should be 0): "<< min(abs(K - trans(K))) << endl;
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cout << "Smallest eigenvalue (should be >= 0): " << min(real_eigenvalues(K)) << endl;
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// here we make an instance of the krr_trainer object that uses our new kernel.
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krr_trainer<kernel_type> trainer;
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trainer.use_classification_loss_for_loo_cv();
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// Finally, let's test how good our new kernel is by doing some leave-one-out cross-validation.
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cout << "\ndoing leave-one-out cross-validation" << endl;
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for (double sigma = 0.01; sigma <= 100; sigma *= 3)
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{
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// tell the trainer the parameters we want to use
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trainer.set_kernel(kernel_type(sigma));
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std::vector<double> loo_values;
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trainer.train(samples, labels, loo_values);
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// Print sigma and the fraction of samples correctly classified during LOO cross-validation.
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const double classification_accuracy = mean_sign_agreement(labels, loo_values);
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cout << "sigma: " << sigma << " LOO accuracy: " << classification_accuracy << endl;
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}
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const kernel_type kern(10);
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// Since it is very easy to make a mistake while coding a derivative it is a good idea
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// to compare your derivative function against a numerical approximation and see if
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// the results are similar. If they are very different then you probably made a
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// mistake. So here we compare the results at a test point.
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cout << "\nThese vectors should match, if they don't then we coded the kernel_derivative wrong!" << endl;
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cout << "approximate derivative: \n" << derivative(kern)(samples[0],samples[100]) << endl;
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cout << "exact derivative: \n" << kernel_derivative<kernel_type>(kern)(samples[0],samples[100]) << endl;
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}
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